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Direct loss minimization algorithms for sparse Gaussian processes

Machine Learning 2020-10-29 v3 Machine Learning

Abstract

The paper provides a thorough investigation of Direct loss minimization (DLM), which optimizes the posterior to minimize predictive loss, in sparse Gaussian processes. For the conjugate case, we consider DLM for log-loss and DLM for square loss showing a significant performance improvement in both cases. The application of DLM in non-conjugate cases is more complex because the logarithm of expectation in the log-loss DLM objective is often intractable and simple sampling leads to biased estimates of gradients. The paper makes two technical contributions to address this. First, a new method using product sampling is proposed, which gives unbiased estimates of gradients (uPS) for the objective function. Second, a theoretical analysis of biased Monte Carlo estimates (bMC) shows that stochastic gradient descent converges despite the biased gradients. Experiments demonstrate empirical success of DLM. A comparison of the sampling methods shows that, while uPS is potentially more sample-efficient, bMC provides a better tradeoff in terms of convergence time and computational efficiency.

Keywords

Cite

@article{arxiv.2004.03083,
  title  = {Direct loss minimization algorithms for sparse Gaussian processes},
  author = {Yadi Wei and Rishit Sheth and Roni Khardon},
  journal= {arXiv preprint arXiv:2004.03083},
  year   = {2020}
}

Comments

31 pages, 16 figures

R2 v1 2026-06-23T14:42:05.517Z