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Strong Asymptotic Assertions for Discrete MDL in Regression and Classification

Statistics Theory 2007-07-16 v1 Artificial Intelligence Information Theory Machine Learning math.IT Probability Statistics Theory

Abstract

We study the properties of the MDL (or maximum penalized complexity) estimator for Regression and Classification, where the underlying model class is countable. We show in particular a finite bound on the Hellinger losses under the only assumption that there is a "true" model contained in the class. This implies almost sure convergence of the predictive distribution to the true one at a fast rate. It corresponds to Solomonoff's central theorem of universal induction, however with a bound that is exponentially larger.

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Cite

@article{arxiv.math/0502315,
  title  = {Strong Asymptotic Assertions for Discrete MDL in Regression and Classification},
  author = {Jan Poland and Marcus Hutter},
  journal= {arXiv preprint arXiv:math/0502315},
  year   = {2007}
}

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6 two-column pages