English

Simplifying inclusion-exclusion formulas

Combinatorics 2014-04-18 v2

Abstract

Let F={F1,F2,,Fn}\mathcal{F}=\{F_1,F_2, \ldots,F_n\} be a family of nn sets on a ground set SS, such as a family of balls in Rd\mathbb{R}^d. For every finite measure μ\mu on SS, such that the sets of F\mathcal{F} are measurable, the classical inclusion-exclusion formula asserts that μ(F1F2Fn)=I:I[n](1)I+1μ(iIFi)\mu(F_1\cup F_2\cup\cdots\cup F_n)=\sum_{I:\emptyset\ne I\subseteq[n]} (-1)^{|I|+1}\mu\Bigl(\bigcap_{i\in I} F_i\Bigr); that is, the measure of the union is expressed using measures of various intersections. The number of terms in this formula is exponential in nn, and a significant amount of research, originating in applied areas, has been devoted to constructing simpler formulas for particular families F\mathcal{F}. We provide an upper bound valid for an arbitrary F\mathcal{F}: we show that every system F\mathcal{F} of nn sets with mm nonempty fields in the Venn diagram admits an inclusion-exclusion formula with mO(log2n)m^{O(\log^2n)} terms and with ±1\pm1 coefficients, and that such a formula can be computed in mO(log2n)m^{O(\log^2n)} expected time. For every ε>0\varepsilon>0 we also construct systems with Venn diagram of size mm for which every valid inclusion-exclusion formula has the sum of absolute values of the coefficients at least Ω(m2ε)\Omega(m^{2-\varepsilon}).

Keywords

Cite

@article{arxiv.1207.2591,
  title  = {Simplifying inclusion-exclusion formulas},
  author = {Xavier Goaoc and Jiří Matoušek and Pavel Paták and Zuzana Safernová and Martin Tancer},
  journal= {arXiv preprint arXiv:1207.2591},
  year   = {2014}
}

Comments

17 pages, 3 figures/tables; improved lower bound in v2

R2 v1 2026-06-21T21:33:51.869Z