中文

Subcube Stifling

计算复杂性 2026-07-06 v1

摘要

We introduce the subcube stifling number, a new combinatorial measure of total Boolean functions. This measure is the largest integer kk such that, for every set SS of at most kk input variables and every assignment b{0,1}Sb \in \{0,1\}^S, there is a fixing of the variables outside SS under which the resulting function on the free variables SS is the point indicator I[xS=b]\mathbb{I}[x_S=b]. Equivalently, for every small set of coordinates, the function can isolate any prescribed point of the corresponding Boolean cube by suitably fixing all remaining coordinates. This measure is inspired by the stifling number of Chattopadhyay et al.~(ITCS'23); whereas their measure asks for restrictions realizing every constant function, ours asks for restrictions realizing every point indicator. Our results are as follows. 1) We show that the subcube stifling number gives rise to an approximate-degree composition theorem. In particular, if a Boolean function ff has approximate degree O(μ(f))O(\sqrt{\mu(f)}), then for every Boolean function gg, approximate degree composes tightly. This motivates the study of the subcube stifling number, and in particular the search for functions whose approximate degree is O(μ(f))O(\sqrt{\mu(f)}). 2) We show that a random Boolean function on nn input bits has subcube stifling number Θ(log(n))\Theta(\log(n)) with high probability. 3) We show that indicators of linear codes over F2\mathbb{F}_2 whose minimum distance and dual distance are both linear have high subcube stifling number. 4) We prove that the functions arising from this linear-code construction do not have approximate degree O(μ(f))O(\sqrt{\mu(f)}); in fact, they have approximate degree Ω(μ(f))\Omega(\mu(f)). The main question left open is whether there exists a Boolean function ff with approximate degree Θ(μ(f))\Theta(\sqrt{\mu(f)}). A positive answer would yield new instances of tight approximate-degree composition.

引用

@article{arxiv.2607.04850,
  title  = {Subcube Stifling},
  author = {Arjan Cornelissen and Nikhil S. Mande and Nithish Raja},
  journal= {arXiv preprint arXiv:2607.04850},
  year   = {2026}
}