Extremal values of L2-Pohozaev manifolds and their applications

Abstract

In this paper, we consider the following Schr\"odinger equation: equation* cases - u=λ u+μ|u|q-2u+|u|2*-2u RN,\\ ∫RN|u(x)|2dx=a, u∈ H1(RN),\\ cases equation* where N 3, 2<q<2+4N, a, μ>0, 2*=2NN-2 is the critical Sobolev exponent and λ∈ R is one of the unknowns in the above equation which appears as a Lagrange multiplier. By applying the minimization method on the L2-Pohozaev manifold, we prove that if N≥3, q∈(2,2+4N), a>0 and 0<μ≤μ*a, then the above equation has two positive solutions which are real valued, radially symmetric and radially decreasing, where equation* μ*a=(2*-2)(2-qγq)2-qγq2*-2γq(2*-qγq)2*-qγq2*-2∈fu∈ H1(RN), \|u\|22=a(\|∇ u\|22)2*-qγq2*-2\|u\|qq(\|u\|2*2*)2-qγq2*-2. equation* Our results improve the conclusions of JeanjeanLe2021,JeanjeanJendrejLeVisciglia2022,Soave2020-2,WeiWu2022 and we hope that our proofs and discussions in this paper could provide new techniques and lights to understand the structure of the set of positive solutions of the above equations.

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