An explicit algorithm for normal forms in small overlap monoids
Abstract
We describe a practical algorithm for computing normal forms for semigroups and monoids with finite presentations satisfying so-called small overlap conditions. Small overlap conditions are natural conditions on the relations in a presentation, which were introduced by J. H. Remmers and subsequently studied extensively by M. Kambites. Presentations satisfying these conditions are ubiquitous; Kambites showed that a randomly chosen finite presentation satisfies the C(4) condition with probability tending to 1 as the sum of the lengths of relation words tends to infinity. Kambites also showed that several key problems for finitely presented semigroups and monoids are tractable in C(4) monoids: the word problem is solvable in O(min{|u|, |v|}) time in the size of the input words u and v; the uniform word problem for ⟨A|R⟩ is solvable in O(N2 min {|u|, |v|}) where N is the sum of the lengths of the words in R; and a normal form for any given word u can be found in O(|u|) time. Although Kambites' algorithm for solving the word problem in C(4) monoids is highly practical, it appears that the coefficients in the linear time algorithm for computing normal forms are too large in practice. In this paper, we present an algorithm for computing normal forms in C(4) monoids that has time complexity O(|u|2) for input word u, but where the coefficients are sufficiently small to allow for practical computation. Additionally, we show that the uniform word problem for small overlap monoids can be solved in O(N min{|u|, |v|}) time.
Citation
Mitchell , J D & Tsalakou , M 2023 , ' An explicit algorithm for normal forms in small overlap monoids ' , Journal of Algebra , vol. 630 , pp. 394-433 . https://doi.org/10.1016/j.jalgebra.2023.04.019
Publication
Journal of Algebra
Status
Peer reviewed
ISSN
0021-8693Type
Journal article
Description
Funding: MT would like to thank the School of Mathematics and Statistics of the University of St Andrews and the Cyprus State Scholarship Foundation for their financial support.Collections
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