Asymptotic Convergence Analysis of High-Order Proximal-Point Methods Beyond Sublinear Rates

Abstract: This paper investigates the asymptotic convergence behavior of high-order proximal-point algorithms (HiPPA) toward global minimizers, extending the analysis beyond sublinear convergence rate results. Specifically, we consider the proximal operator of a lower semicontinuous function augmented with a $p$th-order regularization for $p>1$, and establish the convergence of HiPPA to a global minimizer with a particular focus on its convergence rate. To this end, we focus on minimizing the class of uniformly quasiconvex functions, including strongly convex, uniformly convex, and strongly quasiconvex functions as special cases. Our analysis reveals the following convergence behaviors of HiPPA when the uniform quasiconvexity modulus admits a power function of degree $q$ as a lower bound on an interval $\mathcal{I}$: (i) for $q\in (1,2]$ and $\mathcal{I}=[0,1)$, HiPPA exhibits local linear rate for $p\in (1,2)$; (ii) for $q=2$ and $\mathcal{I}=[0,\infty)$, HiPPA converges linearly for $p=2$; (iii) for $p=q>2$ and $\mathcal{I}=[0,\infty)$, HiPPA converges linearly; (iv) for $q\geq 2$ and $\mathcal{I}=[0,\infty)$, HiPPA achieves superlinear rate for $p>q$. Notably, to our knowledge, some of these results are novel, even in the context of strongly or uniformly convex functions, offering new insights into optimizing generalized convex problems.