| Lecturer | 정인지 |
|---|---|
| Dept. | 서울대학교 |
| date | Mar 11, 2021 |
We obtain a quantitative and robust proof that incompressible fluid models are strongly ill-posed in critical Sobolev spaces, in the sense that norm inflation and even nonexistence occur for critical initial data. We then show how to use the result to obtain short-time enhanced dissipation for the Navier-Stokes equations.
Harmonic bundles and Toda lattices with opposite sign
Heavy-tailed large deviations and deep learning's generalization mystery
High dimensional nonlinear dynamics
How to solve linear systems in practice
Hybrid discontinuous Galerkin methods in computational science and engineering
Idempotents and topologies
Ill-posedness for incompressible Euler equations at critical regularit
Infinite order rationally slice knots
Integer partitions, q-series, and Modular forms
Introduction to Non-Positively Curved Groups
Irreducible Plane Curve Singularities
It all started with Moser
Iwahori-Hecke algebras and beyond
Iwasawa main conjecture and p-adic L-functions
L-function: complex vs. p-adic
Lie group actions on symplectic manifolds
Limit computations in algebraic geometry and their complexity
Mathemaics & Hedge Fund
Mathematical Analysis Models and Siumlations
Mathematical Models and Intervention Strategies for Emerging Infectious Diseases: MERS, Ebola and 2009 A/H1N1 Influenza
