Entire solutions to the parabolic Monge--Amp\`ere equation with unbounded nonlinear growth in time

Abstract

The Liouville type theorem on the parabolic Monge--Amp\`ere equation -ut D2u=1 states that any entire parabolically convex classical solution must be of form -t+|x|2/2 up to a re-scaling and transformation, under additional assumption that partial derivative with respect to time variable ut is strictly negative and bounded. In this paper, we study the case when ut is unbounded, prove an existence result of entire parabolically convex smooth solution and investigate the asymptotic behavior near infinity.