Degenerate linear parabolic equations in divergence form on the upper half space

Abstract

We study a class of second-order degenerate linear parabolic equations in divergence form in (-∞, T) × Rd+ with homogeneous Dirichlet boundary condition on (-∞, T) × ∂ Rd+, where Rd+ = \x ∈ Rd\,:\, xd>0\ and T∈ (-∞, ∞] is given. The coefficient matrices of the equations are the product of μ(xd) and bounded uniformly elliptic matrices, where μ(xd) behaves like xdα for some given α ∈ (0,2), which are degenerate on the boundary \xd=0\ of the domain. Under a partially VMO assumption on the coefficients, we obtain the wellposedness and regularity of solutions in weighted Sobolev spaces. Our results can be readily extended to systems.