Renjin Jiang
Published 2011-01-05, updated 2011-09-15Version 2
Let $(X,d)$ be a complete, pathwise connected metric measure space with locally Ahlfors $Q$-regular measure $\mu$, where $Q>1$. Suppose that $(X,d,\mu)$ supports a (local) $(1,2)$-Poincar\'e inequality and a suitable curvature lower bound. For the Poisson equation $\Delta u=f$ on $(X,d,\mu)$, Moser-Trudinger and Sobolev inequalities are established for the gradient of $u$. The local H\"older continuity with optimal exponent of solutions is obtained.
Comments: Journal of Functional Analysis, to appear
Improved regularity for the $p$-Poisson equation
Lipschitz continuity of solutions of Poisson equations in metric measure spaces
Regularity of Singular Solutions to $p$-Poisson Equations
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