Normalized ground state solutions of Schr\"odinger-KdV system in R3
Abstract
In this paper, we study the coupled Schr\"odinger-KdV system align* cases - u +λ1 u=u3+β uv~~&in~~R3, \\- v +λ2 v=12v2+12β u2~~&in~~R3 cases align* subject to the mass constraints equation* ∫R3|u|2 dx=a, ∫R3|v|2 dx=b, equation* where a, b>0 are given constants, β>0, and the frequencies λ1,λ2 arise as Lagrange multipliers. The system exhibits L2-supercritical growth. Using a novel constraint minimization approach, we demonstrate the existence of a local minimum solution to the system. Furthermore, we establish the existence of normalized ground state solutions.
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