English

Geometry and algorithms for upper triangular tropical matrix identities

Combinatorics 2018-08-14 v2 Group Theory

Abstract

We provide geometric methods and algorithms to verify, construct and enumerate pairs of words (of specified length over a fixed mm-letter alphabet) that form identities in the semigroup \utn\ut{n} of n×nn\times n upper triangular tropical matrices. In the case n=2n=2 these identities are precisely those satisfied by the bicyclic monoid, whilst in the case n=3n=3 they form a subset of the identities which hold in the plactic monoid of rank 33. To each word we associate a signature sequence of lattice polytopes, and show that two words form an identity for \utn\ut{n} if and only if their signatures are equal. Our algorithms are thus based on polyhedral computations and achieve optimal complexity in some cases. For n=m=2n=m=2 we prove a Structural Theorem, which allows us to quickly enumerate the pairs of words of fixed length which form identities for \ut2\ut{2}. This allows us to recover a short proof of Adjan's theorem on minimal length identities for the bicyclic monoid, and to construct minimal length identities for \ut3\ut{3}, providing counterexamples to a conjecture of Izhakian in this case. We conclude with six conjectures at the intersection of semigroup theory, probability and combinatorics, obtained through analysing the outputs of our algorithms.

Keywords

Cite

@article{arxiv.1806.01835,
  title  = {Geometry and algorithms for upper triangular tropical matrix identities},
  author = {Marianne Johnson and Ngoc Mai Tran},
  journal= {arXiv preprint arXiv:1806.01835},
  year   = {2018}
}

Comments

35 pages, 12 figures, fixed small typos, added counter examples and strengthened some conjectures

R2 v1 2026-06-23T02:20:06.082Z