From the Boltzmann H-theorem to Perelman's W-entropy formula for the Ricci flow

Abstract

In 1870s, L. Boltzmann proved the famous H-theorem for the Boltzmann equation in the kinetic theory of gas and gave the statistical interpretation of the thermodynamic entropy. In 2002, G. Perelman introduced the notion of W-entropy and proved the W-entropy formula for the Ricci flow. This plays a crucial role in the proof of the no local collapsing theorem and in the final resolution of the Poincar\'e conjecture and Thurston's geometrization conjecture. In our previous paper Li11a, the author gave a probabilistic interpretation of the W-entropy using the Boltzmann-Shannon-Nash entropy. In this paper, we make some further efforts for a better understanding of the mysterious W-entropy by comparing the H-theorem for the Boltzmann equation and the Perelman W-entropy formula for the Ricci flow. We also suggest a way to construct the "density of states" measure for which the Boltzmann H-entropy is exactly the W-entropy for the Ricci flow.