Improved Stochastic Trace Estimation Using Mutually Unbiased Bases

Jack K. Fitzsimons, Michael A. Osborne, Stephen J. Roberts, Joseph Francis Fitzsimons

UAI 2018 pp. 310-318

/uai/2018/fitzsimons2018uai-improved/

Abstract

We examine the problem of estimating the trace of a matrix $A$ when given access to an oracle which computes $x^\dagger A x$ for an input vector $x$. We make use of the basis vectors from a set of mutually unbiased bases, widely studied in the field of quantum information processing, in the selection of probing vectors $x$. This approach offers a new state of the art single shot sampling variance while requiring only $O(\log(n))$ random bits to generate each vector. This significantly improves on traditional methods such as Hutchinson's and Gaussian estimators in terms of the number of random bits required and worst case sample variance.

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Cite

Text

Fitzsimons et al. "Improved Stochastic Trace Estimation Using Mutually Unbiased Bases." Conference on Uncertainty in Artificial Intelligence, 2018.

Markdown

[Fitzsimons et al. "Improved Stochastic Trace Estimation Using Mutually Unbiased Bases." Conference on Uncertainty in Artificial Intelligence, 2018.](https://mlanthology.org/uai/2018/fitzsimons2018uai-improved/)

BibTeX

@inproceedings{fitzsimons2018uai-improved,
  title     = {{Improved Stochastic Trace Estimation Using Mutually Unbiased Bases}},
  author    = {Fitzsimons, Jack K. and Osborne, Michael A. and Roberts, Stephen J. and Fitzsimons, Joseph Francis},
  booktitle = {Conference on Uncertainty in Artificial Intelligence},
  year      = {2018},
  pages     = {310-318},
  url       = {https://mlanthology.org/uai/2018/fitzsimons2018uai-improved/}
}