Forward-backward splitting under the light of generalized convexity

Abstract

In this paper we present a unifying framework for continuous optimization methods grounded in the concept of generalized convexity. Utilizing the powerful theory of -convexity, we propose a conceptual algorithm that extends the classical difference-of-convex method, encompassing a broad spectrum of optimization algorithms. Relying exclusively on the tools of generalized convexity we develop a gap function analysis that strictly characterizes the decrease of the function values, leading to simplified and unified convergence results. As an outcome of this analysis, we naturally obtain a generalized PL inequality which ensures q-linear convergence rates of the proposed method, incorporating various well-established conditions from the existing literature. Moreover we propose a -Bregman proximal point interpretation of the scheme that allows us to capture conditions that lead to sublinear rates under convexity.

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