Abstract
We study the interior H\"older regularity problem for weak solutions of the porous medium equation with external forces. Since the porous medium equation is the typical example of degenerate parabolic equations, H\"older regularity is a delicate matter and does not follow by classical methods. Caffrelli-Friedman, and Caffarelli-Vazquez-Wolansky showed H\"older regularity for the model equation without external forces. DiBenedetto and Friedman showed the H\"older continuity of weak solutions with some integrability conditions of the external forces but they did not obtain the quantitative estimates. The quantitative estimates are important for studying the perturbation problem of the porous medium equation. We obtain the scale invariant H\"older estimates for weak solutions of the porous medium equations with the external forces. As a particular case, we recover the well known H\"older estimates for the linear heat equation.
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