Lp theory for a singular Sturm-Liouville equation
Abstract
In this paper we consider the following Sturm-Liouville equation \[ \ aligned -(x2αu'(x))'+u(x)&=f(x) && in (0,1],\\ u(1)&=0 aligned . \] where α<1 is a nonzero real number and f belongs to Lp(0,1) for p≥ 1. We analyze the existence and regularity of solutions under suitable weighted Dirichlet boundary condition at the origin.
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