A Direct Method of Moving Planes for Logarithmic Schr\"odinger Operator
Abstract
In this paper, we study the radial symmetry and monotonicity of nonnegative solutions to nonlinear equations involving the logarithmic Schrodinger operator (I-) corresponding to the logarithmic symbol (1 + ||2), which is a singular integral operator given by (I-)u(x) =cNP.V.∫RNu(x)-u(y)|x-y|N(|x-y|)dy, where cN=π-N2, (r)=21-N2rN2KN2(r) and K is the modified Bessel function of second kind with index . The proof hinges on a direct method of moving planes for the logarithmic Schrodinger operator.
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