Regularity of Singular Solutions to p-Poisson Equations

Abstract

This work showcases level set estimates for weak solutions to the p-Poisson equation on a bounded domain, which we use to establish Lebesgue space inclusions for weak solutions. In particular we show that if ⊂Rn is a bounded domain and u is a weak solution to the Dirichlet problem for Poisson's equation \[ - u=f in \] \[ \;\; u=0 on ∂ \] for f∈ Lq() with q<n2, then u∈ Lr() for every r<qnn-2q and indeed \|u\|r≤ C\|f\|q. This result is shown to be sharp, and similar regularity is established for solutions to the p-Poisson equation including in the edge case q=np.