Abstract
We prove the parabolic boundary Harnack inequality in parabolic flat Lipschitz domains by blow-up techniques, allowing, for the first time, a non-zero right-hand side. Our method allows us to treat solutions to equations driven by non-divergence form operators with bounded measurable coefficients, and a right-hand side for . In the case of the heat equation, we also show the optimal regularity of the quotient. As a corollary, we obtain a new way to prove that flat Lipschitz free boundaries are in the parabolic obstacle problem and in the parabolic Signorini problem.
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