Existence of mild solutions for the Hamilton-Jacobi equation with critical fractional viscosity in the Besov spaces
Abstract
We consider the Cauchy problem for the Hamilton-Jacobi equation with critical dissipation, ∂t u + (-) 1/2 u = |∇ u|p, x ∈ RN, t > 0, u(x,0) = u0(x) , x ∈ RN, where p > 1 and u0 ∈ B1r,1( RN) B1∞,1 ( RN) with r ∈ [1,∞]. We show that for sufficiently small u0 ∈ B1∞,1( RN), there exists a global-in-time mild solution. Furthermore, we prove that the solution behaves asymptotically like suitable multiplies of the Poisson kernel.
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