A Strongly Quasiconvex PAC-Bayesian Bound

August 19, 2016 ยท Declared Dead ยท ๐Ÿ› International Conference on Algorithmic Learning Theory

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Authors Niklas Thiemann, Christian Igel, Olivier Wintenberger, Yevgeny Seldin arXiv ID 1608.05610 Category cs.LG: Machine Learning Cross-listed stat.ML Citations 91 Venue International Conference on Algorithmic Learning Theory Last Checked 4 months ago
Abstract
We propose a new PAC-Bayesian bound and a way of constructing a hypothesis space, so that the bound is convex in the posterior distribution and also convex in a trade-off parameter between empirical performance of the posterior distribution and its complexity. The complexity is measured by the Kullback-Leibler divergence to a prior. We derive an alternating procedure for minimizing the bound. We show that the bound can be rewritten as a one-dimensional function of the trade-off parameter and provide sufficient conditions under which the function has a single global minimum. When the conditions are satisfied the alternating minimization is guaranteed to converge to the global minimum of the bound. We provide experimental results demonstrating that rigorous minimization of the bound is competitive with cross-validation in tuning the trade-off between complexity and empirical performance. In all our experiments the trade-off turned to be quasiconvex even when the sufficient conditions were violated.
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