Bellman Equations with Sub-Lipschitz Hessians
Abstract
We construct homogeneous solutions with non-Lipschitz Hessian for finite, constant-coefficient Bellman equations. First, for every σ∈(0,1), we find two uniformly elliptic matrices A1,A2∈S4 and a nonzero (2+σ)-homogeneous solution u of \[\ tr\,(A1D2u), tr\,(A2D2u)\=0 R4.\] Second, in R2 we construct three matrices satisfying Id2≤ Aj≤3 Id2 for which the corresponding Bellman equation admits a homogeneous solution with a non-Lipschitz Hessian. In particular, solutions to convex fully nonlinear uniformly elliptic equations are not in C2,1, and not even in C2, 1- for > 0 small.
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