subject:(nonlinear equations)

North-West University

1. Matebese, Belinda Thembisa. Lie group analysis of certain nonlinear differential equations arising in fluid mechanics / Belinda Thembisa Matebese .

Degree: 2010, North-West University

URL: http://hdl.handle.net/10394/15796

► This research studies two nonlinear differential equations arising in fluid mechanics. Firstly, the Zakharov-Kuznetsov's equation in (3+1) dimensions with an arbitrary power law nonlinearity is… (more)

Subjects/Keywords: Differential equations; Nonlinear

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APA (6^th Edition):

Matebese, B. T. (2010). Lie group analysis of certain nonlinear differential equations arising in fluid mechanics / Belinda Thembisa Matebese . (Thesis). North-West University. Retrieved from http://hdl.handle.net/10394/15796

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

Chicago Manual of Style (16^th Edition):

Matebese, Belinda Thembisa. “Lie group analysis of certain nonlinear differential equations arising in fluid mechanics / Belinda Thembisa Matebese .” 2010. Thesis, North-West University. Accessed March 03, 2021. http://hdl.handle.net/10394/15796.

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

MLA Handbook (7^th Edition):

Matebese, Belinda Thembisa. “Lie group analysis of certain nonlinear differential equations arising in fluid mechanics / Belinda Thembisa Matebese .” 2010. Web. 03 Mar 2021.

Vancouver:

Matebese BT. Lie group analysis of certain nonlinear differential equations arising in fluid mechanics / Belinda Thembisa Matebese . [Internet] [Thesis]. North-West University; 2010. [cited 2021 Mar 03]. Available from: http://hdl.handle.net/10394/15796.

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

Council of Science Editors:

Matebese BT. Lie group analysis of certain nonlinear differential equations arising in fluid mechanics / Belinda Thembisa Matebese . [Thesis]. North-West University; 2010. Available from: http://hdl.handle.net/10394/15796

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

University of Johannesburg

2. Euler, Norbert. Continuous symmetries, lie algebras and differential equations.

Degree: 2014, University of Johannesburg

URL: http://hdl.handle.net/10210/9131

►

D.Sc. (Mathematics)

In this thesis aspects of continuous symmetries of differential equations are studied. In particular the following aspects are studied in detail: Lie algebras,… (more)

Subjects/Keywords: Differential equations, Nonlinear; Lie algebras

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APA (6^th Edition):

Euler, N. (2014). Continuous symmetries, lie algebras and differential equations. (Thesis). University of Johannesburg. Retrieved from http://hdl.handle.net/10210/9131

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

Chicago Manual of Style (16^th Edition):

Euler, Norbert. “Continuous symmetries, lie algebras and differential equations.” 2014. Thesis, University of Johannesburg. Accessed March 03, 2021. http://hdl.handle.net/10210/9131.

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

MLA Handbook (7^th Edition):

Euler, Norbert. “Continuous symmetries, lie algebras and differential equations.” 2014. Web. 03 Mar 2021.

Vancouver:

Euler N. Continuous symmetries, lie algebras and differential equations. [Internet] [Thesis]. University of Johannesburg; 2014. [cited 2021 Mar 03]. Available from: http://hdl.handle.net/10210/9131.

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

Council of Science Editors:

Euler N. Continuous symmetries, lie algebras and differential equations. [Thesis]. University of Johannesburg; 2014. Available from: http://hdl.handle.net/10210/9131

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

University of Zambia

3. Kalenge, Mathias Chifuba. Periodic solutions of nonlinear ordinary differential equations .

Degree: 2012, University of Zambia

URL: http://hdl.handle.net/123456789/1692

► Many physical problems are studied through mathematical equations especially differential equations. For example, problems in mechanics, electricity, aerodynamics, to mention just a few, use differential… (more)

Subjects/Keywords: Differential equations; Differential algebra.; Equations.; Differential equations, Nonlinear.

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APA (6^th Edition):

Kalenge, M. C. (2012). Periodic solutions of nonlinear ordinary differential equations . (Thesis). University of Zambia. Retrieved from http://hdl.handle.net/123456789/1692

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

Chicago Manual of Style (16^th Edition):

Kalenge, Mathias Chifuba. “Periodic solutions of nonlinear ordinary differential equations .” 2012. Thesis, University of Zambia. Accessed March 03, 2021. http://hdl.handle.net/123456789/1692.

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

MLA Handbook (7^th Edition):

Kalenge, Mathias Chifuba. “Periodic solutions of nonlinear ordinary differential equations .” 2012. Web. 03 Mar 2021.

Vancouver:

Kalenge MC. Periodic solutions of nonlinear ordinary differential equations . [Internet] [Thesis]. University of Zambia; 2012. [cited 2021 Mar 03]. Available from: http://hdl.handle.net/123456789/1692.

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

Council of Science Editors:

Kalenge MC. Periodic solutions of nonlinear ordinary differential equations . [Thesis]. University of Zambia; 2012. Available from: http://hdl.handle.net/123456789/1692

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

4. Hollifield, Elliott Z. Nonnegative solutions of nonlinear fractional Laplacian equations.

Degree: 2020, NC Docks

URL: http://libres.uncg.edu/ir/uncg/f/Hollifield_uncg_0154D_13115.pdf

► The study of reaction-diffusion equations involving nonlocal diffusion operators has recently flourished. The fractional Laplacian is an example of a nonlocal diffusion operator which allows… (more)

Subjects/Keywords: Laplacian operator; Fractional differential equations; Differential equations, Nonlinear; Reaction-diffusion equations

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APA (6^th Edition):

Hollifield, E. Z. (2020). Nonnegative solutions of nonlinear fractional Laplacian equations. (Thesis). NC Docks. Retrieved from http://libres.uncg.edu/ir/uncg/f/Hollifield_uncg_0154D_13115.pdf

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

Chicago Manual of Style (16^th Edition):

Hollifield, Elliott Z. “Nonnegative solutions of nonlinear fractional Laplacian equations.” 2020. Thesis, NC Docks. Accessed March 03, 2021. http://libres.uncg.edu/ir/uncg/f/Hollifield_uncg_0154D_13115.pdf.

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

MLA Handbook (7^th Edition):

Hollifield, Elliott Z. “Nonnegative solutions of nonlinear fractional Laplacian equations.” 2020. Web. 03 Mar 2021.

Vancouver:

Hollifield EZ. Nonnegative solutions of nonlinear fractional Laplacian equations. [Internet] [Thesis]. NC Docks; 2020. [cited 2021 Mar 03]. Available from: http://libres.uncg.edu/ir/uncg/f/Hollifield_uncg_0154D_13115.pdf.

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

Council of Science Editors:

Hollifield EZ. Nonnegative solutions of nonlinear fractional Laplacian equations. [Thesis]. NC Docks; 2020. Available from: http://libres.uncg.edu/ir/uncg/f/Hollifield_uncg_0154D_13115.pdf

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

University of Utah

5. Nguyen, Loc Hoang. Existence of solutions to nonlinear elliptic equations.

Degree: PhD, Mathematics, 2011, University of Utah

URL: http://content.lib.utah.edu/cdm/singleitem/collection/etd3/id/156/rec/958

► This dissertation is concerned with the existence of solutions to fully nonlinear elliptic equations of the form Au = Fu, where A is a differential… (more)

Subjects/Keywords: Boundary value problems; Solutions; Nonlinear elliptic equations

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APA (6^th Edition):

Nguyen, L. H. (2011). Existence of solutions to nonlinear elliptic equations. (Doctoral Dissertation). University of Utah. Retrieved from http://content.lib.utah.edu/cdm/singleitem/collection/etd3/id/156/rec/958

Chicago Manual of Style (16^th Edition):

Nguyen, Loc Hoang. “Existence of solutions to nonlinear elliptic equations.” 2011. Doctoral Dissertation, University of Utah. Accessed March 03, 2021. http://content.lib.utah.edu/cdm/singleitem/collection/etd3/id/156/rec/958.

MLA Handbook (7^th Edition):

Nguyen, Loc Hoang. “Existence of solutions to nonlinear elliptic equations.” 2011. Web. 03 Mar 2021.

Vancouver:

Nguyen LH. Existence of solutions to nonlinear elliptic equations. [Internet] [Doctoral dissertation]. University of Utah; 2011. [cited 2021 Mar 03]. Available from: http://content.lib.utah.edu/cdm/singleitem/collection/etd3/id/156/rec/958.

Council of Science Editors:

Nguyen LH. Existence of solutions to nonlinear elliptic equations. [Doctoral Dissertation]. University of Utah; 2011. Available from: http://content.lib.utah.edu/cdm/singleitem/collection/etd3/id/156/rec/958

6. Massoud, Mohammad. Statistical verification techniques for stochastic dynamic systems .

Degree: 2015, State University of New York at New Paltz

URL: http://hdl.handle.net/1951/66389

► Electronic chip design, aircraft stability, finance, economy and even our social life can be affected by random events. Noise is a random process that occurs… (more)

Subjects/Keywords: Stochastic differential equations; Dynamics; Noise; Nonlinear systems

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APA (6^th Edition):

Massoud, M. (2015). Statistical verification techniques for stochastic dynamic systems . (Thesis). State University of New York at New Paltz. Retrieved from http://hdl.handle.net/1951/66389

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

Chicago Manual of Style (16^th Edition):

Massoud, Mohammad. “Statistical verification techniques for stochastic dynamic systems .” 2015. Thesis, State University of New York at New Paltz. Accessed March 03, 2021. http://hdl.handle.net/1951/66389.

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

MLA Handbook (7^th Edition):

Massoud, Mohammad. “Statistical verification techniques for stochastic dynamic systems .” 2015. Web. 03 Mar 2021.

Vancouver:

Massoud M. Statistical verification techniques for stochastic dynamic systems . [Internet] [Thesis]. State University of New York at New Paltz; 2015. [cited 2021 Mar 03]. Available from: http://hdl.handle.net/1951/66389.

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

Council of Science Editors:

Massoud M. Statistical verification techniques for stochastic dynamic systems . [Thesis]. State University of New York at New Paltz; 2015. Available from: http://hdl.handle.net/1951/66389

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

University of Saskatchewan

7. Wang, Jackie. A New Iterative Method for Solving Nonlinear Equation.

Degree: 2018, University of Saskatchewan

URL: http://hdl.handle.net/10388/11960

► Nonlinear equations are known to be difficult to solve, and numerical methods are used to solve systems of nonlinear equations. The objective of this research… (more)

Subjects/Keywords: Iterative Method; Nonlinear Equations; Inverse Kinematics

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APA (6^th Edition):

Wang, J. (2018). A New Iterative Method for Solving Nonlinear Equation. (Thesis). University of Saskatchewan. Retrieved from http://hdl.handle.net/10388/11960

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

Chicago Manual of Style (16^th Edition):

Wang, Jackie. “A New Iterative Method for Solving Nonlinear Equation.” 2018. Thesis, University of Saskatchewan. Accessed March 03, 2021. http://hdl.handle.net/10388/11960.

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

MLA Handbook (7^th Edition):

Wang, Jackie. “A New Iterative Method for Solving Nonlinear Equation.” 2018. Web. 03 Mar 2021.

Vancouver:

Wang J. A New Iterative Method for Solving Nonlinear Equation. [Internet] [Thesis]. University of Saskatchewan; 2018. [cited 2021 Mar 03]. Available from: http://hdl.handle.net/10388/11960.

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

Council of Science Editors:

Wang J. A New Iterative Method for Solving Nonlinear Equation. [Thesis]. University of Saskatchewan; 2018. Available from: http://hdl.handle.net/10388/11960

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

University of Johannesburg

8. Kohler, Astri. Conditional and approximate symmetries for nonlinear partial differential equations.

Degree: 2014, University of Johannesburg

URL: http://hdl.handle.net/10210/11449

►

M.Sc.

In this work we concentrate on two generalizations of Lie symmetries namely conditional symmetries in the form of Q-symmetries and approximate symmetries. The theorems… (more)

Subjects/Keywords: Lie algebras; Symmetry; Differential equations, Nonlinear

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APA (6^th Edition):

Kohler, A. (2014). Conditional and approximate symmetries for nonlinear partial differential equations. (Thesis). University of Johannesburg. Retrieved from http://hdl.handle.net/10210/11449

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

Chicago Manual of Style (16^th Edition):

Kohler, Astri. “Conditional and approximate symmetries for nonlinear partial differential equations.” 2014. Thesis, University of Johannesburg. Accessed March 03, 2021. http://hdl.handle.net/10210/11449.

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

MLA Handbook (7^th Edition):

Kohler, Astri. “Conditional and approximate symmetries for nonlinear partial differential equations.” 2014. Web. 03 Mar 2021.

Vancouver:

Kohler A. Conditional and approximate symmetries for nonlinear partial differential equations. [Internet] [Thesis]. University of Johannesburg; 2014. [cited 2021 Mar 03]. Available from: http://hdl.handle.net/10210/11449.

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

Council of Science Editors:

Kohler A. Conditional and approximate symmetries for nonlinear partial differential equations. [Thesis]. University of Johannesburg; 2014. Available from: http://hdl.handle.net/10210/11449

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

University of Johannesburg

9. Dlamini, Phumlani Goodwill. Numerical simulation of finite-time blow-up in nonlinear ODEs, reaction-diffusion equations and VIDEs.

Degree: 2012, University of Johannesburg

URL: http://hdl.handle.net/10210/8054

►

M.Sc.

There have been an extensive study on solutions of differential equations modeling physical phenomena that blows up in finite time. The blow-up time often… (more)

Subjects/Keywords: Midpoint-implicit Euler method; Differential equations, nonlinear

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APA (6^th Edition):

Dlamini, P. G. (2012). Numerical simulation of finite-time blow-up in nonlinear ODEs, reaction-diffusion equations and VIDEs. (Thesis). University of Johannesburg. Retrieved from http://hdl.handle.net/10210/8054

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

Chicago Manual of Style (16^th Edition):

Dlamini, Phumlani Goodwill. “Numerical simulation of finite-time blow-up in nonlinear ODEs, reaction-diffusion equations and VIDEs.” 2012. Thesis, University of Johannesburg. Accessed March 03, 2021. http://hdl.handle.net/10210/8054.

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

MLA Handbook (7^th Edition):

Dlamini, Phumlani Goodwill. “Numerical simulation of finite-time blow-up in nonlinear ODEs, reaction-diffusion equations and VIDEs.” 2012. Web. 03 Mar 2021.

Vancouver:

Dlamini PG. Numerical simulation of finite-time blow-up in nonlinear ODEs, reaction-diffusion equations and VIDEs. [Internet] [Thesis]. University of Johannesburg; 2012. [cited 2021 Mar 03]. Available from: http://hdl.handle.net/10210/8054.

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

Council of Science Editors:

Dlamini PG. Numerical simulation of finite-time blow-up in nonlinear ODEs, reaction-diffusion equations and VIDEs. [Thesis]. University of Johannesburg; 2012. Available from: http://hdl.handle.net/10210/8054

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

Oregon State University

10. Cullop, Paul Wayne. Automated rigorous solutions to nonlinear equations.

Degree: MS, Mathematics, 1972, Oregon State University

URL: http://hdl.handle.net/1957/45244

► We will consider the implementation of a computer program to solve a nonlinear algebraic system of N equations and unknowns. The program involves the use… (more)

Subjects/Keywords: Differential equations; Nonlinear

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APA (6^th Edition):

Cullop, P. W. (1972). Automated rigorous solutions to nonlinear equations. (Masters Thesis). Oregon State University. Retrieved from http://hdl.handle.net/1957/45244

Chicago Manual of Style (16^th Edition):

Cullop, Paul Wayne. “Automated rigorous solutions to nonlinear equations.” 1972. Masters Thesis, Oregon State University. Accessed March 03, 2021. http://hdl.handle.net/1957/45244.

MLA Handbook (7^th Edition):

Cullop, Paul Wayne. “Automated rigorous solutions to nonlinear equations.” 1972. Web. 03 Mar 2021.

Vancouver:

Cullop PW. Automated rigorous solutions to nonlinear equations. [Internet] [Masters thesis]. Oregon State University; 1972. [cited 2021 Mar 03]. Available from: http://hdl.handle.net/1957/45244.

Council of Science Editors:

Cullop PW. Automated rigorous solutions to nonlinear equations. [Masters Thesis]. Oregon State University; 1972. Available from: http://hdl.handle.net/1957/45244

Oregon State University

11. Crow, John A. A nonlinear shallow water wave equation and its classical solutions of the cauchy problem.

Degree: PhD, Mathematics, 1991, Oregon State University

URL: http://hdl.handle.net/1957/16963

► A nonlinear wave equation is developed, modeling the evolution in time of shallow water waves over a variable topography. As the usual assumptions of a… (more)

Subjects/Keywords: Nonlinear wave equations

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APA (6^th Edition):

Crow, J. A. (1991). A nonlinear shallow water wave equation and its classical solutions of the cauchy problem. (Doctoral Dissertation). Oregon State University. Retrieved from http://hdl.handle.net/1957/16963

Chicago Manual of Style (16^th Edition):

Crow, John A. “A nonlinear shallow water wave equation and its classical solutions of the cauchy problem.” 1991. Doctoral Dissertation, Oregon State University. Accessed March 03, 2021. http://hdl.handle.net/1957/16963.

MLA Handbook (7^th Edition):

Crow, John A. “A nonlinear shallow water wave equation and its classical solutions of the cauchy problem.” 1991. Web. 03 Mar 2021.

Vancouver:

Crow JA. A nonlinear shallow water wave equation and its classical solutions of the cauchy problem. [Internet] [Doctoral dissertation]. Oregon State University; 1991. [cited 2021 Mar 03]. Available from: http://hdl.handle.net/1957/16963.

Council of Science Editors:

Crow JA. A nonlinear shallow water wave equation and its classical solutions of the cauchy problem. [Doctoral Dissertation]. Oregon State University; 1991. Available from: http://hdl.handle.net/1957/16963

12. 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

URL: http://www.escholarship.org/uc/item/35d0c08f

► 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 (6^th 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 (16^th 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 March 03, 2021. 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 (7^th Edition):

Jonov, Boyan Yavorov. “Longtime behavior of small solutions to viscous perturbations of nonlinear hyperbolic systems in 3D.” 2014. Web. 03 Mar 2021.

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 2021 Mar 03]. 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

Delft University of Technology

13. Ganapathy, Chandru (author). Multiscale Reconstruction of Compositional Transport.

Degree: 2017, Delft University of Technology

URL: http://resolver.tudelft.nl/uuid:24de2b60-9c17-4f28-a086-91ee9178ebe7

► Designing strategies for efficient oil production from reservoirs rely heavily on reservoir simulation studies, which in-turn is based on various nonlinear formulations. It is therefore… (more)

▼ Designing strategies for efficient oil production from reservoirs rely heavily on reservoir simulation studies, which in-turn is based on various nonlinear formulations. It is therefore very important to develop a robust simulation model that captures the flow of various components present in different phases and the associated thermodynamic and chemical interactions. A compositional formulation is a reliable option for understanding these complex subsurface processes. However, this type of model has a great computational cost, since the number of equations (nc) that needs to be solved in each grid block increases proportionally with the number of components employed. The solution of the multicomponent multiphase flow problem is obtained by solving the associated nonlinear governing equation describing the conservation of mass, thereby determining the pressure (P) and compositional changes (Z) of the system. On the other hand, an Equation of state (EoS) model is employed to describe the phase behavior of the system, which in turn is accomplished in two stages: Phase stability test - to identify the existence of number of phase in a particular grid cell, and Flash calculation - to determine the split fraction of components amongst the phases present. The aforesaid procedure is referred as the standard EoS based approach to solve compositional problem and they are generally arduous. In previous works, a compositional-space parameterization approach was proposed to speed up the phase-behavior calculations by replacing the flash calculation with interpolations in the parameter space of the problem. The phase behavior of gas-injection processes is predominantly controlled by the properties of the two key tie-lines that extend through the initial and the injection compositions, and hence it is convenient to parameterize the problem based on these two tie-lines. It has also been proven that the projection of composition solution onto the full tie-line space is invariant to the hydrodynamic property of the compositional system. Here we utilize this technique to develop a multiscale reconstruction of compositional transport. Two types of prolongation operators are defined based on the local saturation history, with each having different computational complexities. In the first stage, a fine scale prolongation operator is implemented on a modified conservation equation with the objective of reconstructing the leading and trailing shock positions in space. Once the position of shocks are identified, the solution lying in the regions outside the shock can be solved on a coarse-scale mesh, since the structure of the transport solution outside of the two-phase region is relatively simple. Later, the fine scale projection of this coarse solution is carried out using the constant prolongation operator. The solution for nc components lying in between leading and trailing shocks is reconstructed by solving just two equations. The proposed reconstruction strategy results in coarsening of the compositional problem, both in… Advisors/Committee Members: Voskov, Denis (mentor), Delft University of Technology (degree granting institution).

Subjects/Keywords: reservoir simulation; composition; Nonlinear Equations; Numerical Mathematics

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APA (6^th Edition):

Ganapathy, C. (. (2017). Multiscale Reconstruction of Compositional Transport. (Masters Thesis). Delft University of Technology. Retrieved from http://resolver.tudelft.nl/uuid:24de2b60-9c17-4f28-a086-91ee9178ebe7

Chicago Manual of Style (16^th Edition):

Ganapathy, Chandru (author). “Multiscale Reconstruction of Compositional Transport.” 2017. Masters Thesis, Delft University of Technology. Accessed March 03, 2021. http://resolver.tudelft.nl/uuid:24de2b60-9c17-4f28-a086-91ee9178ebe7.

MLA Handbook (7^th Edition):

Ganapathy, Chandru (author). “Multiscale Reconstruction of Compositional Transport.” 2017. Web. 03 Mar 2021.

Vancouver:

Ganapathy C(. Multiscale Reconstruction of Compositional Transport. [Internet] [Masters thesis]. Delft University of Technology; 2017. [cited 2021 Mar 03]. Available from: http://resolver.tudelft.nl/uuid:24de2b60-9c17-4f28-a086-91ee9178ebe7.

Council of Science Editors:

Ganapathy C(. Multiscale Reconstruction of Compositional Transport. [Masters Thesis]. Delft University of Technology; 2017. Available from: http://resolver.tudelft.nl/uuid:24de2b60-9c17-4f28-a086-91ee9178ebe7

Michigan State University

14. Jiao, Hengli. Global existence and blow-up of solutions for nonlinear wave equations.

Degree: PhD, Department of Mathematics, 1996, Michigan State University

URL: http://etd.lib.msu.edu/islandora/object/etd:24539

Subjects/Keywords: Nonlinear wave equations

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APA (6^th Edition):

Jiao, H. (1996). Global existence and blow-up of solutions for nonlinear wave equations. (Doctoral Dissertation). Michigan State University. Retrieved from http://etd.lib.msu.edu/islandora/object/etd:24539

Chicago Manual of Style (16^th Edition):

Jiao, Hengli. “Global existence and blow-up of solutions for nonlinear wave equations.” 1996. Doctoral Dissertation, Michigan State University. Accessed March 03, 2021. http://etd.lib.msu.edu/islandora/object/etd:24539.

MLA Handbook (7^th Edition):

Jiao, Hengli. “Global existence and blow-up of solutions for nonlinear wave equations.” 1996. Web. 03 Mar 2021.

Vancouver:

Jiao H. Global existence and blow-up of solutions for nonlinear wave equations. [Internet] [Doctoral dissertation]. Michigan State University; 1996. [cited 2021 Mar 03]. Available from: http://etd.lib.msu.edu/islandora/object/etd:24539.

Council of Science Editors:

Jiao H. Global existence and blow-up of solutions for nonlinear wave equations. [Doctoral Dissertation]. Michigan State University; 1996. Available from: http://etd.lib.msu.edu/islandora/object/etd:24539

Michigan State University

15. Wang, Haiyan. Existence and multiplicity of positive solutions of nonlinear integral and differential equations.

Degree: PhD, Department of Mathematics, 1997, Michigan State University

URL: http://etd.lib.msu.edu/islandora/object/etd:26264

Subjects/Keywords: Nonlinear integral equations

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APA (6^th Edition):

Wang, H. (1997). Existence and multiplicity of positive solutions of nonlinear integral and differential equations. (Doctoral Dissertation). Michigan State University. Retrieved from http://etd.lib.msu.edu/islandora/object/etd:26264

Chicago Manual of Style (16^th Edition):

Wang, Haiyan. “Existence and multiplicity of positive solutions of nonlinear integral and differential equations.” 1997. Doctoral Dissertation, Michigan State University. Accessed March 03, 2021. http://etd.lib.msu.edu/islandora/object/etd:26264.

MLA Handbook (7^th Edition):

Wang, Haiyan. “Existence and multiplicity of positive solutions of nonlinear integral and differential equations.” 1997. Web. 03 Mar 2021.

Vancouver:

Wang H. Existence and multiplicity of positive solutions of nonlinear integral and differential equations. [Internet] [Doctoral dissertation]. Michigan State University; 1997. [cited 2021 Mar 03]. Available from: http://etd.lib.msu.edu/islandora/object/etd:26264.

Council of Science Editors:

Wang H. Existence and multiplicity of positive solutions of nonlinear integral and differential equations. [Doctoral Dissertation]. Michigan State University; 1997. Available from: http://etd.lib.msu.edu/islandora/object/etd:26264

University of Arizona

16. Bryan, Charles Allen, 1936-. AN ITERATIVE METHOD FOR SOLVING NONLINEAR SYSTEMS OF EQUATIONS .

Degree: 1963, University of Arizona

URL: http://hdl.handle.net/10150/284455

Subjects/Keywords: Differential equations; Nonlinear.

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APA (6^th Edition):

Bryan, Charles Allen, 1. (1963). AN ITERATIVE METHOD FOR SOLVING NONLINEAR SYSTEMS OF EQUATIONS . (Doctoral Dissertation). University of Arizona. Retrieved from http://hdl.handle.net/10150/284455

Chicago Manual of Style (16^th Edition):

Bryan, Charles Allen, 1936-. “AN ITERATIVE METHOD FOR SOLVING NONLINEAR SYSTEMS OF EQUATIONS .” 1963. Doctoral Dissertation, University of Arizona. Accessed March 03, 2021. http://hdl.handle.net/10150/284455.

MLA Handbook (7^th Edition):

Bryan, Charles Allen, 1936-. “AN ITERATIVE METHOD FOR SOLVING NONLINEAR SYSTEMS OF EQUATIONS .” 1963. Web. 03 Mar 2021.

Vancouver:

Bryan, Charles Allen 1. AN ITERATIVE METHOD FOR SOLVING NONLINEAR SYSTEMS OF EQUATIONS . [Internet] [Doctoral dissertation]. University of Arizona; 1963. [cited 2021 Mar 03]. Available from: http://hdl.handle.net/10150/284455.

Council of Science Editors:

Bryan, Charles Allen 1. AN ITERATIVE METHOD FOR SOLVING NONLINEAR SYSTEMS OF EQUATIONS . [Doctoral Dissertation]. University of Arizona; 1963. Available from: http://hdl.handle.net/10150/284455

University of Arizona

17. Sachdev, Sushil Kumar. POSITIVE SOLUTIONS OF NONLINEAR DIFFERENTIAL EQUATIONS ON THE HALF LINE .

Degree: 1978, University of Arizona

URL: http://hdl.handle.net/10150/298869

Subjects/Keywords: Differential equations; Nonlinear.

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APA (6^th Edition):

Sachdev, S. K. (1978). POSITIVE SOLUTIONS OF NONLINEAR DIFFERENTIAL EQUATIONS ON THE HALF LINE . (Doctoral Dissertation). University of Arizona. Retrieved from http://hdl.handle.net/10150/298869

Chicago Manual of Style (16^th Edition):

Sachdev, Sushil Kumar. “POSITIVE SOLUTIONS OF NONLINEAR DIFFERENTIAL EQUATIONS ON THE HALF LINE .” 1978. Doctoral Dissertation, University of Arizona. Accessed March 03, 2021. http://hdl.handle.net/10150/298869.

MLA Handbook (7^th Edition):

Sachdev, Sushil Kumar. “POSITIVE SOLUTIONS OF NONLINEAR DIFFERENTIAL EQUATIONS ON THE HALF LINE .” 1978. Web. 03 Mar 2021.

Vancouver:

Sachdev SK. POSITIVE SOLUTIONS OF NONLINEAR DIFFERENTIAL EQUATIONS ON THE HALF LINE . [Internet] [Doctoral dissertation]. University of Arizona; 1978. [cited 2021 Mar 03]. Available from: http://hdl.handle.net/10150/298869.

Council of Science Editors:

Sachdev SK. POSITIVE SOLUTIONS OF NONLINEAR DIFFERENTIAL EQUATIONS ON THE HALF LINE . [Doctoral Dissertation]. University of Arizona; 1978. Available from: http://hdl.handle.net/10150/298869

Georgia Tech

18. Grimm, Louis John. Stability of a system of nonlinear delay differential equations.

Degree: MS, Applied Mathematics, 1960, Georgia Tech

URL: http://hdl.handle.net/1853/28608

Subjects/Keywords: Differential equations; Nonlinear

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APA (6^th Edition):

Grimm, L. J. (1960). Stability of a system of nonlinear delay differential equations. (Masters Thesis). Georgia Tech. Retrieved from http://hdl.handle.net/1853/28608

Chicago Manual of Style (16^th Edition):

Grimm, Louis John. “Stability of a system of nonlinear delay differential equations.” 1960. Masters Thesis, Georgia Tech. Accessed March 03, 2021. http://hdl.handle.net/1853/28608.

MLA Handbook (7^th Edition):

Grimm, Louis John. “Stability of a system of nonlinear delay differential equations.” 1960. Web. 03 Mar 2021.

Vancouver:

Grimm LJ. Stability of a system of nonlinear delay differential equations. [Internet] [Masters thesis]. Georgia Tech; 1960. [cited 2021 Mar 03]. Available from: http://hdl.handle.net/1853/28608.

Council of Science Editors:

Grimm LJ. Stability of a system of nonlinear delay differential equations. [Masters Thesis]. Georgia Tech; 1960. Available from: http://hdl.handle.net/1853/28608

Georgia Tech

19. Kwek, Keng-Huat. On Cahn-Hilliard type equation.

Degree: PhD, Mathematics, 1991, Georgia Tech

URL: http://hdl.handle.net/1853/28819

Subjects/Keywords: Nonlinear equations; Dynamics

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APA (6^th Edition):

Kwek, K. (1991). On Cahn-Hilliard type equation. (Doctoral Dissertation). Georgia Tech. Retrieved from http://hdl.handle.net/1853/28819

Chicago Manual of Style (16^th Edition):

Kwek, Keng-Huat. “On Cahn-Hilliard type equation.” 1991. Doctoral Dissertation, Georgia Tech. Accessed March 03, 2021. http://hdl.handle.net/1853/28819.

MLA Handbook (7^th Edition):

Kwek, Keng-Huat. “On Cahn-Hilliard type equation.” 1991. Web. 03 Mar 2021.

Vancouver:

Kwek K. On Cahn-Hilliard type equation. [Internet] [Doctoral dissertation]. Georgia Tech; 1991. [cited 2021 Mar 03]. Available from: http://hdl.handle.net/1853/28819.

Council of Science Editors:

Kwek K. On Cahn-Hilliard type equation. [Doctoral Dissertation]. Georgia Tech; 1991. Available from: http://hdl.handle.net/1853/28819

University of British Columbia

20. Kumei, Sukeyuki. A group analysis of nonlinear differential equations.

Degree: PhD, Mathematics, 1981, University of British Columbia

URL: http://hdl.handle.net/2429/23079

► A necessary and sufficient condition is established for the existence of an invertible mapping of a system of nonlinear differential equations to a system of… (more)

Subjects/Keywords: Differential equations; Nonlinear

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APA (6^th Edition):

Kumei, S. (1981). A group analysis of nonlinear differential equations. (Doctoral Dissertation). University of British Columbia. Retrieved from http://hdl.handle.net/2429/23079

Chicago Manual of Style (16^th Edition):

Kumei, Sukeyuki. “A group analysis of nonlinear differential equations.” 1981. Doctoral Dissertation, University of British Columbia. Accessed March 03, 2021. http://hdl.handle.net/2429/23079.

MLA Handbook (7^th Edition):

Kumei, Sukeyuki. “A group analysis of nonlinear differential equations.” 1981. Web. 03 Mar 2021.

Vancouver:

Kumei S. A group analysis of nonlinear differential equations. [Internet] [Doctoral dissertation]. University of British Columbia; 1981. [cited 2021 Mar 03]. Available from: http://hdl.handle.net/2429/23079.

Council of Science Editors:

Kumei S. A group analysis of nonlinear differential equations. [Doctoral Dissertation]. University of British Columbia; 1981. Available from: http://hdl.handle.net/2429/23079

University of British Columbia

21. Lalli, Bikkar Singh. Contribution to nonlinear differential equations.

Degree: PhD, Mathematics, 1966, University of British Columbia

URL: http://hdl.handle.net/2429/36856

► The subject matter of this thesis consists of a qualitative study of the stability and asymptotic stability of the zero solution of certain types of… (more)

▼ The subject matter of this thesis consists of a qualitative study of the stability and asymptotic stability of the zero solution of certain types of nonlinear differential equations, for arbitrary initial perturbations, and the construction of a periodic solution for a Hamiltonian system with n( ≥ 2) degrees of freedom. The material is divided into three chapters. The stability of the system (1) ẋ = xh₁(y) + ay, ẏ = f(x) + yh₂(x) with some restrictions on the functions h₁ (y), h₂(x) and f(x), is discussed in the first chapter. It turns out that some of the results proved by I.H. MUFTI ([l], [2], [3]), for the systems (2) ẋ = xh₁(y) + ay, ẏ = xh₂(x) + by and (3) ẋ = xh₁(y) + ay, ẏ = bx + yh₂(x) become particular cases of our results for system (1). Consequently an answer in the affirmative has been given to a problem proposed by I.H. MUFTI [1]. In the same chapter a generalization to the problem of M. A. AIZERMAN [l] for the case n = 2 is given in the form (4) ẋ = f₁(x) + f₂(y), ẏ = ax + f₃(y). This system has been discussed first by a qualitative method and second by constructing a LYAPUNOV function. In chapter II, stability of a quasilinear equation (5) [formula omitted] is discussed, by using LYAPUNOV's second method. It has been proved that if (i) [formula omitted] (ii) [formula omitted] for all values of x and y = ẋ (iii) [formula omitted] for all x,y (iv) [formula omitted] (where G,g and w are defined in Theorem 2.1) (v) [formula omitted] then the zero solution of (5) is asymptotically stable for arbitrary initial perturbations. In the same chapter certain equations of third order have also been discussed for "complete stability". These equations are special cases of (5) and are more general than those considered by SHIMANOV [l] and BARBASHIN [l]. AIZERMAN's [l] problem for the case n = 3 is generalized to two different forms, one of which is (6) [formula omitted] which is more general than the forms considered by V.A. PLISS [4] and N.N. KRASOVSKII [l]. Under a non-singular linear transformation equations(6) assume the form (7) [formula omitted] It has been proved that if in addition to the usual existence and uniqueness requirements, the conditions (i) [formula omitted] (ii) [formula omitted] (iii) [formula omitted] are fulfilled, then the zero solution of (7) is asymptotically stable in the large. In the third chapter a Hamiltonian system with n (≥ 2) degrees of freedom is considered in the normalized form (8)[formula omitted] where fĸ are power series in zk beginning with quadratic terms. A periodic solution for system (8) is constructed in the form (9) [formula omitted] where [formula omitted] is a homogeneous polynomial of degree [formula omitted] in terms of four time dependent variables a, B, y, õ. C. L. SIEGEL [l] constructs a periodic solution in terms of two variables [formula omitted] under the assumption that the corresponding linear system has a pair of purely imaginary eigenvalues. Here it is assumed that the linear system possesses two distinct pairs of purely imaginary…

Subjects/Keywords: Differential equations; Nonlinear

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APA (6^th Edition):

Lalli, B. S. (1966). Contribution to nonlinear differential equations. (Doctoral Dissertation). University of British Columbia. Retrieved from http://hdl.handle.net/2429/36856

Chicago Manual of Style (16^th Edition):

Lalli, Bikkar Singh. “Contribution to nonlinear differential equations.” 1966. Doctoral Dissertation, University of British Columbia. Accessed March 03, 2021. http://hdl.handle.net/2429/36856.

MLA Handbook (7^th Edition):

Lalli, Bikkar Singh. “Contribution to nonlinear differential equations.” 1966. Web. 03 Mar 2021.

Vancouver:

Lalli BS. Contribution to nonlinear differential equations. [Internet] [Doctoral dissertation]. University of British Columbia; 1966. [cited 2021 Mar 03]. Available from: http://hdl.handle.net/2429/36856.

Council of Science Editors:

Lalli BS. Contribution to nonlinear differential equations. [Doctoral Dissertation]. University of British Columbia; 1966. Available from: http://hdl.handle.net/2429/36856

University of British Columbia

22. Chan, Paul Tsang-Leung. Approximations to the free response of a damped non-linear system.

Degree: Master of Applied Science - MASc, Electrical and Computer Engineering, 1965, University of British Columbia

URL: http://hdl.handle.net/2429/37525

► In the study of many engineering systems involving nonlinear elements such as a saturating inductor in an electrical circuit or a hard spring in a… (more)

Subjects/Keywords: Differential equations; Nonlinear

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APA (6^th Edition):

Chan, P. T. (1965). Approximations to the free response of a damped non-linear system. (Masters Thesis). University of British Columbia. Retrieved from http://hdl.handle.net/2429/37525

Chicago Manual of Style (16^th Edition):

Chan, Paul Tsang-Leung. “Approximations to the free response of a damped non-linear system.” 1965. Masters Thesis, University of British Columbia. Accessed March 03, 2021. http://hdl.handle.net/2429/37525.

MLA Handbook (7^th Edition):

Chan, Paul Tsang-Leung. “Approximations to the free response of a damped non-linear system.” 1965. Web. 03 Mar 2021.

Vancouver:

Chan PT. Approximations to the free response of a damped non-linear system. [Internet] [Masters thesis]. University of British Columbia; 1965. [cited 2021 Mar 03]. Available from: http://hdl.handle.net/2429/37525.

Council of Science Editors:

Chan PT. Approximations to the free response of a damped non-linear system. [Masters Thesis]. University of British Columbia; 1965. Available from: http://hdl.handle.net/2429/37525

University of British Columbia

23. Barkham, Peter George Douglas. Transient analysis of nonlinear non-autonomous second order systems using Jacobian elliptic functions.

Degree: Master of Applied Science - MASc, Electrical and Computer Engineering, 1969, University of British Columbia

URL: http://hdl.handle.net/2429/35314

► A method is presented for determining approximate solutions to a class of grossly nonlinear, non-autonomous second order differential equations characterized by [formula omitted] with the… (more)

Subjects/Keywords: Differential equations; Nonlinear

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APA (6^th Edition):

Barkham, P. G. D. (1969). Transient analysis of nonlinear non-autonomous second order systems using Jacobian elliptic functions. (Masters Thesis). University of British Columbia. Retrieved from http://hdl.handle.net/2429/35314

Chicago Manual of Style (16^th Edition):

Barkham, Peter George Douglas. “Transient analysis of nonlinear non-autonomous second order systems using Jacobian elliptic functions.” 1969. Masters Thesis, University of British Columbia. Accessed March 03, 2021. http://hdl.handle.net/2429/35314.

MLA Handbook (7^th Edition):

Barkham, Peter George Douglas. “Transient analysis of nonlinear non-autonomous second order systems using Jacobian elliptic functions.” 1969. Web. 03 Mar 2021.

Vancouver:

Barkham PGD. Transient analysis of nonlinear non-autonomous second order systems using Jacobian elliptic functions. [Internet] [Masters thesis]. University of British Columbia; 1969. [cited 2021 Mar 03]. Available from: http://hdl.handle.net/2429/35314.

Council of Science Editors:

Barkham PGD. Transient analysis of nonlinear non-autonomous second order systems using Jacobian elliptic functions. [Masters Thesis]. University of British Columbia; 1969. Available from: http://hdl.handle.net/2429/35314

University of Sydney

24. Roffelsen, Pieter. On the global asymptotic analysis of a q-discrete Painlevé equation .

Degree: 2017, University of Sydney

URL: http://hdl.handle.net/2123/16601

► In this thesis we make effective the global asymptotic analysis of a nonlinear q-difference Painlevé equation, whose initial value space is a rational surface of… (more)

Subjects/Keywords: Painlevé; equations; integrable; nonlinear; difference; Lax

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APA (6^th Edition):

Roffelsen, P. (2017). On the global asymptotic analysis of a q-discrete Painlevé equation . (Thesis). University of Sydney. Retrieved from http://hdl.handle.net/2123/16601

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

Chicago Manual of Style (16^th Edition):

Roffelsen, Pieter. “On the global asymptotic analysis of a q-discrete Painlevé equation .” 2017. Thesis, University of Sydney. Accessed March 03, 2021. http://hdl.handle.net/2123/16601.

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

MLA Handbook (7^th Edition):

Roffelsen, Pieter. “On the global asymptotic analysis of a q-discrete Painlevé equation .” 2017. Web. 03 Mar 2021.

Vancouver:

Roffelsen P. On the global asymptotic analysis of a q-discrete Painlevé equation . [Internet] [Thesis]. University of Sydney; 2017. [cited 2021 Mar 03]. Available from: http://hdl.handle.net/2123/16601.

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

Council of Science Editors:

Roffelsen P. On the global asymptotic analysis of a q-discrete Painlevé equation . [Thesis]. University of Sydney; 2017. Available from: http://hdl.handle.net/2123/16601

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

Drexel University

25. Fornah-Delo, Mbalu. Extension to the Generalized Lagrange Formulation for Nonlinear Control.

Degree: 2015, Drexel University

URL: http://hdl.handle.net/1860/idea:6538

►

Derived separately, the classical generalized Lagrange equations, demonstrates a variant of the Poincare's equations. With the use of generalized Lagrange equations, circuit modeling is extended… (more)

Subjects/Keywords: Mechanical engineering; Nonlinear electric circuits; Lagrange equations

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APA (6^th Edition):

Fornah-Delo, M. (2015). Extension to the Generalized Lagrange Formulation for Nonlinear Control. (Thesis). Drexel University. Retrieved from http://hdl.handle.net/1860/idea:6538

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

Chicago Manual of Style (16^th Edition):

Fornah-Delo, Mbalu. “Extension to the Generalized Lagrange Formulation for Nonlinear Control.” 2015. Thesis, Drexel University. Accessed March 03, 2021. http://hdl.handle.net/1860/idea:6538.

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

MLA Handbook (7^th Edition):

Fornah-Delo, Mbalu. “Extension to the Generalized Lagrange Formulation for Nonlinear Control.” 2015. Web. 03 Mar 2021.

Vancouver:

Fornah-Delo M. Extension to the Generalized Lagrange Formulation for Nonlinear Control. [Internet] [Thesis]. Drexel University; 2015. [cited 2021 Mar 03]. Available from: http://hdl.handle.net/1860/idea:6538.

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

Council of Science Editors:

Fornah-Delo M. Extension to the Generalized Lagrange Formulation for Nonlinear Control. [Thesis]. Drexel University; 2015. Available from: http://hdl.handle.net/1860/idea:6538

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

University of California – San Diego

26. Pornnopparath, Donlapark. Well-posedness and modified scattering for derivative nonlinear Schrödinger equations.

Degree: Mathematics, 2018, University of California – San Diego

URL: http://www.escholarship.org/uc/item/2zd6j6fb

► We consider the initial value problem for various type of nonlinear Schrödinger equations with derivative nonlinearity which cannot be treated by normal perturbative arguments because… (more)

Subjects/Keywords: Mathematics; Harmonic Analysis; Nonlinear optics; Nonlinear Schrödinger equations; Partial differential equations; Scattering; Well-posedness

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APA (6^th Edition):

Pornnopparath, D. (2018). Well-posedness and modified scattering for derivative nonlinear Schrödinger equations. (Thesis). University of California – San Diego. Retrieved from http://www.escholarship.org/uc/item/2zd6j6fb

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

Chicago Manual of Style (16^th Edition):

Pornnopparath, Donlapark. “Well-posedness and modified scattering for derivative nonlinear Schrödinger equations.” 2018. Thesis, University of California – San Diego. Accessed March 03, 2021. http://www.escholarship.org/uc/item/2zd6j6fb.

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

MLA Handbook (7^th Edition):

Pornnopparath, Donlapark. “Well-posedness and modified scattering for derivative nonlinear Schrödinger equations.” 2018. Web. 03 Mar 2021.

Vancouver:

Pornnopparath D. Well-posedness and modified scattering for derivative nonlinear Schrödinger equations. [Internet] [Thesis]. University of California – San Diego; 2018. [cited 2021 Mar 03]. Available from: http://www.escholarship.org/uc/item/2zd6j6fb.

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

Council of Science Editors:

Pornnopparath D. Well-posedness and modified scattering for derivative nonlinear Schrödinger equations. [Thesis]. University of California – San Diego; 2018. Available from: http://www.escholarship.org/uc/item/2zd6j6fb

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

Louisiana State University

27. Grey, Jacob. Analysis of Nonlinear Dispersive Model Equations.

Degree: PhD, Applied Mathematics, 2015, Louisiana State University

URL: etd-07132015-161603 ; https://digitalcommons.lsu.edu/gradschool_dissertations/1587

► In this work we begin with a brief survey of the classical fluid dynamics problem of water waves, and then proceed to derive well known… (more)

Subjects/Keywords: nonlinear dispersive; PDE; nonlinear partial differential equations; evolution equations; BBM; BBM-KP; KdV; water wave

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APA (6^th Edition):

Grey, J. (2015). Analysis of Nonlinear Dispersive Model Equations. (Doctoral Dissertation). Louisiana State University. Retrieved from etd-07132015-161603 ; https://digitalcommons.lsu.edu/gradschool_dissertations/1587

Chicago Manual of Style (16^th Edition):

Grey, Jacob. “Analysis of Nonlinear Dispersive Model Equations.” 2015. Doctoral Dissertation, Louisiana State University. Accessed March 03, 2021. etd-07132015-161603 ; https://digitalcommons.lsu.edu/gradschool_dissertations/1587.

MLA Handbook (7^th Edition):

Grey, Jacob. “Analysis of Nonlinear Dispersive Model Equations.” 2015. Web. 03 Mar 2021.

Vancouver:

Grey J. Analysis of Nonlinear Dispersive Model Equations. [Internet] [Doctoral dissertation]. Louisiana State University; 2015. [cited 2021 Mar 03]. Available from: etd-07132015-161603 ; https://digitalcommons.lsu.edu/gradschool_dissertations/1587.

Council of Science Editors:

Grey J. Analysis of Nonlinear Dispersive Model Equations. [Doctoral Dissertation]. Louisiana State University; 2015. Available from: etd-07132015-161603 ; https://digitalcommons.lsu.edu/gradschool_dissertations/1587

University of Johannesburg

28. Euler, Norbert. Nonlinear field equations and Painleve test.

Degree: 2014, University of Johannesburg

URL: http://hdl.handle.net/10210/10855

M.Sc. (Theoretical Physics)

Please refer to full text to view abstract

Subjects/Keywords: Painlevé equations; Differential equations, Nonlinear

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APA (6^th Edition):

Euler, N. (2014). Nonlinear field equations and Painleve test. (Thesis). University of Johannesburg. Retrieved from http://hdl.handle.net/10210/10855

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

Chicago Manual of Style (16^th Edition):

Euler, Norbert. “Nonlinear field equations and Painleve test.” 2014. Thesis, University of Johannesburg. Accessed March 03, 2021. http://hdl.handle.net/10210/10855.

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

MLA Handbook (7^th Edition):

Euler, Norbert. “Nonlinear field equations and Painleve test.” 2014. Web. 03 Mar 2021.

Vancouver:

Euler N. Nonlinear field equations and Painleve test. [Internet] [Thesis]. University of Johannesburg; 2014. [cited 2021 Mar 03]. Available from: http://hdl.handle.net/10210/10855.

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

Council of Science Editors:

Euler N. Nonlinear field equations and Painleve test. [Thesis]. University of Johannesburg; 2014. Available from: http://hdl.handle.net/10210/10855

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

29. Hauer, Jessica. Population models.

Degree: MS, Mathematics, 2013, Eastern Washington University

URL: https://dc.ewu.edu/theses/237

► "This thesis will examine mathematical interpretations of biolog-ical situations through the study of differential equations. It will first explore the interactions of the lynx… (more)

Subjects/Keywords: Biomathematics; Lotka-Volterra equations; Differential equations; Nonlinear; Biomathematics

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APA (6^th Edition):

Hauer, J. (2013). Population models. (Thesis). Eastern Washington University. Retrieved from https://dc.ewu.edu/theses/237

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

Chicago Manual of Style (16^th Edition):

Hauer, Jessica. “Population models.” 2013. Thesis, Eastern Washington University. Accessed March 03, 2021. https://dc.ewu.edu/theses/237.

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

MLA Handbook (7^th Edition):

Hauer, Jessica. “Population models.” 2013. Web. 03 Mar 2021.

Vancouver:

Hauer J. Population models. [Internet] [Thesis]. Eastern Washington University; 2013. [cited 2021 Mar 03]. Available from: https://dc.ewu.edu/theses/237.

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

Council of Science Editors:

Hauer J. Population models. [Thesis]. Eastern Washington University; 2013. Available from: https://dc.ewu.edu/theses/237

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

University of Notre Dame

30. Tiancong Chen. Smooth Local Solutions to Fully Nonlinear Partial Differential Equations</h1>.

Degree: Mathematics, 2013, University of Notre Dame

URL: https://curate.nd.edu/show/6w924b3192f

► In this dissertation we discuss the local solvability of two classes of fully nonlinear partial differential equations. In the first chapter we discuss the… (more)

Subjects/Keywords: partial differential equations; smooth local solutions; fully nonlinear; Monge-Ampere equations

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

APA (6^th Edition):

Chen, T. (2013). Smooth Local Solutions to Fully Nonlinear Partial Differential Equations</h1>. (Thesis). University of Notre Dame. Retrieved from https://curate.nd.edu/show/6w924b3192f

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

Chicago Manual of Style (16^th Edition):

Chen, Tiancong. “Smooth Local Solutions to Fully Nonlinear Partial Differential Equations</h1>.” 2013. Thesis, University of Notre Dame. Accessed March 03, 2021. https://curate.nd.edu/show/6w924b3192f.

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

MLA Handbook (7^th Edition):

Chen, Tiancong. “Smooth Local Solutions to Fully Nonlinear Partial Differential Equations</h1>.” 2013. Web. 03 Mar 2021.

Vancouver:

Chen T. Smooth Local Solutions to Fully Nonlinear Partial Differential Equations</h1>. [Internet] [Thesis]. University of Notre Dame; 2013. [cited 2021 Mar 03]. Available from: https://curate.nd.edu/show/6w924b3192f.

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

Council of Science Editors:

Chen T. Smooth Local Solutions to Fully Nonlinear Partial Differential Equations</h1>. [Thesis]. University of Notre Dame; 2013. Available from: https://curate.nd.edu/show/6w924b3192f

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

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