| Abstract: |
| In this talk, we focus on the existence of normalized solutions for a class of gradient-type Schrodinger systems within bounded domains, subject to Neumann boundary conditions. By utilizing a parameterized minimax principle that incorporates Morse index information for constrained functionals, along with a novel blow-up analysis of the gradient-type Schrodinger system under these Neumann boundary conditions, we establish the existence of mountain pass-type normalized solutions. |
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