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arxiv: 2410.08125 · v1 · pith:I66RJ3LOnew · submitted 2024-10-10 · 💻 cs.LG · stat.ML

Generalizing Stochastic Smoothing for Differentiation and Gradient Estimation

classification 💻 cs.LG stat.ML
keywords differentiableestimationgradientsmoothingstochasticnon-differentiabledensityfull
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We deal with the problem of gradient estimation for stochastic differentiable relaxations of algorithms, operators, simulators, and other non-differentiable functions. Stochastic smoothing conventionally perturbs the input of a non-differentiable function with a differentiable density distribution with full support, smoothing it and enabling gradient estimation. Our theory starts at first principles to derive stochastic smoothing with reduced assumptions, without requiring a differentiable density nor full support, and we present a general framework for relaxation and gradient estimation of non-differentiable black-box functions $f:\mathbb{R}^n\to\mathbb{R}^m$. We develop variance reduction for gradient estimation from 3 orthogonal perspectives. Empirically, we benchmark 6 distributions and up to 24 variance reduction strategies for differentiable sorting and ranking, differentiable shortest-paths on graphs, differentiable rendering for pose estimation, as well as differentiable cryo-ET simulations.

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