Convex optimization with p-norm oracles

Abstract

In recent years, there have been significant advances in efficiently solving s-regression using linear system solvers and 2-regression [Adil-Kyng-Peng-Sachdeva, J. ACM'24]. Would efficient smoothed p-norm solvers lead to even faster rates for solving s-regression when 2 ≤ p < s? In this paper, we give an affirmative answer to this question and show how to solve s-regression using O(n1+) iterations of solving smoothed p regression problems, where := 1p - 1s. To obtain this result, we provide improved accelerated rates for convex optimization problems when given access to an ps(λ)-proximal oracle, which, for a point c, returns the solution of the regularized problem x f(x) + λ ||x-c||ps. Additionally, we show that these rates for the ps(λ)-proximal oracle are optimal for algorithms that query in the span of the outputs of the oracle, and we further apply our techniques to settings of high-order and quasi-self-concordant optimization.

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