C1, regularity of solutions to parabolic Monge-Amp\'ere equations

Abstract

We study interior C1, regularity of viscosity solutions of the parabolic Monge-Amp\'ere equation ut = b(x,t) , with exponent p >0 and with coefficients b which are bounded and measurable. We show that when p is less than the critical power 1n-2 then solutions become instantly C1, in the interior. Also, we prove the same result for any power p>0 at those points where either the solution separates from the initial data, or where the initial data is C1, β.