Formulae for the Derivative of the Poincar\'e Constant of Gibbs Measures
Abstract
We establish formulae for the derivative of the Poincar\'e constant of Gibbs measures on both compact domains and all of d. As an application, we show that if the (not necessarily convex) Hamiltonian is an increasing function, then the Poincar\'e constant is strictly decreasing in the inverse temperature, and vice versa. Applying this result to the O(2) model allows us to give a sharpened upper bound on its Poincar\'e constant. We further show that this model exhibits a qualitatively different zero-temperature behavior of the Poincar\'e and Log-Sobolev constants.
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