English

Estimation of Entropy in Constant Space with Improved Sample Complexity

Data Structures and Algorithms 2022-05-23 v1 Information Theory Machine Learning math.IT

Abstract

Recent work of Acharya et al. (NeurIPS 2019) showed how to estimate the entropy of a distribution D\mathcal D over an alphabet of size kk up to ±ϵ\pm\epsilon additive error by streaming over (k/ϵ3)polylog(1/ϵ)(k/\epsilon^3) \cdot \text{polylog}(1/\epsilon) i.i.d. samples and using only O(1)O(1) words of memory. In this work, we give a new constant memory scheme that reduces the sample complexity to (k/ϵ2)polylog(1/ϵ)(k/\epsilon^2)\cdot \text{polylog}(1/\epsilon). We conjecture that this is optimal up to polylog(1/ϵ)\text{polylog}(1/\epsilon) factors.

Keywords

Cite

@article{arxiv.2205.09804,
  title  = {Estimation of Entropy in Constant Space with Improved Sample Complexity},
  author = {Maryam Aliakbarpour and Andrew McGregor and Jelani Nelson and Erik Waingarten},
  journal= {arXiv preprint arXiv:2205.09804},
  year   = {2022}
}
R2 v1 2026-06-24T11:22:47.302Z