Uniqueness of nonnegative weak solution to up(-)α2u on RN
Abstract
This note shows that under (p,α, N)∈ (1,∞)×(0,2)× Z+ the fractional order differential inequality () up (-)α2 uin RN has the property that if Nα then a nonnegative solution to () is unique, and if N>α then the uniqueness of a nonnegative weak solution to () occurs when and only when p N/(N-α), thereby innovatively generalizing Gidas-Spruck's result for up+ u 0 in N discovered in GS.
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