Normalized solutions of L2-supercritical Kirchhoff equations in bounded domains

Abstract

In this paper, we investigate the existence of normalized solutions for the following nonlinear Kirchhoff type problem equation* cases -(a+b∫∇ u2dx) u+λ u= up-2u & in ,\\ u=0 & on ∂ cases equation* subject to the constraint ∫ u2dx=c. Here, a and b are positive constants, is a smooth bounded domain in RN with 1≤ N≤3, c>0 is a prescribed value, and λ∈ R is a Lagrange multiplier. In the L2-supercritical regime 2+8N<p<2*, we establish the existence of mountain pass-type normalized solutions. Our approach relies on utilizing a parameterized version of the minimax theorem with Morse index information for constraint functionals, and developing a blow-up analysis for the nonlinear Kirchhoff equations. Furthermore, we explore the asymptotic behavior of these solutions as b→0.