On Inexact Solution of Auxiliary Problems in Tensor Methods for Convex Optimization

Abstract

In this paper we study the auxiliary problems that appear in p-order tensor methods for unconstrained minimization of convex functions with -H\"older continuous pth derivatives. This type of auxiliary problems corresponds to the minimization of a (p+)-order regularization of the pth order Taylor approximation of the objective. For the case p=3, we consider the use of Gradient Methods with Bregman distance. When the regularization parameter is sufficiently large, we prove that the referred methods take at most O((ε-1)) iterations to find either a suitable approximate stationary point of the tensor model or an ε-approximate stationary point of the original objective function.