Symmetry and monotonicity of singular solutions for the Hartree equation
Abstract
In this paper we are concerned with positive singular solutions of the following nonlocal Hartree equation - u\!=( ∫RN F(u(y))|x-y|μdy )f (u(x)), x∈ RN, where F is the primitive of f and is the singular set. Under suitable assumptions, we prove that u is symmetric and monotone with respect to the singular set by using moving plane methods. Furthermore, we complement this study by showing the existence, for a model problem, of a singular solution with the desired properties.
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