Sobolev space theory for Poisson's and the heat equations in non-smooth domains via superharmonic functions and Hardy's inequality

Abstract

We prove the unique solvability for the Poisson and heat equations in non-smooth domains ⊂ Rd in weighted Sobolev spaces. The zero Dirichlet boundary condition is considered, and domains are merely assumed to admit the Hardy inequality: ∫|f(x)d(x,∂)|2\,\,d x≤ N∫|∇ f|2 \,d x\,\,\,\,,\,\,\,\, ∀ f∈ Cc∞()\,. To describe the boundary behavior of solutions, we introduce a weight system that consists of superharmonic functions and the distance function to the boundary. The results provide separate applications for the following domains: convex domains, domains with exterior cone condition, totally vanishing exterior Reifenberg domains, conic domains, and domains ⊂Rd which the Aikawa dimension of c is less than d-2.