On the Hamilton-Jacobi Equation and Infimal Convolution in the Framework of Sobolev-functions
Abstract
We study the regularity properties of the Hamilton-Jacobi flow equation and infimal convolution in the case where initial datum function is continuous and lies in given Sobolev-space W1,p(). We prove that under suitable assumptions it holds for solutions w(x,t) that Dxw(·,t) Du(·) in Lp(). Moreover, we construct examples showing that our results are essentially optimal.
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