Dirichlet energy and focusing NLS condensates of minimal intensity

Abstract

We consider the family of (poly)continua in the upper half-plane H that contain a preassigned finite anchor set E∈ H. For a given harmonic external field we define a Dirichlet energy functional I( K) and show that within each ``connectivity class'' of the family, there exists a minimizing compact K* consisting of critical trajectories of a quadratic differential. In many cases this quadratic differential coincides with the square of the real normalized quasimomentum differential d p associated with the finite gap solutions of the focusing Nonlinear Schr\"odinger equation (fNLS) defined by a hyperelliptic Riemann surface R branched at the points E E. The motivation for this work lies in the problem of soliton condensate of least average intensity such that a given anchor set E belongs to the poly-continuum K. An fNLS soliton condensate is defined by a compact K⊂ H (its spectral support) whereas the average intensity of the condensate is proportional to I( K). We prove that the spectral support K* provides the fNLS soliton condensate of the least average intensity within a given ``connectivity class''.

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