Existence and order of the self--binding transition in non--local non--linear Schr\"odinger equations
Abstract
We consider a class of non--linear and non--local functionals giving rise to the Choquard equation with a suitably regular interaction potential, modelling, i.e., gases with impurities and axion stars. We study how existence of minimizers depends on the coupling constant, and find that there is a critical interaction strength needed for the minimizers to exist, both in dimensions two and three. In d=3, a minimizer exists also at the critical coupling but none do in d=2 under suitable assumptions on the potential. We also establish that in d=3 there exist other critical points beyond the global minimizer.
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