English

Multi-Symbol Forbidden Configurations

Combinatorics 2019-12-23 v2

Abstract

An rr-matrix is a matrix with symbols in {0,1,,r1}\{0,1,\dots,r-1\}. A matrix is simple if it has no repeated columns. Let the support of a matrix FF, supp(F)\text{supp}(F) be the largest simple matrix such that every column in supp(F)\text{supp}(F) is in FF. For a family of rr-matrices F\mathcal{F}, we define forb(m,r,F)\text{forb}(m,r,\mathcal{F}) as the maximum number of columns of an mm-rowed, rr-matrix AA such that FF is not a row-column permutation of AA for all FFF \in \mathcal{F}. While many results exist for r=2r=2, there are fewer for larger numbers of symbols. We expand on the field of forbidding matrices with rr-symbols, introducing a new construction for lower bounds of the growth of forb(m,r,F)\text{forb}(m,r,\mathcal{F}) (with respect to mm) that is applicable to matrices that are either not simple or have a constant row. We also introduce a new upper bound restriction that helps with avoiding non-simple matrices, limited either by the asymptotic bounds of the support, or the size of the forbidden matrix, whichever is larger. Continuing the trend of upper bounds, we represent a well-known technique of standard induction as a graph, and use graph theory methods to obtain asymptotic upper bounds. With these techniques we solve multiple, previously unknown, asymptotic bounds for a variety of matrices. Finally, we end with block matrices, or matrices with only constant row, and give bounds for all possible cases.

Keywords

Cite

@article{arxiv.1708.05623,
  title  = {Multi-Symbol Forbidden Configurations},
  author = {Keaton Ellis and Baian Liu and Attila Sali},
  journal= {arXiv preprint arXiv:1708.05623},
  year   = {2019}
}
R2 v1 2026-06-22T21:18:00.409Z