A priori estimates for parabolic Monge-Amp\`ere type equations
Abstract
We prove the existence and regularity of convex solutions to the first initial-boundary value problem for the parabolic Monge-Amp\`ere equationn \eqnarray &&-ut+ D2u= (x,t) \ in QT, &&u=φ on ∂pQT, eqnarray. where ,φ are given functions, QT=×(0,T], ∂p QT is the parabolic boundary of QT, and ⊂Rn is a uniformly convex domain. Our approach can also be used to prove similar results for the γ-Gauss curvature flow with any 0<γ 1.
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