Pattern Forcing (0,1)-Matrices
Abstract
We introduce two related notions of pattern enforcement in -matrices: -forcing and strongly -forcing, which formalize distinct ways a fixed pattern must appear within a larger matrix. A matrix is -forcing if every submatrix can realize after turning any number of -entries into -entries, and strongly -forcing if every -entry belongs to a copy of . For -forcing matrices, we establish the existence and uniqueness of extremal constructions minimizing the number of -entries, characterize them using Young diagrams and corner functions, and derive explicit formulas and monotonicity results. For strongly -forcing matrices, we show that the minimum possible number of -entries of an strongly -forcing matrix is always , determine the maximum possible number of -entries of an strongly -forcing matrix for every and permutation matrix, and identify symmetry classes with identical extremal behavior. We further propose a conjectural formula for the maximum possible number of -entries of an strongly -forcing matrix, supported by results for . These findings reveal contrasting extremal structures between forcing and strongly forcing, extending the combinatorial understanding of pattern embedding in -matrices.
Cite
@article{arxiv.2510.27076,
title = {Pattern Forcing (0,1)-Matrices},
author = {Lei Cao and Shen-Fu Tsai},
journal= {arXiv preprint arXiv:2510.27076},
year = {2025}
}