On the entire self-shrinking solutions to Lagrangian mean curvature flow

Abstract

The authors prove that the logarithmic Monge-Amp\`ere flow with uniformly bound and convex initial data satisfies uniform decay estimates away from time t=0. Then applying the decay estimates, we conclude that every entire classical strictly convex solution of the equation equation* D2u=\n(-u+1/2Σi=1nxi∂ u∂ xi)\, equation* should be a quadratic polynomial if the inferior limit of the smallest eigenvalue of the function |x|2D2u at infinity has an uniform positive lower bound larger than 2(1-1/n). Using a similar method, we can prove that every classical convex or concave solution of the equation equation* Σi=1nλi=-u+1/2Σi=1nxi∂ u∂ xi. equation* must be a quadratic polynomial, where λi are the eigenvalues of the Hessian D2u.