On the Kirchhoff equation with prescribed mass and general nonlinearities

Abstract

In the present paper, we apply a global branch approach to study the existence, non-existence and multiplicity of positive normalized solutions (λc, uc)∈ R× H1(RN) to the following Kirchhoff problem -(a+b∫RN|∇ u|2dx) u+λ u=g(u)~in~RN,\;N≥ 1 satisfying the normalization constraint ∫RNu2=c, which appears in free vibrations of elastic strings. The parameters a,b>0 are prescribed as well as the mass c>0. Due to the presence of the non-local term b∫RN|∇ u|2dx u, such problems lack the mountain pass geometry in the higher dimension case N≥ 5. Our result seems to be the first attempt in this aspect.

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