中文

Convergence and Loss Bounds for Bayesian Sequence Prediction

机器学习 2016-11-18 v1 人工智能 概率论

摘要

The probability of observing xtx_t at time tt, given past observations x1...xt1x_1...x_{t-1} can be computed with Bayes' rule if the true generating distribution μ\mu of the sequences x1x2x3...x_1x_2x_3... is known. If μ\mu is unknown, but known to belong to a class MM one can base ones prediction on the Bayes mix ξ\xi defined as a weighted sum of distributions νM\nu\in M. Various convergence results of the mixture posterior ξt\xi_t to the true posterior μt\mu_t are presented. In particular a new (elementary) derivation of the convergence ξt/μt1\xi_t/\mu_t\to 1 is provided, which additionally gives the rate of convergence. A general sequence predictor is allowed to choose an action yty_t based on x1...xt1x_1...x_{t-1} and receives loss xtyt\ell_{x_t y_t} if xtx_t is the next symbol of the sequence. No assumptions are made on the structure of \ell (apart from being bounded) and MM. The Bayes-optimal prediction scheme Λξ\Lambda_\xi based on mixture ξ\xi and the Bayes-optimal informed prediction scheme Λμ\Lambda_\mu are defined and the total loss LξL_\xi of Λξ\Lambda_\xi is bounded in terms of the total loss LμL_\mu of Λμ\Lambda_\mu. It is shown that LξL_\xi is bounded for bounded LμL_\mu and Lξ/Lμ1L_\xi/L_\mu\to 1 for LμL_\mu\to \infty. Convergence of the instantaneous losses are also proven.

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引用

@article{arxiv.cs/0301014,
  title  = {Convergence and Loss Bounds for Bayesian Sequence Prediction},
  author = {Marcus Hutter},
  journal= {arXiv preprint arXiv:cs/0301014},
  year   = {2016}
}

备注

8 twocolumn pages