TY - GEN
T1 - A homotopical completion procedure with applications to coherence of monoids
AU - Guiraud, Yves
AU - Malbos, Philippe
AU - Mimram, Samuel
PY - 2013/1/1
Y1 - 2013/1/1
N2 - One of the most used algorithm in rewriting theory is the Knuth-Bendix completion procedure which starts from a terminating rewriting system and iteratively adds rules to it, trying to produce an equivalent convergent rewriting system. It is in particular used to study presentations of monoids, since normal forms of the rewriting system provide canonical representatives of words modulo the congruence generated by the rules. Here, we are interested in extending this procedure in order to retrieve information about the low-dimensional homotopy properties of a monoid. We therefore consider the notion of coherent presentation, which is a generalization of rewriting systems that keeps track of the cells generated by confluence diagrams. We extend the Knuth-Bendix completion procedure to this setting, resulting in a homotopical completion procedure. It is based on a generalization of Tietze transformations, which are operations that can be iteratively applied to relate any two presentations of the same monoid. We also explain how these transformations can be used to remove useless generators, rules, or confluence diagrams in a coherent presentation, thus leading to a homotopical reduction procedure. Finally, we apply these techniques to the study of some examples coming from representation theory, to compute minimal coherent presentations for them: braid, plactic and Chinese monoids.
AB - One of the most used algorithm in rewriting theory is the Knuth-Bendix completion procedure which starts from a terminating rewriting system and iteratively adds rules to it, trying to produce an equivalent convergent rewriting system. It is in particular used to study presentations of monoids, since normal forms of the rewriting system provide canonical representatives of words modulo the congruence generated by the rules. Here, we are interested in extending this procedure in order to retrieve information about the low-dimensional homotopy properties of a monoid. We therefore consider the notion of coherent presentation, which is a generalization of rewriting systems that keeps track of the cells generated by confluence diagrams. We extend the Knuth-Bendix completion procedure to this setting, resulting in a homotopical completion procedure. It is based on a generalization of Tietze transformations, which are operations that can be iteratively applied to relate any two presentations of the same monoid. We also explain how these transformations can be used to remove useless generators, rules, or confluence diagrams in a coherent presentation, thus leading to a homotopical reduction procedure. Finally, we apply these techniques to the study of some examples coming from representation theory, to compute minimal coherent presentations for them: braid, plactic and Chinese monoids.
KW - Coherence
KW - Higher-dimensional rewriting
KW - Knuth-bendix completion
KW - Low-dimensional homotopy for monoids
KW - Presentation of monoid
KW - Tietze transformation
UR - https://www.scopus.com/pages/publications/84889592531
U2 - 10.4230/LIPIcs.RTA.2013.223
DO - 10.4230/LIPIcs.RTA.2013.223
M3 - Conference contribution
AN - SCOPUS:84889592531
SN - 9783939897538
T3 - Leibniz International Proceedings in Informatics, LIPIcs
SP - 223
EP - 238
BT - 24th International Conference on Rewriting Techniques and Applications, RTA 2013
A2 - van Raamsdonk, Femke
PB - Schloss Dagstuhl- Leibniz-Zentrum fur Informatik GmbH, Dagstuhl Publishing
T2 - 24th International Conference on Rewriting Techniques and Applications, RTA 2013
Y2 - 24 June 2013 through 26 June 2013
ER -