An optimally fast objective-function-free minimization algorithm using random subspaces

Abstract

An algorithm for unconstrained non-convex optimization is described, which does not evaluate the objective function and in which minimization is carried out, at each iteration, within a randomly selected subspace. It is shown that this random approximation technique does not affect the method's convergence nor its evaluation complexity for the search of an ε-approximate first-order critical point, which is O(ε-(p+1)/p), where p is the order of derivatives used. A variant of the algorithm using approximate Hessian matrices is also analysed and shown to require at most O(ε-2) evaluations. Preliminary numerical tests show that the random-subspace technique can significantly improve performance when used with p=2 in the correct context, making it very competitive when compared to standard first-order algorithms.

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