Finding Stationary Points by Comparisons

Abstract

We study the problem of finding stationary points of non-convex functions when access to the objective is provided only through a comparison oracle that, given two points, outputs which has the larger function value. For a twice differentiable f Rn R with Lipschitz gradient and Hessian, we develop an algorithm that visits an ε-stationary point using O(n2/ε1.5) queries. Our approach uses a subroutine that estimates the normalized Hessian to accuracy δ using O(n2(1/δ)) queries. We further study this problem with a quantum comparison oracle model where queries can be made in superpositions, and develop the first quantum algorithm that finds an ε-stationary point, which takes O(n/ε1.5) queries.