A remark on elliptic differential equations on manifold

Authors

  • A. Ashyralyev
  • Y. Sozen
  • F. Hezenci

DOI:

https://doi.org/10.31489/2020m3/75-85

Keywords:

differential equations on manifolds, well-posedness, self-adjoint positive definite operator

Abstract

For elliptic boundary value problems of nonlocal type in Euclidean space, the well posedness has been studied by several authors and it has been well understood. On the other hand, such kind of problems on manifolds have not been studied yet. Present article considers differential equations on smooth closed manifolds. It establishes the well posedness of nonlocal boundary value problems of elliptic type, namely Neumann-Bitsadze-Samarskii type nonlocal boundary value problem on manifolds and also DirichletBitsadze-Samarskii type nonlocal boundary value problem on manifolds, in H¨older spaces. In addition, in various H¨older norms, it establishes new coercivity inequalities for solutions of such elliptic nonlocal
type boundary value problems on smooth manifolds.

Downloads

Published

2020-09-30

Issue

Section

MATHEMATICS