Entire solutions of two-convex Lagrangian mean curvature flows
Abstract
Given an entire C2 function u on Rn, we consider the graph of D u as a Lagrangian submanifold of R2n, and deform it by the mean curvature flow in R2n. This leads to the special Lagrangian evolution equation, a fully nonlinear Hessian type PDE. We prove long-time existence and convergence results under a 2-positivity assumption of (I+(D2 u)2)-1D2 u. Such results were previously known only under the stronger assumption of positivity of D2 u.
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