Normalized solutions to at least mass critical problems: singular polyharmonic equations and related curl-curl problems

Abstract

We are interested in the existence of normalized solutions to the problem equation* cases (-)m u+μ|y|2mu + λ u = g(u), x = (y,z) ∈ RK × RN-K, \\ ∫RN |u|2 \, dx = > 0, cases equation* in the so-called at least mass critical regime. We utilize recently introduced variational techniques involving the minimization on the L2-ball. Moreover, we find also a solution to the related curl-curl problem equation* cases ∇×∇×U+λU=f(U), x ∈ RN, \\ ∫RN|U|2\,dx=, cases equation* which arises from the system of Maxwell equations and is of great importance in nonlinear optics.

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