中文

Conditioning Gaussian Processes on Almost Anything

机器学习 2026-05-21 v1 机器学习 统计方法学

摘要

Gaussian processes (GPs) offer a principled probabilistic model over functions, but exact inference is restricted to the linear-Gaussian regime. We establish an explicit equivalence between GPs and a class of linear diffusion models, recasting predictive sampling as an ODE with closed-form Gaussian dynamics and a likelihood-dependent guidance term that admits a simple Monte Carlo approximation. In the linear-Gaussian setting, we recover standard GP conditioning exactly; beyond conjugacy, the same machinery handles any conditioning statement admitting point-wise likelihood evaluation -- including non-linear physics, and, for the first time, natural language via large language models. Whitening isolates the irreducible non-Gaussian dynamics, minimising Wasserstein-2 transport cost and eliminating numerical stiffness. The result is a general-purpose GP inference scheme requiring no bespoke derivations. Together, these results provide a general mechanism for incorporating the full richness of real-world knowledge as conditioning information, opening a new frontier for the probabilistic modelling of real-world problems.

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引用

@article{arxiv.2605.21041,
  title  = {Conditioning Gaussian Processes on Almost Anything},
  author = {Henry Moss and Lachlan Astfalck and Thomas Cowperthwaite and Colin Doumont and Sam Willis and Philipp Hennig and Christopher Nemeth and Andrew Zammit-Mangion},
  journal= {arXiv preprint arXiv:2605.21041},
  year   = {2026}
}