Normalized solutions to focusing Sobolev critical biharmonic Schr\"odinger equation with mixed dispersion

Abstract

This paper is concerned with the following focusing biharmonic Schr\"odinger equation with mixed dispersion and Sobolev critical growth: cases 2u- u-λ u-μ|u|p-2u-|u|4*-2u=0\ \ in\ RN, \\[0.1cm] ∫RN u2 dx = c, cases where N ≥ 5, μ,c>0, 2<p<4*:=2NN-4 and λ ∈ R is a Lagrange multiplier. For this problem, under the L2-subcritical perturbation (2<p<2+8N), we derive the existence and multiplicity of normalized solutions via the truncation technique, concentration-compactness principle and the genus theory presented by C.O. Alves et al. (Arxiv, (2021), doi: 2103.07940v2). Compared to the results of C.O. Alves et al. we obtain a more general result after removing the further assumptions given in (3.2) of their paper. In the case of L2-supercritical perturbation (2+8N<p<4*), we explore the existence results of normalized solutions by applying the constrained variational methods and the mountain pass theorem. Moreover, we propose a novel method to address the effects of the dispersion term u. This approach allows us to extend the recent results obtained by X. Chang et al. (Arxiv, (2023), doi: 2305.00327v1) to the mixed dispersion situation.

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