English

Improved Lower Bounds for Monotone q-Multilinear Boolean Circuits

Computational Complexity 2023-05-15 v1

Abstract

A monotone Boolean circuit is composed of OR gates, AND gates and input gates corresponding to the input variables and the Boolean constants. It is qq-multilinear if for each its output gate oo and for each prime implicant ss of the function computed at oo, the arithmetic version of the circuit resulting from the replacement of OR and AND gates by addition and multiplication gates, respectively, computes a polynomial at oo which contains a monomial including the same variables as ss and each of the variables in ss has degree at most qq in the monomial. First, we study the complexity of computing semi-disjoint bilinear Boolean forms in terms of the size of monotone qq-multilinear Boolean circuits. In particular, we show that any monotone 11-multilinear Boolean circuit computing a semi-disjoint Boolean form with pp prime implicants includes at least pp AND gates. We also show that any monotone qq-multilinear Boolean circuit computing a semi-disjoint Boolean form with pp prime implicants has Ω(pq4)\Omega(\frac p {q^4}) size. Next, we study the complexity of the monotone Boolean function Isolk,nIsol_{k,n} that verifies if a kk-dimensional Boolean matrix has at least one 11 in each line (e.g., each row and column when k=2k=2), in terms of monotone qq-multilinear Boolean circuits. We show that that any Σ3\Sigma_3 monotone Boolean circuit for Isolk,nIsol_{k,n} has an exponential in nn size or it is not (k1)(k-1)-multilinear.

Keywords

Cite

@article{arxiv.2305.07364,
  title  = {Improved Lower Bounds for Monotone q-Multilinear Boolean Circuits},
  author = {Andrzej Lingas and Mia Persson},
  journal= {arXiv preprint arXiv:2305.07364},
  year   = {2023}
}

Comments

15 pages, preliminary version in proceedings of SOFSEM 2023

R2 v1 2026-06-28T10:32:48.216Z