Existence and multiplicity of normalized solutions for (2,q)-Laplacian equations with generic double-behaviour nonlinearities
Abstract
In this paper, we study existence and multiplicity of normalized solutions for the following (2, q)-Laplacian equation equation*Eq-Equation1 \arrayl - u-q u+λ u=f(u) x ∈ RN , ∫RNu2 d x=c2, array. equation* where 1<q<N, N≥3, q=div(|∇ u|q-2 ∇ u) denotes the q-Laplacian operator, λ is a Lagrange multiplier and c>0 is a constant. The nonlinearity f:R→ R is continuous, with mass-subcritical growth at the origin, mass-supercritical growth at infinity, and is more general than the sum of two powers. Under different assumptions, we prove the existence of a locally least-energy solution and the existence of a second solution with higher energy.
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