A Scale Free Algorithm for Stochastic Bandits with Bounded Kurtosis

NeurIPS 2017 pp. 1584-1593

/neurips/2017/lattimore2017neurips-scale/

Abstract

Existing strategies for finite-armed stochastic bandits mostly depend on a parameter of scale that must be known in advance. Sometimes this is in the form of a bound on the payoffs, or the knowledge of a variance or subgaussian parameter. The notable exceptions are the analysis of Gaussian bandits with unknown mean and variance by Cowan and Katehakis [2015a] and of uniform distributions with unknown support [Cowan and Katehakis, 2015b]. The results derived in these specialised cases are generalised here to the non-parametric setup, where the learner knows only a bound on the kurtosis of the noise, which is a scale free measure of the extremity of outliers.

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Text

Lattimore. "A Scale Free Algorithm for Stochastic Bandits with Bounded Kurtosis." Neural Information Processing Systems, 2017.

Markdown

[Lattimore. "A Scale Free Algorithm for Stochastic Bandits with Bounded Kurtosis." Neural Information Processing Systems, 2017.](https://mlanthology.org/neurips/2017/lattimore2017neurips-scale/)

BibTeX

@inproceedings{lattimore2017neurips-scale,
  title     = {{A Scale Free Algorithm for Stochastic Bandits with Bounded Kurtosis}},
  author    = {Lattimore, Tor},
  booktitle = {Neural Information Processing Systems},
  year      = {2017},
  pages     = {1584-1593},
  url       = {https://mlanthology.org/neurips/2017/lattimore2017neurips-scale/}
}