Local and Global Uniform Convexity Conditions
This work aims to correct an imbalance by more thoroughly exploiting strong or uniform convexity properties of feasible sets, which have a significant impact on complexity results in optimization and learning theory.
This paper reviews characterizations of uniform convexity and smoothness on norm balls in finite-dimensional spaces, connecting them to scaling inequalities used in optimization analysis. It establishes local versions of these conditions to provide sharper insights into complexity results in learning theory and optimization.
We review various characterizations of uniform convexity and smoothness on norm balls in finite-dimensional spaces and connect results stemming from the geometry of Banach spaces with \textit{scaling inequalities} used in analysing the convergence of optimization methods. In particular, we establish local versions of these conditions to provide sharper insights on a recent body of complexity results in learning theory, online learning, or offline optimization, which rely on the strong convexity of the feasible set. While they have a significant impact on complexity, these strong convexity or uniform convexity properties of feasible sets are not exploited as thoroughly as their functional counterparts, and this work is an effort to correct this imbalance. We conclude with some practical examples in optimization and machine learning where leveraging these conditions and localized assumptions lead to new complexity results.