Normalized Solutions for the (2,q)-Laplacian Operator Between Mass-Critical Exponents

Abstract

This paper concerns the existence of normalized solutions to a class of (2,q)-Laplacian equations with a power type nonlinearity in the intermediate regime between the two mass critical exponents 2(1+2/N), q(1+2/N). More precisely, we prove the existence of solutions with negative energy obtained through a global minimization procedure, and of solutions with positive energy established via a local minimization technique and a mountain-pass argument. Furthermore, we derive both existence and nonexistence results for the zero-mass case λ = 0, highlighting the role of the mixed diffusion in determining the qualitative behavior of solutions. Specifically, this paper's novelty lies in providing a comprehensive understanding of the intermediate cases that arise when the non-homogeneous (2,q)-Laplacian operator appears. Our analysis combines variational methods, compactness arguments, and delicate energy estimates adapted to the nonhomogeneous nature of the (2,q)-Laplacian operator.

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