Uniqueness for unbounded solutions to stationary viscous Hamilton--Jacobi equations

Abstract

We consider a class of stationary viscous Hamilton--Jacobi equations as \arrayl u- div(A(x) ∇ u)=H(x,∇ u)in , u=0on∂array . where ≥ 0, A(x) is a bounded and uniformly elliptic matrix and H(x,) is convex in and grows at most like ||q+f(x), with 1 < q < 2 and f ∈ Nq'. Under such growth conditions solutions are in general unbounded, and there is not uniqueness of usual weak solutions. We prove that uniqueness holds in the restricted class of solutions satisfying a suitable energy--type estimate, i.e. (1+|u|) q-1 u∈ , for a certain (optimal) exponent q. This completes the recent results in GMP, where the existence of at least one solution in this class has been proved.

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