English

Diffusion with nonlocal Robin boundary conditions

Functional Analysis 2019-08-08 v2 Analysis of PDEs

Abstract

We investigate a second order elliptic differential operator Aβ,μA_{\beta, \mu} on a bounded, open set ΩRd\Omega\subset\mathbb{R}^{d} with Lipschitz boundary subject to a nonlocal boundary condition of Robin type. More precisely we have 0βL(Ω)0\leq \beta\in L^{\infty}(\partial\Omega) and μ ⁣:ΩM(Ω)\mu\colon \partial \Omega \to \mathscr{M}(\overline{\Omega}), and boundary conditions of the form νAu(z)+β(z)u(z)=Ωu(x)μ(z)(dx), zΩ, \partial_{\nu}^{\mathscr{A}}u(z)+\beta(z)u(z)=\int_{\overline{\Omega}}u(x)\mu(z)(dx),\ z\in\partial\Omega, where νA\partial_{\nu}^{\mathscr{A}} denotes the weak conormal derivative with respect to our differential operator. Under suitable conditions on the coefficients of the differential operator and the function μ\mu we show that Aβ,μA_{\beta, \mu} generates a holomorphic semigroup Tβ,μT_{\beta,\mu} on L(Ω)L^{\infty}(\Omega) which enjoys the strong Feller property. In particular, it takes values in C(Ω)C(\overline{\Omega}). Its restriction to C(Ω)C(\overline{\Omega}) is strongly continuous and holomorphic. We also establish positivity and contractivity of the semigroup under additional assumptions and study the asymptotic behavior of the semigroup.

Keywords

Cite

@article{arxiv.1610.06894,
  title  = {Diffusion with nonlocal Robin boundary conditions},
  author = {Wolfgang Arendt and Stefan Kunkel and Markus Kunze},
  journal= {arXiv preprint arXiv:1610.06894},
  year   = {2019}
}

Comments

Revision based on the comments of the referee; final version

R2 v1 2026-06-22T16:28:02.621Z