The ballistic limit of the log-Sobolev constant equals the Polyak-ojasiewicz constant
Abstract
The Polyak-Lojasiewicz (PL) constant of a function f Rd R characterizes the best exponential rate of convergence of gradient flow for f, uniformly over initializations. Meanwhile, in the theory of Markov diffusions, the log-Sobolev (LS) constant plays an analogous role, governing the exponential rate of convergence for the Langevin dynamics from arbitrary initialization in the Kullback-Leibler divergence. We establish a new connection between optimization and sampling by showing that the low temperature limit t 0+ t-1 CLS(μt) of the LS constant of μt (-f/t) is exactly the PL constant of f, under mild assumptions. In contrast, we show that the corresponding limit for the Poincar\'e constant is the inverse of the smallest eigenvalue of ∇2 f at the minimizer.
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