ProfessorsProfessors of Florida State UniversityDavid A. Kopriva

David A. Kopriva

Florida State University

H-index: 35

North America-United States

About David A. Kopriva

David A. Kopriva, With an exceptional h-index of 35 and a recent h-index of 21 (since 2020), a distinguished researcher at Florida State University, specializes in the field of Spectral Methods, Numerical Solution of PDEs.

His recent articles reflect a diverse array of research interests and contributions to the field:

: A high-order discontinuous Galerkin solver for flow simulations and multi-physics applications

On the theoretical foundation of overset grid methods for hyperbolic problems II: Entropy bounded formulations for nonlinear conservation laws

Analysis of an Explicit, High-Order Semi-Lagrangian Nodal Method

A Split-form, Stable CG/DG-SEM for Wave Propagation Modeled by Linear Hyperbolic Systems

Stability of discontinuous Galerkin spectral element schemes for wave propagation when the coefficient matrices have jumps

A statically condensed discontinuous Galerkin spectral element method on Gauss-Lobatto nodes for the compressible Navier-Stokes equations

Construction of modern robust nodal discontinuous Galerkin spectral element methods for the compressible Navier–Stokes equations

Stability of wall boundary condition procedures for discontinuous Galerkin spectral element approximations of the compressible Euler equations

David A. Kopriva Information

University	Florida State University
Position	Professor Emeritus of Mathematics The and San Diego State University
Citations(all)	5632
Citations(since 2020)	2382
Cited By	4309
hIndex(all)	35
hIndex(since 2020)	21
i10Index(all)	72
i10Index(since 2020)	42
Email	Access Email
University Profile Page	Florida State University
Google Scholar	View Google Scholar Profile

David A. Kopriva Skills & Research Interests

Spectral Methods

Numerical Solution of PDEs

Top articles of David A. Kopriva

Title	Journal	Author(s)	Publication Date
: A high-order discontinuous Galerkin solver for flow simulations and multi-physics applications	Computer Physics Communications	Esteban Ferrer Gonzalo Rubio Gerasimos Ntoukas Wojciech Laskowski OA Mariño ...	2023/6/1
On the theoretical foundation of overset grid methods for hyperbolic problems II: Entropy bounded formulations for nonlinear conservation laws	Journal of Computational Physics	David A Kopriva Gregor J Gassner Jan Nordström	2022/12/15
Analysis of an Explicit, High-Order Semi-Lagrangian Nodal Method	arXiv preprint arXiv:2212.11407	Gustaaf B Jacobs Hareshram Natarajan Pavel Popov David A Kopriva	2022/12/21
A Split-form, Stable CG/DG-SEM for Wave Propagation Modeled by Linear Hyperbolic Systems	Journal of Scientific Computing	David A Kopriva Gregor J Gassner	2021/10
Stability of discontinuous Galerkin spectral element schemes for wave propagation when the coefficient matrices have jumps	Journal of Scientific Computing	David A Kopriva Gregor J Gassner Jan Nordström	2021/7
A statically condensed discontinuous Galerkin spectral element method on Gauss-Lobatto nodes for the compressible Navier-Stokes equations	Journal of Computational Physics	Andres M Rueda-Ramirez Esteban Ferrer David A Kopriva Gonzalo Rubio Eusebio Valero	2021/2/1
Construction of modern robust nodal discontinuous Galerkin spectral element methods for the compressible Navier–Stokes equations	Efficient High-Order Discretizations for Computational Fluid Dynamics	Andrew R Winters David A Kopriva Gregor J Gassner Florian Hindenlang	2021
Stability of wall boundary condition procedures for discontinuous Galerkin spectral element approximations of the compressible Euler equations	Spectral and High Order Methods for Partial Differential Equations ICOSAHOM 2018	Florian J Hindenlang Gregor J Gassner David A Kopriva	2020/8/11
Assessing standard and kinetic energy conserving volume fluxes in discontinuous Galerkin formulations for marginally resolved Navier-Stokes flows	Computers & Fluids	Bjoern F Klose Gustaaf B Jacobs David A Kopriva	2020/6/15
An entropy–stable discontinuous Galerkin approximation for the incompressible Navier–Stokes equations with variable density and artificial compressibility	Journal of Computational Physics	Diego Lodares Juan Manzanero Esteban Ferrer Eusebio Valero	2022/4/15
A free–energy stable nodal discontinuous Galerkin approximation with summation–by–parts property for the Cahn–Hilliard equation	Journal of Computational Physics	Juan Manzanero Gonzalo Rubio David A Kopriva Esteban Ferrer Eusebio Valero	2020/2/15