An elementary approach to Wehrl-type entropy bounds in quantitative form
Abstract
We consider the problem of the stability (with sharp exponent) of the Lieb--Solovej inequality for symmetric SU(N) coherent states, which was obtained only recently by the authors. Here, we propose an elementary proof of this result, based on reformulating the Wehrl-type entropy as a function defined on the unit sphere in Cd, for some suitable d, and on some explicit (and somewhat surprising) computations.
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