English

Small Shadow Partitions

Computational Complexity 2024-10-30 v1 Combinatorics

Abstract

We study the problem of partitioning the unit cube [0,1]n[0,1]^n into cc parts so that each dd-dimensional axis-parallel projection has small volume. This natural combinatorial/geometric question was first studied by Kopparty and Nagargoje [KN23] as a reformulation of the problem of determining the achievable parameters for seedless multimergers -- which extract randomness from `dd-where' random sources (generalizing somewhere random sources). This question is closely related to influences of variables and is about a partition analogue of Shearer's lemma. Our main result answers a question of [KN23]: for d=n1d = n-1, we show that for cc even as large as 2o(n)2^{o(n)}, it is possible to partition [0,1]n[0,1]^n into cc parts so that every n1n-1-dimensional axis-parallel projection has volume at most (1/c)(1+o(1))(1/c) ( 1 + o(1) ). Previously, this was shown by [KN23] for cc up to O(n)O(\sqrt{n}). The construction of our partition is related to influences of functions, and we present a clean geometric/combinatorial conjecture about this partitioning problem that would imply the KKL theorem on influences of Boolean functions.

Keywords

Cite

@article{arxiv.2410.22040,
  title  = {Small Shadow Partitions},
  author = {Swastik Kopparty and Harry Sha},
  journal= {arXiv preprint arXiv:2410.22040},
  year   = {2024}
}
R2 v1 2026-06-28T19:39:38.174Z