Towards a deterministic KPZ equation with fractional diffusion: The stationary problem
Abstract
In this work we analyze the existence of solution to the fractional quasilinear problem, equation* \ arrayrcll (-)s u &= & |∇ u|p+ f & in , u &=& 0 & in RN, u&>&0 & in , array% . equation*% where ⊂ is a bounded regular domain (C2 is sufficient), s∈ ( 12, 1), 1<p and f is a measurable nonnegative function with suitable hypotheses. The analysis is done separately in three cases, subcritical, 1<p<2s, critical, p=2s, and supercritical, p>2s.
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