Rao-Blackwellized Score Matching on Manifolds

Abstract

We study denoising score matching (DSM) when the latent distribution is supported on a smooth embedded manifold M ⊂ RD. Under ambient Gaussian corruption, the tangent denoising target contains a singular normal-fiber noise channel whose variance diverges as d/σ2 as σ 0+. We show that conditioning on the nearest-point projection π(X) canonically removes this singularity: the resulting conditional expectation is the unique L2-optimal Rao-Blackwellized predictor of the tangent DSM target among all estimators depending only on the projected observation π(X). We then compute the small-noise expansion of this canonical target and show that it equals the intrinsic Riemannian score up to an explicit order-σ2 correction that decomposes into an intrinsic Tweedie term and an extrinsic curvature term involving the Weingarten and Ricci operators. In the flat case, the construction reduces exactly to ordinary lower-dimensional Gaussian DSM, while on Sd the extrinsic correction simplifies to the scalar factor (1-d/2)∇M q; this extrinsic σ2 correction cancels identically on S2, though the intrinsic Tweedie term remains.