Refining asymptotic complexity bounds for nonconvex optimization methods, including why steepest descent is o(ε-2) rather than O(ε-2)

Abstract

We revisit the standard ``telescoping sum'' argument ubiquitous in the final steps of analyzing evaluation complexity of algorithms for smooth nonconvex optimization, and obtain a refined formulation of the resulting bound as a function of the requested accuracy ε. While bounds obtained using the standard argument typically are of the form O(ε-α) for some positive α, the refined results are of the form o(ε-α). We then explore to which known algorithms our refined bounds are applicable and finally describe an example showing how close the standard and refined bounds can be.