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You searched for subject:(Hyperbolic equations). Showing records 1 – 30 of 90 total matches.

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1. Sun, Hongtan. Strichartz Estimates for Wave and Schrödinger Equations on Hyperbolic Trapped Domains.

Degree: 2014, Johns Hopkins University

 In this thesis, I will establish the mixed norm Strichartz type estimates for the wave and Schr odinger equations on certain Riemannian manifold. Here the… (more)

Subjects/Keywords: Strichartz estimates; Hyperbolic trapped domain; wave equations

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APA (6th Edition):

Sun, H. (2014). Strichartz Estimates for Wave and Schrödinger Equations on Hyperbolic Trapped Domains. (Thesis). Johns Hopkins University. Retrieved from http://jhir.library.jhu.edu/handle/1774.2/37854

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Chicago Manual of Style (16th Edition):

Sun, Hongtan. “Strichartz Estimates for Wave and Schrödinger Equations on Hyperbolic Trapped Domains.” 2014. Thesis, Johns Hopkins University. Accessed August 18, 2019. http://jhir.library.jhu.edu/handle/1774.2/37854.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

MLA Handbook (7th Edition):

Sun, Hongtan. “Strichartz Estimates for Wave and Schrödinger Equations on Hyperbolic Trapped Domains.” 2014. Web. 18 Aug 2019.

Vancouver:

Sun H. Strichartz Estimates for Wave and Schrödinger Equations on Hyperbolic Trapped Domains. [Internet] [Thesis]. Johns Hopkins University; 2014. [cited 2019 Aug 18]. Available from: http://jhir.library.jhu.edu/handle/1774.2/37854.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Council of Science Editors:

Sun H. Strichartz Estimates for Wave and Schrödinger Equations on Hyperbolic Trapped Domains. [Thesis]. Johns Hopkins University; 2014. Available from: http://jhir.library.jhu.edu/handle/1774.2/37854

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

2. Jonov, Boyan Yavorov. Longtime behavior of small solutions to viscous perturbations of nonlinear hyperbolic systems in 3D.

Degree: 2014, University of California – eScholarship, University of California

 The first result in this dissertation concerns wave equations in three space dimensions with small O(v) viscous dissipation and O(d) non-null quadratic nonlinearities. Small O(e)… (more)

Subjects/Keywords: Mathematics; differential; equations; hyperbolic; nonlinear; partial; perturbations

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APA (6th Edition):

Jonov, B. Y. (2014). Longtime behavior of small solutions to viscous perturbations of nonlinear hyperbolic systems in 3D. (Thesis). University of California – eScholarship, University of California. Retrieved from http://www.escholarship.org/uc/item/35d0c08f

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Chicago Manual of Style (16th Edition):

Jonov, Boyan Yavorov. “Longtime behavior of small solutions to viscous perturbations of nonlinear hyperbolic systems in 3D.” 2014. Thesis, University of California – eScholarship, University of California. Accessed August 18, 2019. http://www.escholarship.org/uc/item/35d0c08f.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

MLA Handbook (7th Edition):

Jonov, Boyan Yavorov. “Longtime behavior of small solutions to viscous perturbations of nonlinear hyperbolic systems in 3D.” 2014. Web. 18 Aug 2019.

Vancouver:

Jonov BY. Longtime behavior of small solutions to viscous perturbations of nonlinear hyperbolic systems in 3D. [Internet] [Thesis]. University of California – eScholarship, University of California; 2014. [cited 2019 Aug 18]. Available from: http://www.escholarship.org/uc/item/35d0c08f.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Council of Science Editors:

Jonov BY. Longtime behavior of small solutions to viscous perturbations of nonlinear hyperbolic systems in 3D. [Thesis]. University of California – eScholarship, University of California; 2014. Available from: http://www.escholarship.org/uc/item/35d0c08f

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation


Brunel University

3. Cheema, Tasleem Akhter. Higher-order finite-difference methods for partial differential equations.

Degree: 1997, Brunel University

 This thesis develops two families of numerical methods, based upon rational approximations having distinct real poles, for solving first- and second-order parabolic/ hyperbolic partial differential… (more)

Subjects/Keywords: 510; Advection equations; Hyperbolic equations

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APA (6th Edition):

Cheema, T. A. (1997). Higher-order finite-difference methods for partial differential equations. (Doctoral Dissertation). Brunel University. Retrieved from http://bura.brunel.ac.uk/handle/2438/7131 ; http://ethos.bl.uk/OrderDetails.do?uin=uk.bl.ethos.361095

Chicago Manual of Style (16th Edition):

Cheema, Tasleem Akhter. “Higher-order finite-difference methods for partial differential equations.” 1997. Doctoral Dissertation, Brunel University. Accessed August 18, 2019. http://bura.brunel.ac.uk/handle/2438/7131 ; http://ethos.bl.uk/OrderDetails.do?uin=uk.bl.ethos.361095.

MLA Handbook (7th Edition):

Cheema, Tasleem Akhter. “Higher-order finite-difference methods for partial differential equations.” 1997. Web. 18 Aug 2019.

Vancouver:

Cheema TA. Higher-order finite-difference methods for partial differential equations. [Internet] [Doctoral dissertation]. Brunel University; 1997. [cited 2019 Aug 18]. Available from: http://bura.brunel.ac.uk/handle/2438/7131 ; http://ethos.bl.uk/OrderDetails.do?uin=uk.bl.ethos.361095.

Council of Science Editors:

Cheema TA. Higher-order finite-difference methods for partial differential equations. [Doctoral Dissertation]. Brunel University; 1997. Available from: http://bura.brunel.ac.uk/handle/2438/7131 ; http://ethos.bl.uk/OrderDetails.do?uin=uk.bl.ethos.361095


University of Oklahoma

4. Thapa, Narayan. Parameter Estimation for Damped Sine-Gordon Equation with Neumann Boundary Condition.

Degree: PhD, 2010, University of Oklahoma

 In this thesis we study an identification problem for physical parameters associated with damped sine-Gordon equation with Neumann boundary conditions. The existence, uniqueness, and continuous… (more)

Subjects/Keywords: Parameter estimation; Neumann problem; Differential equations, Nonlinear; Differential equations, Hyperbolic; Differential equations, Partial

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APA (6th Edition):

Thapa, N. (2010). Parameter Estimation for Damped Sine-Gordon Equation with Neumann Boundary Condition. (Doctoral Dissertation). University of Oklahoma. Retrieved from http://hdl.handle.net/11244/318645

Chicago Manual of Style (16th Edition):

Thapa, Narayan. “Parameter Estimation for Damped Sine-Gordon Equation with Neumann Boundary Condition.” 2010. Doctoral Dissertation, University of Oklahoma. Accessed August 18, 2019. http://hdl.handle.net/11244/318645.

MLA Handbook (7th Edition):

Thapa, Narayan. “Parameter Estimation for Damped Sine-Gordon Equation with Neumann Boundary Condition.” 2010. Web. 18 Aug 2019.

Vancouver:

Thapa N. Parameter Estimation for Damped Sine-Gordon Equation with Neumann Boundary Condition. [Internet] [Doctoral dissertation]. University of Oklahoma; 2010. [cited 2019 Aug 18]. Available from: http://hdl.handle.net/11244/318645.

Council of Science Editors:

Thapa N. Parameter Estimation for Damped Sine-Gordon Equation with Neumann Boundary Condition. [Doctoral Dissertation]. University of Oklahoma; 2010. Available from: http://hdl.handle.net/11244/318645


University of North Texas

5. Howard, Tamani M. Hyperbolic Monge-Ampère Equation.

Degree: 2006, University of North Texas

 In this paper we use the Sobolev steepest descent method introduced by John W. Neuberger to solve the hyperbolic Monge-Ampère equation. First, we use the… (more)

Subjects/Keywords: Monge-Ampère equations.; Differential equations, Hyperbolic.; hyperbolic; equation; differential

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APA (6th Edition):

Howard, T. M. (2006). Hyperbolic Monge-Ampère Equation. (Thesis). University of North Texas. Retrieved from https://digital.library.unt.edu/ark:/67531/metadc5322/

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Chicago Manual of Style (16th Edition):

Howard, Tamani M. “Hyperbolic Monge-Ampère Equation.” 2006. Thesis, University of North Texas. Accessed August 18, 2019. https://digital.library.unt.edu/ark:/67531/metadc5322/.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

MLA Handbook (7th Edition):

Howard, Tamani M. “Hyperbolic Monge-Ampère Equation.” 2006. Web. 18 Aug 2019.

Vancouver:

Howard TM. Hyperbolic Monge-Ampère Equation. [Internet] [Thesis]. University of North Texas; 2006. [cited 2019 Aug 18]. Available from: https://digital.library.unt.edu/ark:/67531/metadc5322/.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Council of Science Editors:

Howard TM. Hyperbolic Monge-Ampère Equation. [Thesis]. University of North Texas; 2006. Available from: https://digital.library.unt.edu/ark:/67531/metadc5322/

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation


University of KwaZulu-Natal

6. [No author]. Nonclassical solutions of hyperbolic conservation laws.

Degree: University of KwaZulu-Natal

 This dissertation studies the nonclassical shock waves which appears as limits of certain type diffusive-dispersive regularisation to hyperbolic of conservation laws. Such shocks occur very… (more)

Subjects/Keywords: Differential equations, Hyperbolic.; Applied mathematics.

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APA (6th Edition):

author], [. (n.d.). Nonclassical solutions of hyperbolic conservation laws. (Thesis). University of KwaZulu-Natal. Retrieved from http://hdl.handle.net/10413/13030

Note: this citation may be lacking information needed for this citation format:
No year of publication.
Not specified: Masters Thesis or Doctoral Dissertation

Chicago Manual of Style (16th Edition):

author], [No. “Nonclassical solutions of hyperbolic conservation laws. ” Thesis, University of KwaZulu-Natal. Accessed August 18, 2019. http://hdl.handle.net/10413/13030.

Note: this citation may be lacking information needed for this citation format:
No year of publication.
Not specified: Masters Thesis or Doctoral Dissertation

MLA Handbook (7th Edition):

author], [No. “Nonclassical solutions of hyperbolic conservation laws. ” Web. 18 Aug 2019.

Note: this citation may be lacking information needed for this citation format:
No year of publication.

Vancouver:

author] [. Nonclassical solutions of hyperbolic conservation laws. [Internet] [Thesis]. University of KwaZulu-Natal; [cited 2019 Aug 18]. Available from: http://hdl.handle.net/10413/13030.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation
No year of publication.

Council of Science Editors:

author] [. Nonclassical solutions of hyperbolic conservation laws. [Thesis]. University of KwaZulu-Natal; Available from: http://hdl.handle.net/10413/13030

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation
No year of publication.


University of Oxford

7. Wardrop, Simon. The computation of equilibrium solutions of forced hyperbolic partial differential equations.

Degree: 1990, University of Oxford

 This thesis investigates the convergence of numerical schemes for the computation of equilibrium solutions. These are solutions of evolutionary PDEs that arise from (bounded, non-decaying)… (more)

Subjects/Keywords: 510; Differential equations, Hyperbolic

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APA (6th Edition):

Wardrop, S. (1990). The computation of equilibrium solutions of forced hyperbolic partial differential equations. (Doctoral Dissertation). University of Oxford. Retrieved from http://ora.ox.ac.uk/objects/uuid:041c499a-199e-44ea-92a4-c36fff2504c5 ; http://ethos.bl.uk/OrderDetails.do?uin=uk.bl.ethos.280011

Chicago Manual of Style (16th Edition):

Wardrop, Simon. “The computation of equilibrium solutions of forced hyperbolic partial differential equations.” 1990. Doctoral Dissertation, University of Oxford. Accessed August 18, 2019. http://ora.ox.ac.uk/objects/uuid:041c499a-199e-44ea-92a4-c36fff2504c5 ; http://ethos.bl.uk/OrderDetails.do?uin=uk.bl.ethos.280011.

MLA Handbook (7th Edition):

Wardrop, Simon. “The computation of equilibrium solutions of forced hyperbolic partial differential equations.” 1990. Web. 18 Aug 2019.

Vancouver:

Wardrop S. The computation of equilibrium solutions of forced hyperbolic partial differential equations. [Internet] [Doctoral dissertation]. University of Oxford; 1990. [cited 2019 Aug 18]. Available from: http://ora.ox.ac.uk/objects/uuid:041c499a-199e-44ea-92a4-c36fff2504c5 ; http://ethos.bl.uk/OrderDetails.do?uin=uk.bl.ethos.280011.

Council of Science Editors:

Wardrop S. The computation of equilibrium solutions of forced hyperbolic partial differential equations. [Doctoral Dissertation]. University of Oxford; 1990. Available from: http://ora.ox.ac.uk/objects/uuid:041c499a-199e-44ea-92a4-c36fff2504c5 ; http://ethos.bl.uk/OrderDetails.do?uin=uk.bl.ethos.280011


Penn State University

8. Khorsandi Kouhanestant, Saeid. Mathematics of multiphase multiphysics transport in porous media.

Degree: PhD, Energy and Mineral Engineering, 2016, Penn State University

 Modeling complex interaction of flow and phase behavior is the key for modeling local displacement efficiency of many EOR processes. The interaction is more complex… (more)

Subjects/Keywords: Enhanced oil recovery; MMP; Riemann problem; Hyperbolic equations; Method of Characteristics

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APA (6th Edition):

Khorsandi Kouhanestant, S. (2016). Mathematics of multiphase multiphysics transport in porous media. (Doctoral Dissertation). Penn State University. Retrieved from https://etda.libraries.psu.edu/catalog/29030

Chicago Manual of Style (16th Edition):

Khorsandi Kouhanestant, Saeid. “Mathematics of multiphase multiphysics transport in porous media.” 2016. Doctoral Dissertation, Penn State University. Accessed August 18, 2019. https://etda.libraries.psu.edu/catalog/29030.

MLA Handbook (7th Edition):

Khorsandi Kouhanestant, Saeid. “Mathematics of multiphase multiphysics transport in porous media.” 2016. Web. 18 Aug 2019.

Vancouver:

Khorsandi Kouhanestant S. Mathematics of multiphase multiphysics transport in porous media. [Internet] [Doctoral dissertation]. Penn State University; 2016. [cited 2019 Aug 18]. Available from: https://etda.libraries.psu.edu/catalog/29030.

Council of Science Editors:

Khorsandi Kouhanestant S. Mathematics of multiphase multiphysics transport in porous media. [Doctoral Dissertation]. Penn State University; 2016. Available from: https://etda.libraries.psu.edu/catalog/29030


Montana State University

9. McArthur, Kelly Marie. Sinc-Galerkin solution of second-order hyperbolic problems in multiple space dimensions.

Degree: College of Letters & Science, 1987, Montana State University

Subjects/Keywords: Galerkin methods.; Differential equations, Hyperbolic.

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APA (6th Edition):

McArthur, K. M. (1987). Sinc-Galerkin solution of second-order hyperbolic problems in multiple space dimensions. (Thesis). Montana State University. Retrieved from https://scholarworks.montana.edu/xmlui/handle/1/6341

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Chicago Manual of Style (16th Edition):

McArthur, Kelly Marie. “Sinc-Galerkin solution of second-order hyperbolic problems in multiple space dimensions.” 1987. Thesis, Montana State University. Accessed August 18, 2019. https://scholarworks.montana.edu/xmlui/handle/1/6341.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

MLA Handbook (7th Edition):

McArthur, Kelly Marie. “Sinc-Galerkin solution of second-order hyperbolic problems in multiple space dimensions.” 1987. Web. 18 Aug 2019.

Vancouver:

McArthur KM. Sinc-Galerkin solution of second-order hyperbolic problems in multiple space dimensions. [Internet] [Thesis]. Montana State University; 1987. [cited 2019 Aug 18]. Available from: https://scholarworks.montana.edu/xmlui/handle/1/6341.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Council of Science Editors:

McArthur KM. Sinc-Galerkin solution of second-order hyperbolic problems in multiple space dimensions. [Thesis]. Montana State University; 1987. Available from: https://scholarworks.montana.edu/xmlui/handle/1/6341

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation


Indiana University

10. Wang, Chuntian. Initial and Boundary value problems for the Deterministic and Stochastic Zakharov-Kuznetsov Equation in a Bounded Domain .

Degree: 2015, Indiana University

 We study in this thesis the well-posedness and regularity of the Zakharov-Kuznetsov (ZK) equation in the deterministic and stochastic cases, subjected to a rectangular domain… (more)

Subjects/Keywords: Korteweg-de Vries Equation; Partially-Hyperbolic Equations; Plasma Physics; Zakharov-Kuznetsov

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APA (6th Edition):

Wang, C. (2015). Initial and Boundary value problems for the Deterministic and Stochastic Zakharov-Kuznetsov Equation in a Bounded Domain . (Thesis). Indiana University. Retrieved from http://hdl.handle.net/2022/19939

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Chicago Manual of Style (16th Edition):

Wang, Chuntian. “Initial and Boundary value problems for the Deterministic and Stochastic Zakharov-Kuznetsov Equation in a Bounded Domain .” 2015. Thesis, Indiana University. Accessed August 18, 2019. http://hdl.handle.net/2022/19939.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

MLA Handbook (7th Edition):

Wang, Chuntian. “Initial and Boundary value problems for the Deterministic and Stochastic Zakharov-Kuznetsov Equation in a Bounded Domain .” 2015. Web. 18 Aug 2019.

Vancouver:

Wang C. Initial and Boundary value problems for the Deterministic and Stochastic Zakharov-Kuznetsov Equation in a Bounded Domain . [Internet] [Thesis]. Indiana University; 2015. [cited 2019 Aug 18]. Available from: http://hdl.handle.net/2022/19939.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Council of Science Editors:

Wang C. Initial and Boundary value problems for the Deterministic and Stochastic Zakharov-Kuznetsov Equation in a Bounded Domain . [Thesis]. Indiana University; 2015. Available from: http://hdl.handle.net/2022/19939

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation


Massey University

11. Dillon, Samuel Adam Kuakini. Resolving decomposition by blowing up points and quasiconformal harmonic extensions.

Degree: PhD, Mathematics, 2012, Massey University

 In this thesis we consider two problems regarding mappings between various two-dimensional spaces with some constraint on their distortion. The first question concerns the use… (more)

Subjects/Keywords: Mappings (Mathematics); Homeomorphism; Quasiconformal mappings; Differential equations; Decomposition resolution; Hyperbolic geometry

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APA (6th Edition):

Dillon, S. A. K. (2012). Resolving decomposition by blowing up points and quasiconformal harmonic extensions. (Doctoral Dissertation). Massey University. Retrieved from http://hdl.handle.net/10179/4267

Chicago Manual of Style (16th Edition):

Dillon, Samuel Adam Kuakini. “Resolving decomposition by blowing up points and quasiconformal harmonic extensions.” 2012. Doctoral Dissertation, Massey University. Accessed August 18, 2019. http://hdl.handle.net/10179/4267.

MLA Handbook (7th Edition):

Dillon, Samuel Adam Kuakini. “Resolving decomposition by blowing up points and quasiconformal harmonic extensions.” 2012. Web. 18 Aug 2019.

Vancouver:

Dillon SAK. Resolving decomposition by blowing up points and quasiconformal harmonic extensions. [Internet] [Doctoral dissertation]. Massey University; 2012. [cited 2019 Aug 18]. Available from: http://hdl.handle.net/10179/4267.

Council of Science Editors:

Dillon SAK. Resolving decomposition by blowing up points and quasiconformal harmonic extensions. [Doctoral Dissertation]. Massey University; 2012. Available from: http://hdl.handle.net/10179/4267


Colorado School of Mines

12. Maestas, Joseph T. Long-range shock propagation in ocean waveguides.

Degree: PhD, Applied Mathematics and Statistics, 2015, Colorado School of Mines

 Shock waves in the ocean are able to propagate over hundreds of meters as they slowly decay into linear sound waves. Accurate assessment of shock… (more)

Subjects/Keywords: hyperbolic problem; parabolic equations; weak shock; nonlinear acoustics; elasticity; propagation models

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APA (6th Edition):

Maestas, J. T. (2015). Long-range shock propagation in ocean waveguides. (Doctoral Dissertation). Colorado School of Mines. Retrieved from http://hdl.handle.net/11124/18054

Chicago Manual of Style (16th Edition):

Maestas, Joseph T. “Long-range shock propagation in ocean waveguides.” 2015. Doctoral Dissertation, Colorado School of Mines. Accessed August 18, 2019. http://hdl.handle.net/11124/18054.

MLA Handbook (7th Edition):

Maestas, Joseph T. “Long-range shock propagation in ocean waveguides.” 2015. Web. 18 Aug 2019.

Vancouver:

Maestas JT. Long-range shock propagation in ocean waveguides. [Internet] [Doctoral dissertation]. Colorado School of Mines; 2015. [cited 2019 Aug 18]. Available from: http://hdl.handle.net/11124/18054.

Council of Science Editors:

Maestas JT. Long-range shock propagation in ocean waveguides. [Doctoral Dissertation]. Colorado School of Mines; 2015. Available from: http://hdl.handle.net/11124/18054

13. Singh, Suruchi Nee Suruchi. A class of efficient finitedifference discretization for thesolution of second order quasilinearhyperbolic equations;.

Degree: MATHEMATICS, 2012, University of Delhi

Abstract available newline

References p. 163 to 276

Advisors/Committee Members: Mohanty, R K.

Subjects/Keywords: FINITE DIFFERENCE DISCRETIZATION; QUASILINEAR HYPERBOLIC EQUATIONS

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APA (6th Edition):

Singh, S. N. S. (2012). A class of efficient finitedifference discretization for thesolution of second order quasilinearhyperbolic equations;. (Thesis). University of Delhi. Retrieved from http://shodhganga.inflibnet.ac.in/handle/10603/28332

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Chicago Manual of Style (16th Edition):

Singh, Suruchi Nee Suruchi. “A class of efficient finitedifference discretization for thesolution of second order quasilinearhyperbolic equations;.” 2012. Thesis, University of Delhi. Accessed August 18, 2019. http://shodhganga.inflibnet.ac.in/handle/10603/28332.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

MLA Handbook (7th Edition):

Singh, Suruchi Nee Suruchi. “A class of efficient finitedifference discretization for thesolution of second order quasilinearhyperbolic equations;.” 2012. Web. 18 Aug 2019.

Vancouver:

Singh SNS. A class of efficient finitedifference discretization for thesolution of second order quasilinearhyperbolic equations;. [Internet] [Thesis]. University of Delhi; 2012. [cited 2019 Aug 18]. Available from: http://shodhganga.inflibnet.ac.in/handle/10603/28332.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Council of Science Editors:

Singh SNS. A class of efficient finitedifference discretization for thesolution of second order quasilinearhyperbolic equations;. [Thesis]. University of Delhi; 2012. Available from: http://shodhganga.inflibnet.ac.in/handle/10603/28332

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

14. Gopal, Venu. Numerical treatment for the solution of multi dimensional second order nonlinear hyperbolic equations; -.

Degree: Mathematics, 2013, University of Delhi

Available

Reference p.301-318

Advisors/Committee Members: Kumar, Ajay and Saha, L M.

Subjects/Keywords: hyperbolic equations; multi dimensional; Numerical treatment

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APA (6th Edition):

Gopal, V. (2013). Numerical treatment for the solution of multi dimensional second order nonlinear hyperbolic equations; -. (Thesis). University of Delhi. Retrieved from http://shodhganga.inflibnet.ac.in/handle/10603/31774

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Chicago Manual of Style (16th Edition):

Gopal, Venu. “Numerical treatment for the solution of multi dimensional second order nonlinear hyperbolic equations; -.” 2013. Thesis, University of Delhi. Accessed August 18, 2019. http://shodhganga.inflibnet.ac.in/handle/10603/31774.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

MLA Handbook (7th Edition):

Gopal, Venu. “Numerical treatment for the solution of multi dimensional second order nonlinear hyperbolic equations; -.” 2013. Web. 18 Aug 2019.

Vancouver:

Gopal V. Numerical treatment for the solution of multi dimensional second order nonlinear hyperbolic equations; -. [Internet] [Thesis]. University of Delhi; 2013. [cited 2019 Aug 18]. Available from: http://shodhganga.inflibnet.ac.in/handle/10603/31774.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Council of Science Editors:

Gopal V. Numerical treatment for the solution of multi dimensional second order nonlinear hyperbolic equations; -. [Thesis]. University of Delhi; 2013. Available from: http://shodhganga.inflibnet.ac.in/handle/10603/31774

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation


Australian National University

15. Harding, Thomas Brendan. Fault Tolerant Computation of Hyperbolic Partial Differential Equations with the Sparse Grid Combination Technique .

Degree: 2016, Australian National University

 As the computing power of supercomputers continues to increase exponentially the mean time between failures (MTBF) is decreasing. Checkpoint-restart has historically been the method of… (more)

Subjects/Keywords: sparse grid; fault tolerance; hyperbolic partial differential equations; combination technique; high performance computing

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APA (6th Edition):

Harding, T. B. (2016). Fault Tolerant Computation of Hyperbolic Partial Differential Equations with the Sparse Grid Combination Technique . (Thesis). Australian National University. Retrieved from http://hdl.handle.net/1885/101226

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Chicago Manual of Style (16th Edition):

Harding, Thomas Brendan. “Fault Tolerant Computation of Hyperbolic Partial Differential Equations with the Sparse Grid Combination Technique .” 2016. Thesis, Australian National University. Accessed August 18, 2019. http://hdl.handle.net/1885/101226.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

MLA Handbook (7th Edition):

Harding, Thomas Brendan. “Fault Tolerant Computation of Hyperbolic Partial Differential Equations with the Sparse Grid Combination Technique .” 2016. Web. 18 Aug 2019.

Vancouver:

Harding TB. Fault Tolerant Computation of Hyperbolic Partial Differential Equations with the Sparse Grid Combination Technique . [Internet] [Thesis]. Australian National University; 2016. [cited 2019 Aug 18]. Available from: http://hdl.handle.net/1885/101226.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Council of Science Editors:

Harding TB. Fault Tolerant Computation of Hyperbolic Partial Differential Equations with the Sparse Grid Combination Technique . [Thesis]. Australian National University; 2016. Available from: http://hdl.handle.net/1885/101226

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation


Hong Kong University of Science and Technology

16. Lok, Andrew. Pseudo time marching method for steady state solution of hyperbolic and parabolic equations.

Degree: 1995, Hong Kong University of Science and Technology

 The conventional approach for steady state solution of partial differential equation is Newton-Raphson method. However, the computational cost of Newton-Raphson's method is high. Moreover, convergence… (more)

Subjects/Keywords: Differential equations, Hyperbolic; Differential equations, Parabolic; Runge-Kutta formulas

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APA (6th Edition):

Lok, A. (1995). Pseudo time marching method for steady state solution of hyperbolic and parabolic equations. (Thesis). Hong Kong University of Science and Technology. Retrieved from https://doi.org/10.14711/thesis-b491967 ; http://repository.ust.hk/ir/bitstream/1783.1-5049/1/th_redirect.html

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Chicago Manual of Style (16th Edition):

Lok, Andrew. “Pseudo time marching method for steady state solution of hyperbolic and parabolic equations.” 1995. Thesis, Hong Kong University of Science and Technology. Accessed August 18, 2019. https://doi.org/10.14711/thesis-b491967 ; http://repository.ust.hk/ir/bitstream/1783.1-5049/1/th_redirect.html.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

MLA Handbook (7th Edition):

Lok, Andrew. “Pseudo time marching method for steady state solution of hyperbolic and parabolic equations.” 1995. Web. 18 Aug 2019.

Vancouver:

Lok A. Pseudo time marching method for steady state solution of hyperbolic and parabolic equations. [Internet] [Thesis]. Hong Kong University of Science and Technology; 1995. [cited 2019 Aug 18]. Available from: https://doi.org/10.14711/thesis-b491967 ; http://repository.ust.hk/ir/bitstream/1783.1-5049/1/th_redirect.html.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Council of Science Editors:

Lok A. Pseudo time marching method for steady state solution of hyperbolic and parabolic equations. [Thesis]. Hong Kong University of Science and Technology; 1995. Available from: https://doi.org/10.14711/thesis-b491967 ; http://repository.ust.hk/ir/bitstream/1783.1-5049/1/th_redirect.html

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

17. Huber, Grégory. Modélisation des effets d'interpénétration entre fluides au travers d'une interface instable : Finite element for finite transformations with a wavelet support.

Degree: Docteur es, Energétique, 2012, Aix Marseille Université

Les mélanges multiphasiques en déséquilibre de vitesse sont habituellement modélisés à l'aide d'un modèle à 6 ou 7 équations (Baer and Nunziato, 1986). Ces modèles… (more)

Subjects/Keywords: Modèle multiphasique; Equations hyperboliques; Interfaces instables; Mélange turbulent; Interpénétration; Multiphase flow model; Hyperbolic equations; Unstable interfaces; Turbulent mixing; Turbulent mixing

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APA (6th Edition):

Huber, G. (2012). Modélisation des effets d'interpénétration entre fluides au travers d'une interface instable : Finite element for finite transformations with a wavelet support. (Doctoral Dissertation). Aix Marseille Université. Retrieved from http://www.theses.fr/2012AIXM4766

Chicago Manual of Style (16th Edition):

Huber, Grégory. “Modélisation des effets d'interpénétration entre fluides au travers d'une interface instable : Finite element for finite transformations with a wavelet support.” 2012. Doctoral Dissertation, Aix Marseille Université. Accessed August 18, 2019. http://www.theses.fr/2012AIXM4766.

MLA Handbook (7th Edition):

Huber, Grégory. “Modélisation des effets d'interpénétration entre fluides au travers d'une interface instable : Finite element for finite transformations with a wavelet support.” 2012. Web. 18 Aug 2019.

Vancouver:

Huber G. Modélisation des effets d'interpénétration entre fluides au travers d'une interface instable : Finite element for finite transformations with a wavelet support. [Internet] [Doctoral dissertation]. Aix Marseille Université 2012. [cited 2019 Aug 18]. Available from: http://www.theses.fr/2012AIXM4766.

Council of Science Editors:

Huber G. Modélisation des effets d'interpénétration entre fluides au travers d'une interface instable : Finite element for finite transformations with a wavelet support. [Doctoral Dissertation]. Aix Marseille Université 2012. Available from: http://www.theses.fr/2012AIXM4766


Rutgers University

18. Speck, Jared R. On the questions of local and global well-posedness for the hyperbolic PDEs occurring in some relativistic theories of gravity and electromagnetism.

Degree: PhD, Mathematics, 2008, Rutgers University

The two hyperbolic systems of PDEs we consider in this work are the source-free Maxwell-Born-Infeld (MBI) field equations and the Euler-Nordstr??m system for gravitationally self-interacting… (more)

Subjects/Keywords: Differential equations, Partial; Differential equations, Hyperbolic; Gravitation; Electromagnetic theory

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APA (6th Edition):

Speck, J. R. (2008). On the questions of local and global well-posedness for the hyperbolic PDEs occurring in some relativistic theories of gravity and electromagnetism. (Doctoral Dissertation). Rutgers University. Retrieved from http://hdl.rutgers.edu/1782.2/rucore10001600001.ETD.17393

Chicago Manual of Style (16th Edition):

Speck, Jared R. “On the questions of local and global well-posedness for the hyperbolic PDEs occurring in some relativistic theories of gravity and electromagnetism.” 2008. Doctoral Dissertation, Rutgers University. Accessed August 18, 2019. http://hdl.rutgers.edu/1782.2/rucore10001600001.ETD.17393.

MLA Handbook (7th Edition):

Speck, Jared R. “On the questions of local and global well-posedness for the hyperbolic PDEs occurring in some relativistic theories of gravity and electromagnetism.” 2008. Web. 18 Aug 2019.

Vancouver:

Speck JR. On the questions of local and global well-posedness for the hyperbolic PDEs occurring in some relativistic theories of gravity and electromagnetism. [Internet] [Doctoral dissertation]. Rutgers University; 2008. [cited 2019 Aug 18]. Available from: http://hdl.rutgers.edu/1782.2/rucore10001600001.ETD.17393.

Council of Science Editors:

Speck JR. On the questions of local and global well-posedness for the hyperbolic PDEs occurring in some relativistic theories of gravity and electromagnetism. [Doctoral Dissertation]. Rutgers University; 2008. Available from: http://hdl.rutgers.edu/1782.2/rucore10001600001.ETD.17393


Indian Institute of Science

19. Maruthi, N H. Hybird Central Solvers for Hyperbolic Conservation Laws.

Degree: 2015, Indian Institute of Science

 The hyperbolic conservation laws model the phenomena of nonlinear waves including discontinuities. The coupled nonlinear equations representing such conservation laws may lead to discontinuous solutions… (more)

Subjects/Keywords: Hyperbolic Conservation Laws; Hyperbolic Partial Differential Equations; Magnetohydrodynamics Equations; Shallow-Water Equations; Euler Equations; Methods of Optimal Viscosity for Enhanced Resolution of Shocks; Numerical Diffusion; Finite Volume Method; Hybrid Central Solver; MOVERS; Aerospace Engineering

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APA (6th Edition):

Maruthi, N. H. (2015). Hybird Central Solvers for Hyperbolic Conservation Laws. (Thesis). Indian Institute of Science. Retrieved from http://etd.iisc.ernet.in/2005/3523 ; http://etd.iisc.ernet.in/abstracts/4391/G27506-Abs.pdf

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Chicago Manual of Style (16th Edition):

Maruthi, N H. “Hybird Central Solvers for Hyperbolic Conservation Laws.” 2015. Thesis, Indian Institute of Science. Accessed August 18, 2019. http://etd.iisc.ernet.in/2005/3523 ; http://etd.iisc.ernet.in/abstracts/4391/G27506-Abs.pdf.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

MLA Handbook (7th Edition):

Maruthi, N H. “Hybird Central Solvers for Hyperbolic Conservation Laws.” 2015. Web. 18 Aug 2019.

Vancouver:

Maruthi NH. Hybird Central Solvers for Hyperbolic Conservation Laws. [Internet] [Thesis]. Indian Institute of Science; 2015. [cited 2019 Aug 18]. Available from: http://etd.iisc.ernet.in/2005/3523 ; http://etd.iisc.ernet.in/abstracts/4391/G27506-Abs.pdf.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Council of Science Editors:

Maruthi NH. Hybird Central Solvers for Hyperbolic Conservation Laws. [Thesis]. Indian Institute of Science; 2015. Available from: http://etd.iisc.ernet.in/2005/3523 ; http://etd.iisc.ernet.in/abstracts/4391/G27506-Abs.pdf

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation


Indian Institute of Science

20. Jaisankar, S. Accurate Computational Algorithms For Hyperbolic Conservation Laws.

Degree: 2008, Indian Institute of Science

 The numerics of hyperbolic conservation laws, e.g., the Euler equations of gas dynamics, shallow water equations and MHD equations, is non-trivial due to the convective… (more)

Subjects/Keywords: Gas Dynamics; Magnetohydrodynamics; Conservation Laws; Algorithms; Numerical Analysis; Diffusion (Mathematical Physics); Hyperbolic Equations (Mathematical Analysis); Diffusion Regulator Model; Hyperbolic Partial Differential Equations; Compressible Flows - Numerical Methods; Hyperbolic Consevation Laws; Diffusion Regulated Schemes; Upwind-Biased Scheme; Rankine Hugoniot Solver; Grid-free Central Solver; Applied Mechanics

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APA (6th Edition):

Jaisankar, S. (2008). Accurate Computational Algorithms For Hyperbolic Conservation Laws. (Thesis). Indian Institute of Science. Retrieved from http://hdl.handle.net/2005/905

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Chicago Manual of Style (16th Edition):

Jaisankar, S. “Accurate Computational Algorithms For Hyperbolic Conservation Laws.” 2008. Thesis, Indian Institute of Science. Accessed August 18, 2019. http://hdl.handle.net/2005/905.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

MLA Handbook (7th Edition):

Jaisankar, S. “Accurate Computational Algorithms For Hyperbolic Conservation Laws.” 2008. Web. 18 Aug 2019.

Vancouver:

Jaisankar S. Accurate Computational Algorithms For Hyperbolic Conservation Laws. [Internet] [Thesis]. Indian Institute of Science; 2008. [cited 2019 Aug 18]. Available from: http://hdl.handle.net/2005/905.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Council of Science Editors:

Jaisankar S. Accurate Computational Algorithms For Hyperbolic Conservation Laws. [Thesis]. Indian Institute of Science; 2008. Available from: http://hdl.handle.net/2005/905

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation


California State University – San Bernardino

21. Marfai, Frank S. Hyperbolic transformations on cubics in H².

Degree: MAin Teaching, Mathematics, Mathematics, 2003, California State University – San Bernardino

 The purpose of this thesis is to study the effects of hyperbolic transformations on the cubic that is determined by locus of centroids of the… (more)

Subjects/Keywords: Henri Poincaré 1854-1912; Hyperbolic Geometry; Hyperbolic Differential equations; Möbius transformations; Mathematics

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APA (6th Edition):

Marfai, F. S. (2003). Hyperbolic transformations on cubics in H². (Thesis). California State University – San Bernardino. Retrieved from http://scholarworks.lib.csusb.edu/etd-project/142

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Chicago Manual of Style (16th Edition):

Marfai, Frank S. “Hyperbolic transformations on cubics in H².” 2003. Thesis, California State University – San Bernardino. Accessed August 18, 2019. http://scholarworks.lib.csusb.edu/etd-project/142.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

MLA Handbook (7th Edition):

Marfai, Frank S. “Hyperbolic transformations on cubics in H².” 2003. Web. 18 Aug 2019.

Vancouver:

Marfai FS. Hyperbolic transformations on cubics in H². [Internet] [Thesis]. California State University – San Bernardino; 2003. [cited 2019 Aug 18]. Available from: http://scholarworks.lib.csusb.edu/etd-project/142.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Council of Science Editors:

Marfai FS. Hyperbolic transformations on cubics in H². [Thesis]. California State University – San Bernardino; 2003. Available from: http://scholarworks.lib.csusb.edu/etd-project/142

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation


University of Alberta

22. Alizadeh Moghadam, Amir. Infinite-Dimensional LQ Control for Combined Lumped and Distributed Parameter Systems.

Degree: PhD, Department of Chemical and Materials Engineering, 2013, University of Alberta

 Transport-reaction processes are extensively present in chemical engineering practice. Typically, these processes involve phase equilibria and/or are combined with well-mixed processes. Examples include counter-current two-phase… (more)

Subjects/Keywords: Hyperbolic PDE; Coupled PDE-Algebraic Equations; Linear Quadratic; Optimal Control; Infinite-Dimensional Systems; Distributed Parameter Systems; Coupled PDE-ODE

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APA (6th Edition):

Alizadeh Moghadam, A. (2013). Infinite-Dimensional LQ Control for Combined Lumped and Distributed Parameter Systems. (Doctoral Dissertation). University of Alberta. Retrieved from https://era.library.ualberta.ca/files/ft848r151

Chicago Manual of Style (16th Edition):

Alizadeh Moghadam, Amir. “Infinite-Dimensional LQ Control for Combined Lumped and Distributed Parameter Systems.” 2013. Doctoral Dissertation, University of Alberta. Accessed August 18, 2019. https://era.library.ualberta.ca/files/ft848r151.

MLA Handbook (7th Edition):

Alizadeh Moghadam, Amir. “Infinite-Dimensional LQ Control for Combined Lumped and Distributed Parameter Systems.” 2013. Web. 18 Aug 2019.

Vancouver:

Alizadeh Moghadam A. Infinite-Dimensional LQ Control for Combined Lumped and Distributed Parameter Systems. [Internet] [Doctoral dissertation]. University of Alberta; 2013. [cited 2019 Aug 18]. Available from: https://era.library.ualberta.ca/files/ft848r151.

Council of Science Editors:

Alizadeh Moghadam A. Infinite-Dimensional LQ Control for Combined Lumped and Distributed Parameter Systems. [Doctoral Dissertation]. University of Alberta; 2013. Available from: https://era.library.ualberta.ca/files/ft848r151


California State University – San Bernardino

23. Silva, Paul Jerome. Investigation of the effectiveness of interface constraints in the solution of hyperbolic second-order differential equations.

Degree: MAin Mathematics, Mathematics, 2000, California State University – San Bernardino

 Solutions to differential equations describing the behavior of physical quantities (e.g., displacement, temperature, electric field strength) often only have finite range of validity over a… (more)

Subjects/Keywords: Hyperbolic Differential equations; Geometry; Geometry and Topology

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APA (6th Edition):

Silva, P. J. (2000). Investigation of the effectiveness of interface constraints in the solution of hyperbolic second-order differential equations. (Thesis). California State University – San Bernardino. Retrieved from http://scholarworks.lib.csusb.edu/etd-project/1953

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Chicago Manual of Style (16th Edition):

Silva, Paul Jerome. “Investigation of the effectiveness of interface constraints in the solution of hyperbolic second-order differential equations.” 2000. Thesis, California State University – San Bernardino. Accessed August 18, 2019. http://scholarworks.lib.csusb.edu/etd-project/1953.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

MLA Handbook (7th Edition):

Silva, Paul Jerome. “Investigation of the effectiveness of interface constraints in the solution of hyperbolic second-order differential equations.” 2000. Web. 18 Aug 2019.

Vancouver:

Silva PJ. Investigation of the effectiveness of interface constraints in the solution of hyperbolic second-order differential equations. [Internet] [Thesis]. California State University – San Bernardino; 2000. [cited 2019 Aug 18]. Available from: http://scholarworks.lib.csusb.edu/etd-project/1953.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Council of Science Editors:

Silva PJ. Investigation of the effectiveness of interface constraints in the solution of hyperbolic second-order differential equations. [Thesis]. California State University – San Bernardino; 2000. Available from: http://scholarworks.lib.csusb.edu/etd-project/1953

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation


University of Washington

24. Davis, Brisa. Adjoint-Guided Adaptive Mesh Refinement for Hyperbolic Systems of Equations.

Degree: PhD, 2018, University of Washington

 One difficulty in developing numerical methods for time-dependent partial differential equations is the fact that solutions contain time-varying regions where much higher resolution is required… (more)

Subjects/Keywords: Adaptive mesh refinement; Adjoint problem; AMRClaw; Clawpack; Finite volume method; Hyperbolic equations; Applied mathematics; Applied mathematics

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APA (6th Edition):

Davis, B. (2018). Adjoint-Guided Adaptive Mesh Refinement for Hyperbolic Systems of Equations. (Doctoral Dissertation). University of Washington. Retrieved from http://hdl.handle.net/1773/42950

Chicago Manual of Style (16th Edition):

Davis, Brisa. “Adjoint-Guided Adaptive Mesh Refinement for Hyperbolic Systems of Equations.” 2018. Doctoral Dissertation, University of Washington. Accessed August 18, 2019. http://hdl.handle.net/1773/42950.

MLA Handbook (7th Edition):

Davis, Brisa. “Adjoint-Guided Adaptive Mesh Refinement for Hyperbolic Systems of Equations.” 2018. Web. 18 Aug 2019.

Vancouver:

Davis B. Adjoint-Guided Adaptive Mesh Refinement for Hyperbolic Systems of Equations. [Internet] [Doctoral dissertation]. University of Washington; 2018. [cited 2019 Aug 18]. Available from: http://hdl.handle.net/1773/42950.

Council of Science Editors:

Davis B. Adjoint-Guided Adaptive Mesh Refinement for Hyperbolic Systems of Equations. [Doctoral Dissertation]. University of Washington; 2018. Available from: http://hdl.handle.net/1773/42950


Virginia Tech

25. Hagen, Thomas Ch. Elongational Flows in Polymer Processing.

Degree: PhD, Mathematics, 1998, Virginia Tech

  The production of long, thin polymeric fibers is a main objective of the textile industry. Melt-spinning is a particularly simple and effective technique. In… (more)

Subjects/Keywords: Fiber Spinning; Linear Stability; Quasilinear Hyperbolic Equations; Spectral Determinacy

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APA (6th Edition):

Hagen, T. C. (1998). Elongational Flows in Polymer Processing. (Doctoral Dissertation). Virginia Tech. Retrieved from http://hdl.handle.net/10919/29437

Chicago Manual of Style (16th Edition):

Hagen, Thomas Ch. “Elongational Flows in Polymer Processing.” 1998. Doctoral Dissertation, Virginia Tech. Accessed August 18, 2019. http://hdl.handle.net/10919/29437.

MLA Handbook (7th Edition):

Hagen, Thomas Ch. “Elongational Flows in Polymer Processing.” 1998. Web. 18 Aug 2019.

Vancouver:

Hagen TC. Elongational Flows in Polymer Processing. [Internet] [Doctoral dissertation]. Virginia Tech; 1998. [cited 2019 Aug 18]. Available from: http://hdl.handle.net/10919/29437.

Council of Science Editors:

Hagen TC. Elongational Flows in Polymer Processing. [Doctoral Dissertation]. Virginia Tech; 1998. Available from: http://hdl.handle.net/10919/29437


MIT

26. Uhlmann Arancibia, Gunther Alberto. Hyperbolic-pseudodifferential operators with double characteristics.

Degree: 1976, MIT

Subjects/Keywords: Mathematics; Differential equations, Hyperbolic; Pseudodifferential operators; Cauchy problem

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APA (6th Edition):

Uhlmann Arancibia, G. A. (1976). Hyperbolic-pseudodifferential operators with double characteristics. (Thesis). MIT. Retrieved from http://hdl.handle.net/1721.1/108857

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Chicago Manual of Style (16th Edition):

Uhlmann Arancibia, Gunther Alberto. “Hyperbolic-pseudodifferential operators with double characteristics. ” 1976. Thesis, MIT. Accessed August 18, 2019. http://hdl.handle.net/1721.1/108857.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

MLA Handbook (7th Edition):

Uhlmann Arancibia, Gunther Alberto. “Hyperbolic-pseudodifferential operators with double characteristics. ” 1976. Web. 18 Aug 2019.

Vancouver:

Uhlmann Arancibia GA. Hyperbolic-pseudodifferential operators with double characteristics. [Internet] [Thesis]. MIT; 1976. [cited 2019 Aug 18]. Available from: http://hdl.handle.net/1721.1/108857.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Council of Science Editors:

Uhlmann Arancibia GA. Hyperbolic-pseudodifferential operators with double characteristics. [Thesis]. MIT; 1976. Available from: http://hdl.handle.net/1721.1/108857

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation


University of Oregon

27. Luo, Xianghui, 1983-. Symmetries of Cauchy Horizons and Global Stability of Cosmological Models.

Degree: 2011, University of Oregon

 This dissertation contains the results obtained from a study of two subjects in mathematical general relativity. The first part of this dissertation is about the… (more)

Subjects/Keywords: Theoretical physics; Mathematics; Applied mathematics; Cauchy horizon; Cosmology; General relativity; Global stability; Hyperbolic partial differential equations; Mathematical relativity

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APA (6th Edition):

Luo, Xianghui, 1. (2011). Symmetries of Cauchy Horizons and Global Stability of Cosmological Models. (Thesis). University of Oregon. Retrieved from http://hdl.handle.net/1794/11543

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Chicago Manual of Style (16th Edition):

Luo, Xianghui, 1983-. “Symmetries of Cauchy Horizons and Global Stability of Cosmological Models.” 2011. Thesis, University of Oregon. Accessed August 18, 2019. http://hdl.handle.net/1794/11543.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

MLA Handbook (7th Edition):

Luo, Xianghui, 1983-. “Symmetries of Cauchy Horizons and Global Stability of Cosmological Models.” 2011. Web. 18 Aug 2019.

Vancouver:

Luo, Xianghui 1. Symmetries of Cauchy Horizons and Global Stability of Cosmological Models. [Internet] [Thesis]. University of Oregon; 2011. [cited 2019 Aug 18]. Available from: http://hdl.handle.net/1794/11543.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Council of Science Editors:

Luo, Xianghui 1. Symmetries of Cauchy Horizons and Global Stability of Cosmological Models. [Thesis]. University of Oregon; 2011. Available from: http://hdl.handle.net/1794/11543

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation


Iowa State University

28. Jiang, Yi. Invariant-region-preserving discontinuous Galerkin methods for systems of hyperbolic conservation laws.

Degree: 2018, Iowa State University

 This thesis is aimed at developing high order invariant-region-preserving (IRP) discontinuous Galerkin (DG) schemes solving hyperbolic conservation law systems. In particular, our focus is on… (more)

Subjects/Keywords: compressible Euler equations; discontinuous Galerkin method; gas dynamics; hyperbolic conservation laws; invariant region; p-system; Mathematics

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APA (6th Edition):

Jiang, Y. (2018). Invariant-region-preserving discontinuous Galerkin methods for systems of hyperbolic conservation laws. (Thesis). Iowa State University. Retrieved from https://lib.dr.iastate.edu/etd/16599

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Chicago Manual of Style (16th Edition):

Jiang, Yi. “Invariant-region-preserving discontinuous Galerkin methods for systems of hyperbolic conservation laws.” 2018. Thesis, Iowa State University. Accessed August 18, 2019. https://lib.dr.iastate.edu/etd/16599.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

MLA Handbook (7th Edition):

Jiang, Yi. “Invariant-region-preserving discontinuous Galerkin methods for systems of hyperbolic conservation laws.” 2018. Web. 18 Aug 2019.

Vancouver:

Jiang Y. Invariant-region-preserving discontinuous Galerkin methods for systems of hyperbolic conservation laws. [Internet] [Thesis]. Iowa State University; 2018. [cited 2019 Aug 18]. Available from: https://lib.dr.iastate.edu/etd/16599.

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation

Council of Science Editors:

Jiang Y. Invariant-region-preserving discontinuous Galerkin methods for systems of hyperbolic conservation laws. [Thesis]. Iowa State University; 2018. Available from: https://lib.dr.iastate.edu/etd/16599

Note: this citation may be lacking information needed for this citation format:
Not specified: Masters Thesis or Doctoral Dissertation


University of Michigan

29. Hern, Gerardo. Numerical Methods for Porous Media and Shallow Water Flows & An Algebra of Singular Semiclassical Pseudodifferential Operators.

Degree: PhD, Mathematics, 2011, University of Michigan

 noindent {bf Numerical Methods for Hyperbolic Systems.} This work considers the Baer-Nunziato model for two-phase flows in porous media with discontinuous porosity. Numerical discretizations may… (more)

Subjects/Keywords: Partial Differential Equations; Hyperbolic Balance Laws; Semiclassical Analysis; Upwind Schemes; Multiphase Flows; Fourier Integral Operators; Mathematics; Science

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APA · Chicago · MLA · Vancouver · CSE | Export to Zotero / EndNote / Reference Manager

APA (6th Edition):

Hern, G. (2011). Numerical Methods for Porous Media and Shallow Water Flows & An Algebra of Singular Semiclassical Pseudodifferential Operators. (Doctoral Dissertation). University of Michigan. Retrieved from http://hdl.handle.net/2027.42/86522

Chicago Manual of Style (16th Edition):

Hern, Gerardo. “Numerical Methods for Porous Media and Shallow Water Flows & An Algebra of Singular Semiclassical Pseudodifferential Operators.” 2011. Doctoral Dissertation, University of Michigan. Accessed August 18, 2019. http://hdl.handle.net/2027.42/86522.

MLA Handbook (7th Edition):

Hern, Gerardo. “Numerical Methods for Porous Media and Shallow Water Flows & An Algebra of Singular Semiclassical Pseudodifferential Operators.” 2011. Web. 18 Aug 2019.

Vancouver:

Hern G. Numerical Methods for Porous Media and Shallow Water Flows & An Algebra of Singular Semiclassical Pseudodifferential Operators. [Internet] [Doctoral dissertation]. University of Michigan; 2011. [cited 2019 Aug 18]. Available from: http://hdl.handle.net/2027.42/86522.

Council of Science Editors:

Hern G. Numerical Methods for Porous Media and Shallow Water Flows & An Algebra of Singular Semiclassical Pseudodifferential Operators. [Doctoral Dissertation]. University of Michigan; 2011. Available from: http://hdl.handle.net/2027.42/86522


Utah State University

30. Jurás, Martin. Geometric Aspects of Second-Order Scalar Hyperbolic Partial Differential Equations in the Plane.

Degree: PhD, Mathematics and Statistics, 1997, Utah State University

  The purpose of this dissertation is to address various geometric aspects of second-order scalar hyperbolic partial differential equations in two independent variables and one… (more)

Subjects/Keywords: geometric; second-order; hyperbolic; differential equations; plane; Mathematics

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APA · Chicago · MLA · Vancouver · CSE | Export to Zotero / EndNote / Reference Manager

APA (6th Edition):

Jurás, M. (1997). Geometric Aspects of Second-Order Scalar Hyperbolic Partial Differential Equations in the Plane. (Doctoral Dissertation). Utah State University. Retrieved from https://digitalcommons.usu.edu/etd/7139

Chicago Manual of Style (16th Edition):

Jurás, Martin. “Geometric Aspects of Second-Order Scalar Hyperbolic Partial Differential Equations in the Plane.” 1997. Doctoral Dissertation, Utah State University. Accessed August 18, 2019. https://digitalcommons.usu.edu/etd/7139.

MLA Handbook (7th Edition):

Jurás, Martin. “Geometric Aspects of Second-Order Scalar Hyperbolic Partial Differential Equations in the Plane.” 1997. Web. 18 Aug 2019.

Vancouver:

Jurás M. Geometric Aspects of Second-Order Scalar Hyperbolic Partial Differential Equations in the Plane. [Internet] [Doctoral dissertation]. Utah State University; 1997. [cited 2019 Aug 18]. Available from: https://digitalcommons.usu.edu/etd/7139.

Council of Science Editors:

Jurás M. Geometric Aspects of Second-Order Scalar Hyperbolic Partial Differential Equations in the Plane. [Doctoral Dissertation]. Utah State University; 1997. Available from: https://digitalcommons.usu.edu/etd/7139

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