Tensor Methods for Minimizing Convex Functions with H\"older Continuous Higher-Order Derivatives

Abstract

In this paper we study p-order methods for unconstrained minimization of convex functions that are p-times differentiable (p≥ 2) with -H\"older continuous pth derivatives. We propose tensor schemes with and without acceleration. For the schemes without acceleration, we establish iteration complexity bounds of O(ε-1/(p+-1)) for reducing the functional residual below a given ε∈ (0,1). Assuming that is known, we obtain an improved complexity bound of O(ε-1/(p+)) for the corresponding accelerated scheme. For the case in which is unknown, we present a universal accelerated tensor scheme with iteration complexity of O(ε-p/[(p+1)(p+-1)]). A lower complexity bound of O(ε-2/[3(p+)-2]) is also obtained for this problem class.