On a class of divergence form linear parabolic equations with degenerate coefficients

Abstract

We study a class of linear parabolic equations in divergence form with degenerate coefficients on the upper half space. Specifically, the equations are considered in (-∞, T) × Rd+, where Rd+ = \x ∈ Rd\,:\, xd>0\ and T∈ (-∞, ∞] is given, and the diffusion matrices are the product of xd and bounded uniformly elliptic matrices, which are degenerate at \xd=0\. As such, our class of equations resembles well the corresponding class of degenerate viscous Hamilton-Jacobi equations. We obtain wellposedness results and regularity type estimates in some appropriate weighted Sobolev spaces for the solutions.

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