Tensor Methods for Finding Approximate Stationary Points of Convex Functions

Abstract

In this paper we consider the problem of finding ε-approximate stationary points of convex functions that are p-times differentiable with -H\"older continuous pth derivatives. We present tensor methods with and without acceleration. Specifically, we show that the non-accelerated schemes take at most O(ε-1/(p+-1)) iterations to reduce the norm of the gradient of the objective below a given ε∈ (0,1). For accelerated tensor schemes we establish improved complexity bounds of O(ε-(p+)/[(p+-1)(p++1)]) and O(|(ε)|ε-1/(p+)), when the H\"older parameter ∈ [0,1] is known. For the case in which is unknown, we obtain a bound of O(ε-(p+1)/[(p+-1)(p+2)]) for a universal accelerated scheme. Finally, we also obtain a lower complexity bound of O(ε-2/[3(p+)-2]) for finding ε-approximate stationary points using p-order tensor methods.