Equivalent Characterizations and Their Applications of Solvability of Lp Poisson--Robin(-Regularity) Problems on Rough Domains

Abstract

Let n2, ⊂Rn be a bounded one-sided chord arc domain, and p∈(1,∞). In this article, we study the (weak) Lp Poisson--Robin(-regularity) problem for a uniformly elliptic operator L:=-div(A∇·) of divergence form on , which considers weak solutions to the equation Lu=h-divF in with the Robin boundary condition A∇ u·+α u=F· on the boundary ∂ for functions h and F in some tent spaces. Precisely, we establish several equivalent characterizations of the solvability of the (weak) Lp Poisson--Robin(-regularity) problem and clarify the relationship between the Lp Poisson--Robin(-regularity) problem and the classical Lp Robin problem. Moreover, we also give an extrapolation property for the solvability of the classical Lp Robin problem. As applications, we further prove that, for the Laplace operator - on the bounded Lipschitz domain , the Lp Poisson--Robin and the Lq Poisson--Robin-regularity problems are respectively solvable for p∈(2-1,∞) and q∈(1,2+2), where 1∈(0,1] and 2∈(0,∞) are constants depending only on n and the Lipschitz constant of and, moreover, these ranges (2-1,∞) of p and (1,2+2) of q are sharp. The main results in this article are the analogues of the corresponding results of both the Lp Poisson--Dirichlet(-regularity) problem, established by M. Mourgoglou, B. Poggi and X. Tolsa [J. Eur. Math. Soc. 2025], and of the Lp Poisson--Neumann(-regularity) problem, established by J. Feneuil and L. Li [arXiv: 2406.16735], in the Robin case.