Nonlocal Boundary Value Problems Governed by Symmetric Nonlocal Operators

Abstract

Nonlocal boundary value problems with Dirichlet or Neumann boundary are well-studied for nonlocal operators of the type Lγ u = PV ∫Rd (u(·)-u(y)) γ(·,y) \, dy where the underlying kernel function γ: Rd × Rd → [0,∞) is assumed to be measurable and symmetric. In this paper, a theory is introduced for problems whose governing operator is of the more general type \[Lu:= PV ∫Rd(u(·)-u(y)) \, K(·, dy)\] where K: Rd × B(Rd) → [0,∞] is a symmetric transition kernel. Our main focus is on nonlocal Dirichlet and Neumann problems and a classical Hilbert space approach is developed for solving designated weak formulations. As an example, the discrete Poisson problem on =(0,1)d is discussed.