Your search keyword '"Kyudong Choi"' showing total 3 results

1. Stability of Lamb Dipoles

Author

Ken Abe and Kyudong Choi

Subjects

Mathematics - Analysis of PDEs, Mathematics (miscellaneous), orbital stability, Mechanical Engineering, FOS: Mathematics, Lamb dipole, Physics::Atomic Physics, vortex pairs, Euler equations, Analysis, Analysis of PDEs (math.AP)

Abstract

The Lamb dipole is a traveling wave solution to the two-dimensional Euler equations introduced by S. A. Chaplygin (1903) and H. Lamb (1906) at the early 20th century. We prove orbital stability of this solution based on a vorticity method initiated by V. I. Arnold. Our method is a minimization of a penalized energy with multiple constraints that deduces existence and orbital stability for a family of traveling waves. As a typical case, orbital stability of the Lamb dipole is deduced by characterizing a set of minimizers as an orbit of the dipole by a uniqueness theorem in the variational setting., Comment: 41 pages

Published

2022

2. On the estimate of distance traveled by a particle in a disk-like vortex patch

Author

Kyudong Choi

Subjects

Characteristic function (convex analysis), Plane (geometry), Applied Mathematics, 010102 general mathematics, Mathematical analysis, 76B47, 35Q35, Open set, Vorticity, 01 natural sciences, Vortex, Euler equations, 010101 applied mathematics, Physics::Fluid Dynamics, symbols.namesake, Mathematics - Analysis of PDEs, Bounded function, symbols, FOS: Mathematics, 0101 mathematics, Symmetric difference, Mathematics, Analysis of PDEs (math.AP)

Abstract

We consider the incompressible two-dimensional Euler equation in the plane in the case when its initial vorticity is the characteristic function of a bounded open set. We show that the travel distance grows linearly for most of fluid particles initially placed on the set when the area of the symmetric difference between the set and a disk is small enough., 6 pages

Published

2019

3. SHORT-TIME STABILITY OF SCALAR VISCOUS SHOCKS IN THE INVISCID LIMIT BY THE RELATIVE ENTROPY METHOD.

Author

KYUDONG CHOI and VASSEUR, ALEXIS F.

Subjects

*STABILITY theory, *VISCOUS flow, *INVISCID flow, *ENTROPY, *CONSERVATION laws (Mathematics)

Abstract

We consider inviscid limits to shocks for viscous scalar conservation laws in one space dimension, with strict convex fluxes. We show that we can obtain sharp estimates in L² for a class of large perturbations and for any bounded time interval. Those perturbations can be chosen big enough to destroy the viscous layer. This shows that the fast convergence to the shock does not depend on the fine structure of the viscous layers. This is the first application of the relative entropy method developed by N. Leger [Arch. Ration. Mech. Anal., 199 (2011), pp. 761-778] and N. Leger and A. Vasseur [Arch. Ration. Mech. Anal., 201 (2011), pp. 271-302] to the study of an inviscid limit to a shock. [ABSTRACT FROM AUTHOR]

Published

2015