English

On Approximating Total Variation Distance

Data Structures and Algorithms 2023-08-21 v2 Computational Complexity Discrete Mathematics

Abstract

Total variation distance (TV distance) is a fundamental notion of distance between probability distributions. In this work, we introduce and study the problem of computing the TV distance of two product distributions over the domain {0,1}n\{0,1\}^n. In particular, we establish the following results. 1. The problem of exactly computing the TV distance of two product distributions is #P\#\mathsf{P}-complete. This is in stark contrast with other distance measures such as KL, Chi-square, and Hellinger which tensorize over the marginals leading to efficient algorithms. 2. There is a fully polynomial-time deterministic approximation scheme (FPTAS) for computing the TV distance of two product distributions PP and QQ where QQ is the uniform distribution. This result is extended to the case where QQ has a constant number of distinct marginals. In contrast, we show that when PP and QQ are Bayes net distributions, the relative approximation of their TV distance is NP\mathsf{NP}-hard.

Keywords

Cite

@article{arxiv.2206.07209,
  title  = {On Approximating Total Variation Distance},
  author = {Arnab Bhattacharyya and Sutanu Gayen and Kuldeep S. Meel and Dimitrios Myrisiotis and A. Pavan and N. V. Vinodchandran},
  journal= {arXiv preprint arXiv:2206.07209},
  year   = {2023}
}

Comments

20 pages, 1 figure

R2 v1 2026-06-24T11:51:37.600Z