Decay at infinity for solutions to some fractional parabolic equations
Abstract
For s ∈ [1/2, 1), let u solve (∂t - )s u = Vu in Rn × [-T, 0] for some T>0 where ||V|| C2( Rn × [-T, 0]) < ∞. We show that if for some 0< c< T and ε>0 1c ∫[-c,0] u2(x, t) dt ≤ Ce-|x|2+ε\ ∀ x ∈ Rn, then u 0 in Rn × [-T, 0].
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