Gradient Testing and Estimation by Comparisons

Abstract

We study gradient testing and gradient estimation of smooth functions using only a comparison oracle that, given two points, indicates which one has the larger function value. For any smooth f Rn R, x∈ Rn, and >0, we design a gradient testing algorithm that determines whether the normalized gradient ∇ f(x)/\|∇ f(x)\| is -close or 2-far from a given unit vector v using O(1) queries, as well as a gradient estimation algorithm that outputs an -estimate of ∇ f(x)/\|∇ f(x)\| using O(n(1/)) queries which we prove to be optimal. Furthermore, we study gradient estimation in the quantum comparison oracle model where queries can be made in superpositions, and develop a quantum algorithm using O( (n/)) queries.