Boundary Regularity for the Porous Medium Equation

Abstract: We study the boundary regularity of solutions to the porous medium equation ut = ∆u m in the degenerate range m > 1. In particular, we show that in cylinders the Dirichlet problem with positive continuous boundary data on the parabolic boundary has a solution which attains the boundary values, provided that the spatial domain satisfies the elliptic Wiener criterion. This condition is known to be optimal, and it is a consequence of our main theorem which establishes a barrier characterization of regular boundar… Show more

“…For the porous medium equation, a crucial approximation scheme in this connection exploits the obstacle problem in [19]. As further applications, we mention questions related to boundary regularity addressed in [3,21]. In this context, we also point out that there is an alternative approach to the obstacle problem, in which the solution is defined as the smallest weak supersolution lying above the given obstacle ψ.…”

On the Hölder regularity for obstacle problems to porous medium type equations

“…For the porous medium equation, a crucial approximation scheme in this connection exploits the obstacle problem in [19]. As further applications, we mention questions related to boundary regularity addressed in [3,21]. In this context, we also point out that there is an alternative approach to the obstacle problem, in which the solution is defined as the smallest weak supersolution lying above the given obstacle ψ.…”

On the Hölder regularity for obstacle problems to porous medium type equations

Regularity of weak supersolutions to elliptic and parabolic equations: Lower semicontinuity and pointwise behavior

Continuity up to the boundary for obstacle problems to porous medium type equations