H\"older Gradient Descent and Adaptive Regularization Methods in Banach Spaces for First-Order Points

Abstract

This paper considers optimization of smooth nonconvex functionals in smooth infinite dimensional spaces. A H\"older gradient descent algorithm is first proposed for finding approximate first-order points of regularized polynomial functionals. This method is then applied to analyze the evaluation complexity of an adaptive regularization method which searches for approximate first-order points of functionals with β-H\"older continuous derivatives. It is shown that finding an ε-approximate first-order point requires at most O(ε-p+βp+β-1) evaluations of the functional and its first p derivatives.