Discontinuous Ground States for NLSE on mathbb{R} with a F\"{u}l\"{o}p-Tsutsui δ interaction
classification
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keywords
grounddeltastatesdefectexistencep-tsutsuistabilityaction
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We analyse the existence and the stability of the ground states of the one-dimensional nonlinear Schr\"{o}dinger equation with a focusing power nonlinearity and a defect located at the origin. In this paper a ground state is defined as a global minimizer of the action functional on the Nehari manifold and the defect considered is a F\"{u}l\"{o}p-Tsutsui $\delta$ type, namely a $\delta$ condition that allows discontinuities. The existence of ground states is proved by variational techniques, while the stability results from the Grillakis-Shatah-Strauss theory.
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