Related papers: Variational Orthogonal Features

Variational Orthogonal Features

URL: http://arxiv.org/abs/2006.13170v1
Date: Tue, 23 Jun 2020 17:18:07 GMT
Title: Variational Orthogonal Features
Authors: David R. Burt, Carl Edward Rasmussen, Mark van der Wilk
Abstract summary: We show that for certain priors, features can be defined that remove the $mathcalO(M3)$ cost of computing a minibatch estimate of an evidence lower bound (ELBO) We present a construction of features for any stationary prior kernel that allow for computation of an unbiased estimator to the ELBO using $T$ Monte Carlo samples in $mathcalO(tildeNT+M2T)$ and in $mathcalO(tildeNT+MT)$ with an additional approximation.
Score: 29.636483122130027
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Sparse stochastic variational inference allows Gaussian process models to be applied to large datasets. The per iteration computational cost of inference with this method is $\mathcal{O}(\tilde{N}M^2+M^3),$ where $\tilde{N}$ is the number of points in a minibatch and $M$ is the number of `inducing features', which determine the expressiveness of the variational family. Several recent works have shown that for certain priors, features can be defined that remove the $\mathcal{O}(M^3)$ cost of computing a minibatch estimate of an evidence lower bound (ELBO). This represents a significant computational savings when $M\gg \tilde{N}$. We present a construction of features for any stationary prior kernel that allow for computation of an unbiased estimator to the ELBO using $T$ Monte Carlo samples in $\mathcal{O}(\tilde{N}T+M^2T)$ and in $\mathcal{O}(\tilde{N}T+MT)$ with an additional approximation. We analyze the impact of this additional approximation on inference quality.

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