Rigidity for the logarithmic Sobolev inequality on complete metric measure spaces

Abstract

In this work, we study the rigidity problem for the logarithmic Sobolev inequality on a complete metric measure space (Mn,g,f) with Bakry-\'Emery Ricci curvature satisfying Ricf≥ a2g, for some a>0. We prove that if equality holds then M is isometric to × R for some complete (n-1)-dimensional Riemannian manifold and by passing an isometry, (Mn,g,f) must split off the Gaussian shrinking soliton (R, dt2, a2|.|2). This was proved in 2019 by Ohta and Takatsu. In this paper, we prove this rigidity result using a different method.