Existence of solutions to elliptic equations involving regional fractional Laplacian with order (0,12]
Abstract
Our purpose of this paper is to investigate positive solutions of the elliptic equation with regional fractional Laplacian ( - )B1s u +u= h(x,u) in \ \, B1, u∈ C0(B1), where ( - )B1s with s∈(0,12] is the regional fractional Laplacian and h is the nonlinearity. Ordinarily, positive solutions vanishing at the boundary are not anticipated to be derived for the equations with regional fractional Laplacian of order s∈(0,12]. Positive solutions are obtained when the nonlinearity assumes the following two models: h(x,t)=f(x) or h(x,t)=h1(x)\, tp+ ε h2(x), where p>1, ε>0 small and f, h1, h2 are H\"older continuous, radially symmetric and decreasing functions under suitable conditions.
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