Uniform Holder bounds and regularity properties of the limiting pro le for highly competing nonlinear systems ofSchroedinger equations

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Uniform Holder bounds and regularity properties of the limiting pro le for highly competing nonlinear systems ofSchroedinger equations

Susanna Terracini-2010-01-01

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TL;DRAbstract

We consider systems of k Gross-Pitaevskii equations, arising in the theory of Bose Einstein condensate in multiple species, in the case of large interspecies competitive interactions, both in the focusing and defocusing cases. We prove a priori bounds in the space of Holder continuous functions and, as a consequence, convergence to a limiting space, which can be proved to be Lipschitz continuous. Next we focus on the properties of the interface: we prove regularity and equilibrium at the boundary. The technique is based upon perturbed monotonicity formulas, a little geomatric measure theory and elliptic boundary regularity. As a by product we can prove convergence of both the ground and excited states.

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We consider systems of k Gross-Pitaevskii equations, arising in the theory of Bose Einstein condensate in multiple species, in the case of large interspecies competitive interactions, both in the focusing and defocusing cases. We prove a priori bounds in the space of Holder continuous functions and, as a consequence, convergence to a limiting space, which can be proved to be Lipschitz continuous. Next we focus on the properties of the interface: we prove regularity and equilibrium at the boundary. The technique is based upon perturbed monotonicity formulas, a little geomatric measure theory and elliptic boundary regularity. As a by product we can prove convergence of both the ground and excited states.

Keywords

Lipschitz continuityMathematicsLimitingNonlinear systemMonotonic functionConvergence (economics)Hölder conditionSpace (punctuation)

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