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You searched for +publisher:"Brown University" +contributor:("Guzman, Johnny"). Showing records 1 – 12 of 12 total matches.

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1. Sanchez, Manuel A. Finite Element Methods for Interface Problems Using Unfitted Meshes: Design and Analysis.

Degree: PhD, Applied Mathematics, 2016, Brown University

 This dissertation aims to study finite element methods for two-dimensional stationary second order interface model problems on homogeneous and heterogeneous media, under discretizations non-fitted with… (more)

Subjects/Keywords: interface problems

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

APA (6th Edition):

Sanchez, M. A. (2016). Finite Element Methods for Interface Problems Using Unfitted Meshes: Design and Analysis. (Doctoral Dissertation). Brown University. Retrieved from https://repository.library.brown.edu/studio/item/bdr:674203/

Chicago Manual of Style (16th Edition):

Sanchez, Manuel A. “Finite Element Methods for Interface Problems Using Unfitted Meshes: Design and Analysis.” 2016. Doctoral Dissertation, Brown University. Accessed February 20, 2020. https://repository.library.brown.edu/studio/item/bdr:674203/.

MLA Handbook (7th Edition):

Sanchez, Manuel A. “Finite Element Methods for Interface Problems Using Unfitted Meshes: Design and Analysis.” 2016. Web. 20 Feb 2020.

Vancouver:

Sanchez MA. Finite Element Methods for Interface Problems Using Unfitted Meshes: Design and Analysis. [Internet] [Doctoral dissertation]. Brown University; 2016. [cited 2020 Feb 20]. Available from: https://repository.library.brown.edu/studio/item/bdr:674203/.

Council of Science Editors:

Sanchez MA. Finite Element Methods for Interface Problems Using Unfitted Meshes: Design and Analysis. [Doctoral Dissertation]. Brown University; 2016. Available from: https://repository.library.brown.edu/studio/item/bdr:674203/

2. Glusa, Christian Alexander. Multigrid and Domain Decomposition Methods in Fault-Prone Environments.

Degree: Department of Applied Mathematics, 2017, Brown University

 Many scientific simulations rely on the solution of very large linear systems of equations, and multigrid and domain decomposition methods are widely used solvers. It… (more)

Subjects/Keywords: Numerical Anlaysis

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APA (6th Edition):

Glusa, C. A. (2017). Multigrid and Domain Decomposition Methods in Fault-Prone Environments. (Thesis). Brown University. Retrieved from https://repository.library.brown.edu/studio/item/bdr:733340/

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):

Glusa, Christian Alexander. “Multigrid and Domain Decomposition Methods in Fault-Prone Environments.” 2017. Thesis, Brown University. Accessed February 20, 2020. https://repository.library.brown.edu/studio/item/bdr:733340/.

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

MLA Handbook (7th Edition):

Glusa, Christian Alexander. “Multigrid and Domain Decomposition Methods in Fault-Prone Environments.” 2017. Web. 20 Feb 2020.

Vancouver:

Glusa CA. Multigrid and Domain Decomposition Methods in Fault-Prone Environments. [Internet] [Thesis]. Brown University; 2017. [cited 2020 Feb 20]. Available from: https://repository.library.brown.edu/studio/item/bdr:733340/.

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

Council of Science Editors:

Glusa CA. Multigrid and Domain Decomposition Methods in Fault-Prone Environments. [Thesis]. Brown University; 2017. Available from: https://repository.library.brown.edu/studio/item/bdr:733340/

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

3. Zhu, Xueyu. Reduced basis methods and their applications.

Degree: PhD, Applied Mathematics, 2013, Brown University

 This thesis presents several model reduction techniques that achieve a comparable accuracy with much less computational cost compared to that of high fidelity numerical simulation.… (more)

Subjects/Keywords: reduced basis methods; model reduction

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APA (6th Edition):

Zhu, X. (2013). Reduced basis methods and their applications. (Doctoral Dissertation). Brown University. Retrieved from https://repository.library.brown.edu/studio/item/bdr:320599/

Chicago Manual of Style (16th Edition):

Zhu, Xueyu. “Reduced basis methods and their applications.” 2013. Doctoral Dissertation, Brown University. Accessed February 20, 2020. https://repository.library.brown.edu/studio/item/bdr:320599/.

MLA Handbook (7th Edition):

Zhu, Xueyu. “Reduced basis methods and their applications.” 2013. Web. 20 Feb 2020.

Vancouver:

Zhu X. Reduced basis methods and their applications. [Internet] [Doctoral dissertation]. Brown University; 2013. [cited 2020 Feb 20]. Available from: https://repository.library.brown.edu/studio/item/bdr:320599/.

Council of Science Editors:

Zhu X. Reduced basis methods and their applications. [Doctoral Dissertation]. Brown University; 2013. Available from: https://repository.library.brown.edu/studio/item/bdr:320599/

4. Narayan, Akil. A Generalization of the Wiener Rational Basis Functions on In?nite Intervals.

Degree: PhD, Applied Mathematics, 2009, Brown University

 This thesis concerns the formulation and derivation of a generalization of a collection of basis functions originally devised by Norbert Wiener for function approximation over… (more)

Subjects/Keywords: wiener functions

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APA (6th Edition):

Narayan, A. (2009). A Generalization of the Wiener Rational Basis Functions on In?nite Intervals. (Doctoral Dissertation). Brown University. Retrieved from https://repository.library.brown.edu/studio/item/bdr:99/

Chicago Manual of Style (16th Edition):

Narayan, Akil. “A Generalization of the Wiener Rational Basis Functions on In?nite Intervals.” 2009. Doctoral Dissertation, Brown University. Accessed February 20, 2020. https://repository.library.brown.edu/studio/item/bdr:99/.

MLA Handbook (7th Edition):

Narayan, Akil. “A Generalization of the Wiener Rational Basis Functions on In?nite Intervals.” 2009. Web. 20 Feb 2020.

Vancouver:

Narayan A. A Generalization of the Wiener Rational Basis Functions on In?nite Intervals. [Internet] [Doctoral dissertation]. Brown University; 2009. [cited 2020 Feb 20]. Available from: https://repository.library.brown.edu/studio/item/bdr:99/.

Council of Science Editors:

Narayan A. A Generalization of the Wiener Rational Basis Functions on In?nite Intervals. [Doctoral Dissertation]. Brown University; 2009. Available from: https://repository.library.brown.edu/studio/item/bdr:99/

5. Shi, Cengke. Numerical Methods for Hyperbolic Equations: Generalized Definition of Local Conservation and Discontinuous Galerkin Methods for Maxwell's equations in Drude Metamaterials.

Degree: Department of Applied Mathematics, 2018, Brown University

 This dissertation presents two topics on numerical solutions solving hyperbolic equations from both theoretical and practical points of view. In the first part, we introduce… (more)

Subjects/Keywords: Discontinuous Galerkin Methods

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APA (6th Edition):

Shi, C. (2018). Numerical Methods for Hyperbolic Equations: Generalized Definition of Local Conservation and Discontinuous Galerkin Methods for Maxwell's equations in Drude Metamaterials. (Thesis). Brown University. Retrieved from https://repository.library.brown.edu/studio/item/bdr:792729/

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):

Shi, Cengke. “Numerical Methods for Hyperbolic Equations: Generalized Definition of Local Conservation and Discontinuous Galerkin Methods for Maxwell's equations in Drude Metamaterials.” 2018. Thesis, Brown University. Accessed February 20, 2020. https://repository.library.brown.edu/studio/item/bdr:792729/.

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

MLA Handbook (7th Edition):

Shi, Cengke. “Numerical Methods for Hyperbolic Equations: Generalized Definition of Local Conservation and Discontinuous Galerkin Methods for Maxwell's equations in Drude Metamaterials.” 2018. Web. 20 Feb 2020.

Vancouver:

Shi C. Numerical Methods for Hyperbolic Equations: Generalized Definition of Local Conservation and Discontinuous Galerkin Methods for Maxwell's equations in Drude Metamaterials. [Internet] [Thesis]. Brown University; 2018. [cited 2020 Feb 20]. Available from: https://repository.library.brown.edu/studio/item/bdr:792729/.

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

Council of Science Editors:

Shi C. Numerical Methods for Hyperbolic Equations: Generalized Definition of Local Conservation and Discontinuous Galerkin Methods for Maxwell's equations in Drude Metamaterials. [Thesis]. Brown University; 2018. Available from: https://repository.library.brown.edu/studio/item/bdr:792729/

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

6. Chen, Zheng. Recovering exponential accuracy in spectral methods involving piecewise smooth functions with unbounded derivative singularities.

Degree: PhD, Applied Mathematics, 2014, Brown University

 This thesis presents the methodologies to recover exponential accuracy in spectral methods involving piecewise smooth functions with unbounded derivative singularities. The results imply that the… (more)

Subjects/Keywords: Spectral method; Exponential accuracy; Singularities; Collocation; Gaussian points; Fourier coefficients; Gegenbauer expansion; Transport equation; Singular initial conditions.

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APA (6th Edition):

Chen, Z. (2014). Recovering exponential accuracy in spectral methods involving piecewise smooth functions with unbounded derivative singularities. (Doctoral Dissertation). Brown University. Retrieved from https://repository.library.brown.edu/studio/item/bdr:386214/

Chicago Manual of Style (16th Edition):

Chen, Zheng. “Recovering exponential accuracy in spectral methods involving piecewise smooth functions with unbounded derivative singularities.” 2014. Doctoral Dissertation, Brown University. Accessed February 20, 2020. https://repository.library.brown.edu/studio/item/bdr:386214/.

MLA Handbook (7th Edition):

Chen, Zheng. “Recovering exponential accuracy in spectral methods involving piecewise smooth functions with unbounded derivative singularities.” 2014. Web. 20 Feb 2020.

Vancouver:

Chen Z. Recovering exponential accuracy in spectral methods involving piecewise smooth functions with unbounded derivative singularities. [Internet] [Doctoral dissertation]. Brown University; 2014. [cited 2020 Feb 20]. Available from: https://repository.library.brown.edu/studio/item/bdr:386214/.

Council of Science Editors:

Chen Z. Recovering exponential accuracy in spectral methods involving piecewise smooth functions with unbounded derivative singularities. [Doctoral Dissertation]. Brown University; 2014. Available from: https://repository.library.brown.edu/studio/item/bdr:386214/

7. Yang, Yang. High order numerical methods for hyperbolic equations: superconvergence, and applications to δ-singularities and cosmology.

Degree: PhD, Applied Mathematics, 2013, Brown University

 Part I introduces the discontinuous Galerkin (DG) method for solving hyperbolic equations. The introduction and the DG scheme will be given in the first two… (more)

Subjects/Keywords: Discontinuous Galerkin method

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APA (6th Edition):

Yang, Y. (2013). High order numerical methods for hyperbolic equations: superconvergence, and applications to δ-singularities and cosmology. (Doctoral Dissertation). Brown University. Retrieved from https://repository.library.brown.edu/studio/item/bdr:320577/

Chicago Manual of Style (16th Edition):

Yang, Yang. “High order numerical methods for hyperbolic equations: superconvergence, and applications to δ-singularities and cosmology.” 2013. Doctoral Dissertation, Brown University. Accessed February 20, 2020. https://repository.library.brown.edu/studio/item/bdr:320577/.

MLA Handbook (7th Edition):

Yang, Yang. “High order numerical methods for hyperbolic equations: superconvergence, and applications to δ-singularities and cosmology.” 2013. Web. 20 Feb 2020.

Vancouver:

Yang Y. High order numerical methods for hyperbolic equations: superconvergence, and applications to δ-singularities and cosmology. [Internet] [Doctoral dissertation]. Brown University; 2013. [cited 2020 Feb 20]. Available from: https://repository.library.brown.edu/studio/item/bdr:320577/.

Council of Science Editors:

Yang Y. High order numerical methods for hyperbolic equations: superconvergence, and applications to δ-singularities and cosmology. [Doctoral Dissertation]. Brown University; 2013. Available from: https://repository.library.brown.edu/studio/item/bdr:320577/

8. Zhong, Xinghui. Wave Resolution Properties and Weighted Essentially Non-Oscillatory Limiter for Discontinuous Galerkin Methods.

Degree: PhD, Applied Mathematics, 2012, Brown University

 This dissertation presents wave resolution properties and weighted essentially non-oscillatory limiter for discontinuous Galerkin methods solving hyperbolic conservation laws. In this dissertation, using Fourier analysis,… (more)

Subjects/Keywords: discontinuous Galerkin method

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APA (6th Edition):

Zhong, X. (2012). Wave Resolution Properties and Weighted Essentially Non-Oscillatory Limiter for Discontinuous Galerkin Methods. (Doctoral Dissertation). Brown University. Retrieved from https://repository.library.brown.edu/studio/item/bdr:297526/

Chicago Manual of Style (16th Edition):

Zhong, Xinghui. “Wave Resolution Properties and Weighted Essentially Non-Oscillatory Limiter for Discontinuous Galerkin Methods.” 2012. Doctoral Dissertation, Brown University. Accessed February 20, 2020. https://repository.library.brown.edu/studio/item/bdr:297526/.

MLA Handbook (7th Edition):

Zhong, Xinghui. “Wave Resolution Properties and Weighted Essentially Non-Oscillatory Limiter for Discontinuous Galerkin Methods.” 2012. Web. 20 Feb 2020.

Vancouver:

Zhong X. Wave Resolution Properties and Weighted Essentially Non-Oscillatory Limiter for Discontinuous Galerkin Methods. [Internet] [Doctoral dissertation]. Brown University; 2012. [cited 2020 Feb 20]. Available from: https://repository.library.brown.edu/studio/item/bdr:297526/.

Council of Science Editors:

Zhong X. Wave Resolution Properties and Weighted Essentially Non-Oscillatory Limiter for Discontinuous Galerkin Methods. [Doctoral Dissertation]. Brown University; 2012. Available from: https://repository.library.brown.edu/studio/item/bdr:297526/

9. TAN, SIRUI. Boundary conditions and applications of WENO finite difference schemes for hyperbolic problems.

Degree: PhD, Applied Mathematics, 2012, Brown University

 This dissertation presents two topics concerning weighted essentially non-oscillatory (WENO) finite difference schemes for solving hyperbolic problems. In the first part, we develop a high… (more)

Subjects/Keywords: WENO schemes

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APA (6th Edition):

TAN, S. (2012). Boundary conditions and applications of WENO finite difference schemes for hyperbolic problems. (Doctoral Dissertation). Brown University. Retrieved from https://repository.library.brown.edu/studio/item/bdr:297524/

Chicago Manual of Style (16th Edition):

TAN, SIRUI. “Boundary conditions and applications of WENO finite difference schemes for hyperbolic problems.” 2012. Doctoral Dissertation, Brown University. Accessed February 20, 2020. https://repository.library.brown.edu/studio/item/bdr:297524/.

MLA Handbook (7th Edition):

TAN, SIRUI. “Boundary conditions and applications of WENO finite difference schemes for hyperbolic problems.” 2012. Web. 20 Feb 2020.

Vancouver:

TAN S. Boundary conditions and applications of WENO finite difference schemes for hyperbolic problems. [Internet] [Doctoral dissertation]. Brown University; 2012. [cited 2020 Feb 20]. Available from: https://repository.library.brown.edu/studio/item/bdr:297524/.

Council of Science Editors:

TAN S. Boundary conditions and applications of WENO finite difference schemes for hyperbolic problems. [Doctoral Dissertation]. Brown University; 2012. Available from: https://repository.library.brown.edu/studio/item/bdr:297524/

10. Zhang, Yifan. Discontinuous Galerkin Methods for Convection Diffusion Equations: Positivity Preserving and Multi-scale Resolution.

Degree: PhD, Applied Mathematics, 2013, Brown University

 This dissertation focuses on studies of two different discontinuous Galerkin (DG) methods for general convection-diffusion equations. One preserves the strict maximum principle for general nonlinear… (more)

Subjects/Keywords: Discontinuous Galerkin method

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APA (6th Edition):

Zhang, Y. (2013). Discontinuous Galerkin Methods for Convection Diffusion Equations: Positivity Preserving and Multi-scale Resolution. (Doctoral Dissertation). Brown University. Retrieved from https://repository.library.brown.edu/studio/item/bdr:320595/

Chicago Manual of Style (16th Edition):

Zhang, Yifan. “Discontinuous Galerkin Methods for Convection Diffusion Equations: Positivity Preserving and Multi-scale Resolution.” 2013. Doctoral Dissertation, Brown University. Accessed February 20, 2020. https://repository.library.brown.edu/studio/item/bdr:320595/.

MLA Handbook (7th Edition):

Zhang, Yifan. “Discontinuous Galerkin Methods for Convection Diffusion Equations: Positivity Preserving and Multi-scale Resolution.” 2013. Web. 20 Feb 2020.

Vancouver:

Zhang Y. Discontinuous Galerkin Methods for Convection Diffusion Equations: Positivity Preserving and Multi-scale Resolution. [Internet] [Doctoral dissertation]. Brown University; 2013. [cited 2020 Feb 20]. Available from: https://repository.library.brown.edu/studio/item/bdr:320595/.

Council of Science Editors:

Zhang Y. Discontinuous Galerkin Methods for Convection Diffusion Equations: Positivity Preserving and Multi-scale Resolution. [Doctoral Dissertation]. Brown University; 2013. Available from: https://repository.library.brown.edu/studio/item/bdr:320595/

11. Qin, Tong. Positivity-Preserving High-Order Discontinuous Galerkin Methods: Implicit Time Stepping and Applications to Relativistic Hydrodynamics.

Degree: Department of Applied Mathematics, 2017, Brown University

 The positivity-preserving property is a highly desirable property when designing high order numerical methods for hyperbolic conservation laws, since negative values sometimes cause ill-posedness of… (more)

Subjects/Keywords: Numerical Anlaysis

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APA (6th Edition):

Qin, T. (2017). Positivity-Preserving High-Order Discontinuous Galerkin Methods: Implicit Time Stepping and Applications to Relativistic Hydrodynamics. (Thesis). Brown University. Retrieved from https://repository.library.brown.edu/studio/item/bdr:733482/

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):

Qin, Tong. “Positivity-Preserving High-Order Discontinuous Galerkin Methods: Implicit Time Stepping and Applications to Relativistic Hydrodynamics.” 2017. Thesis, Brown University. Accessed February 20, 2020. https://repository.library.brown.edu/studio/item/bdr:733482/.

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

MLA Handbook (7th Edition):

Qin, Tong. “Positivity-Preserving High-Order Discontinuous Galerkin Methods: Implicit Time Stepping and Applications to Relativistic Hydrodynamics.” 2017. Web. 20 Feb 2020.

Vancouver:

Qin T. Positivity-Preserving High-Order Discontinuous Galerkin Methods: Implicit Time Stepping and Applications to Relativistic Hydrodynamics. [Internet] [Thesis]. Brown University; 2017. [cited 2020 Feb 20]. Available from: https://repository.library.brown.edu/studio/item/bdr:733482/.

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

Council of Science Editors:

Qin T. Positivity-Preserving High-Order Discontinuous Galerkin Methods: Implicit Time Stepping and Applications to Relativistic Hydrodynamics. [Thesis]. Brown University; 2017. Available from: https://repository.library.brown.edu/studio/item/bdr:733482/

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

12. Yu, Yue. Numerical Methods for Fluid-Structure Interaction: Analysis and Simulations.

Degree: PhD, Applied Mathematics, 2014, Brown University

 In recent years, there has been great interest in fluid-structure interaction (FSI) problems due to their relevance in structural engineering and biomedical applications. However, several… (more)

Subjects/Keywords: FSI

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

APA (6th Edition):

Yu, Y. (2014). Numerical Methods for Fluid-Structure Interaction: Analysis and Simulations. (Doctoral Dissertation). Brown University. Retrieved from https://repository.library.brown.edu/studio/item/bdr:386288/

Chicago Manual of Style (16th Edition):

Yu, Yue. “Numerical Methods for Fluid-Structure Interaction: Analysis and Simulations.” 2014. Doctoral Dissertation, Brown University. Accessed February 20, 2020. https://repository.library.brown.edu/studio/item/bdr:386288/.

MLA Handbook (7th Edition):

Yu, Yue. “Numerical Methods for Fluid-Structure Interaction: Analysis and Simulations.” 2014. Web. 20 Feb 2020.

Vancouver:

Yu Y. Numerical Methods for Fluid-Structure Interaction: Analysis and Simulations. [Internet] [Doctoral dissertation]. Brown University; 2014. [cited 2020 Feb 20]. Available from: https://repository.library.brown.edu/studio/item/bdr:386288/.

Council of Science Editors:

Yu Y. Numerical Methods for Fluid-Structure Interaction: Analysis and Simulations. [Doctoral Dissertation]. Brown University; 2014. Available from: https://repository.library.brown.edu/studio/item/bdr:386288/

.