No local L1 solutions for semilinear fractional heat equations
Abstract
We study the Cauchy problem for the semilinear fractional heat equation ut=α/2u+f(u) with non-negative initial value u0∈ Lq(Rn) and locally Lipschitz, non-negative source term f. For f satisfying the Osgood-type condition ∫1∞dsf(s)=∞, we show that there exist initial conditions such that the equation has no local solution in L1loc(Rn).
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