Power Homotopy for Zeroth-Order Non-Convex Optimizations

Abstract

We introduce GS-PowerHP, a novel zeroth-order method for non-convex optimization problems of the form x ∈ Rd f(x). Our approach leverages two key components: a power-transformed Gaussian-smoothed surrogate FN,σ(μ) = Ex(μ,σ2 Id)[eN f(x)] whose stationary points cluster near the global maximizer x* of f for sufficiently large N, and an incrementally decaying σ for enhanced data efficiency. Under mild assumptions, we prove convergence in expectation to a small neighborhood of x* with the iteration complexity of O(d2 -2). Empirical results show our approach consistently ranks among the top three across a suite of competing algorithms. Its robustness is underscored by the final experiment on a substantially high-dimensional problem (d=150,528), where it achieved first place on least-likely targeted black-box attacks against images from ImageNet, surpassing all competing methods.

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