Skip navigation

상단메뉴

글로벌메뉴

좌측메뉴

학술행사

검색

논문

tab menu

  • View
  • All
  • 수학부
  • 물리학부
  • 계산과학부
  • Center for Advanced Computation

Seminar View

Seminar
TITLE The obstacle problem for the Monge-Ampere equation with the lower obstacle
KIAS AUTHORS Lee, Taehun,Lee, Ki-Ahm
JOURNAL NONLINEAR ANALYSIS-THEORY METHODS & APPLICATIONS, 2021
ARCHIVE  
ABSTRACT In this paper, we study the existence and optimal regularity of the solution and the regularity of the free boundary of the obstacle problem for the Monge-Ampere equation with the lower obstacle function, which arises in the prescribed Gauss curvature with an obstacle. The main feature of this paper is that we consider the obstacle problem for Monge-Ampere operator, which is a log-concave operator, with the lower obstacle function. Generally, the problem for a convex operator with a lower obstacle or a concave operator with an upper obstacle is considered due to the definition of the solutions and the classification of the global solutions. In this paper, difficulties caused by the incongruousness of the operator and the location of the obstacle are considered in many parts such as the penalization problem, classification of the global solutions, and the directional monotonicity. (C) 2021 Elsevier Ltd. All rights reserved.
  • before page
  • list
  • next page
Seminar List

keyword

fiel&date

~