Generalized Nonlocal Robin Laplacian on Arbitrary Domains

Abstract

In this paper, we prove that it is always possible to define a realization of the Laplacian ,θ on L2() subject to nonlocal Robin boundary conditions with general jump measures on arbitrary open subsets of RN. This is made possible by using a capacity approach to define admissible pair of measures (,θ) that allows the associated form E,θ to be closable. The nonlocal Robin Laplacian ,θ generates a sub-Markovian C0-semigroup on L2() which is not dominated by Neumann Laplacian semigroup unless the jump measure θ vanishes. Finally, the convergence of semigroups sequences e-t_n,θn is investigated in the case of vague convergence and γ-convergence of admissible pair of measures (n,θn).