Liouville theorem and sharp solvability for solutions of the parabolic Monge-Amp\`ere equation with periodic data
Abstract
We prove a Liouville Theorem for ancient solutions of the parabolic Monge-Amp\`ere equation with smooth periodic data, generalizing Caffarelli-Li's result cl04 in 2004 to the parabolic background. To achieve this, we obtain a necessary and sufficient condition for the existence of the smooth periodic solution of the equation (1-ut) (Dx2u+I)=f in Rn+1, where f is smooth and periodic in both spatial and temporal variables. This parabolic existence theorem parallels the elliptic counterpart established by Li l90 in 1990.
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