The Randomized Block Coordinate Descent Method in the H\"older Smooth Setting

Abstract

This work provides the first convergence analysis for the Randomized Block Coordinate Descent method for minimizing a function that is both H\"older smooth and block H\"older smooth. Our analysis applies to objective functions that are non-convex, convex, and strongly convex. For non-convex functions, we show that the expected gradient norm reduces at an O(kγ1+γ) rate, where k is the iteration count and γ is the H\"older exponent. For convex functions, we show that the expected suboptimality gap reduces at the rate O(k-γ). In the strongly convex setting, we show this rate for the expected suboptimality gap improves to O(k-2γ1-γ) when γ>1 and to a linear rate when γ=1. Notably, these new convergence rates coincide with those furnished in the existing literature for the Lipschitz smooth setting.