Roger Témam
Computer Science · Indiana University
Publications
617
Citations
39,152
Est. group size
—
Recurring co-author estimate
Active years
59
Publishing since 1968
Roger Témam works on the mathematics of fluid flow and related physical systems, using partial differential equations (equations describing how quantities change in space and time) to study problems such as turbulence, the Navier-Stokes equations, and mixtures of fluids. The research spans both rigorous mathematical analysis (proving that solutions exist and behave well) and numerical methods for simulating these systems on computers, with applications ranging from atmospheric and ocean modeling to blood flow.
Publication activity was highest in the late 2010s (13-14 per year) and has slowed over recent years, averaging about 3.4 per year over the last five years.
Generated by claude-opus-4-8 from public bibliographic data · Jul 11, 2026
- Application of Incremental Unknowns to the Burgers Equation
2026
- Haim Brezis (1944–2024)
Asymptotic Analysis · 2024
- Existence and regularity of strong solutions to a nonhomogeneous Kelvin-Voigt-Cahn-Hilliard system
Journal of Differential Equations · 2023
- 3D shear flows driven by Lévy noise at the boundary
Probability Uncertainty and Quantitative Risk · 2023
- Reconstructing the Surface Mesh Representation for Single Neuron
Lecture notes in computer science · 2022
- Local well-posedness of a three-dimensional phase-field model for thrombus and blood flow
arXiv (Cornell University) · 2022
- Attractors for the Navier-Stokes-Cahn-Hilliard system
Discrete and Continuous Dynamical Systems - S · 2022
- Conservative Numerical Schemes with Optimal Dispersive Wave Relations: Part II. Numerical Evaluations
Journal of Scientific Computing · 2022
- Local well-posedness of a three-dimensional phase-field model for thrombus and blood flow
Revista de la Real Academia de Ciencias Exactas Físicas y Naturales Serie A Matemáticas · 2022
- Nonlinear Stochastic parabolic partial differential equations with a\n monotone operator of the Ladyzenskaya-Smagorinsky type, driven by a Levy\n noise
arXiv (Cornell University) · 2021
- Nonlinear stochastic parabolic partial differential equations with a monotone operator of the Ladyzenskaya-Smagorinsky type, driven by a Lévy noise
Journal of Functional Analysis · 2021
- Conservative numerical schemes with optimal dispersive wave relations: Part I. Derivation and analysis
Numerische Mathematik · 2021
- Conservative numerical schemes with optimal dispersive wave relations -- Part II. Numerical evaluations
arXiv (Cornell University) · 2020
- Weak and strong solutions to the nonhomogeneous incompressible Navier-Stokes-Cahn-Hilliard system
Journal de Mathématiques Pures et Appliquées · 2020
- Enriched numerical scheme for singularly perturbed barotropic Quasi-Geostrophic equations
Journal of Computational Physics · 2020
- arXiv (Cornell University)×15
- Applied mathematical sciences×8
- Advances in Nonlinear Analysis×3
- Discrete and Continuous Dynamical Systems×3
- Journal of Scientific Computing×3
This profile was generated automatically from public scholarly data (OpenAlex). Group size and activity levels are estimates derived from co-authorship patterns.
Last updated Jul 11, 2026.
Claim or correct this profile