Add to ORKGInternational audienceIt has been conjectured that in a braid group, or more generally in a Garside group, applying any sequence of monotone equivalences and word reversings can increase the length of a word by at most a linear factor depending on the group presentation only. We give a counter-example to this conjecture, but, on the other hand, we establish length upper bounds for the case when only right reversing is involved. We also state a new conjecture which would, like the above one, imply that the space complexity of the handle reduction algorithm is linear
We prove the existence of an algorithm that solves the reducibility problem in braid groups and runs...
We prove that the word problem in the mapping class group of the once-punctured surface of genus g h...
Abstract We address the long-standing conjecture that all permutations have polynomially bounded wor...
International audienceIt has been conjectured that in a braid group, or more generally in a Garside ...
International audienceIt has been conjectured that in a braid group, or more generally in a Garside ...
First part: Word reversing is a rewriting operation associated to a presentation (of a semigroup, he...
First part: Word reversing is a rewriting operation associated to a presentation (of a semigroup, he...
First part: Word reversing is a rewriting operation associated to a presentation (of a semigroup, he...
AbstractWord reversing is a combinatorial operation on words that detects pairs of equivalent words ...
AbstractOne of the most interesting questions about a group is whether its word problem can be solve...
Garside-theoretical solutions to the conjugacy problem in braid groups depend on the determination o...
AbstractWe prove that the word problem in the mapping class group of the once-punctured surface of g...
. We exhibit a new quadratic time near-constant space algorithm for solving the word problem in the ...
Version 2: added section on Teichmueller geometry, removed section on train tracksInternational audi...
AbstractWe describe a new method for comparing braid words which relies both on the automatic struct...
We prove the existence of an algorithm that solves the reducibility problem in braid groups and runs...
We prove that the word problem in the mapping class group of the once-punctured surface of genus g h...
Abstract We address the long-standing conjecture that all permutations have polynomially bounded wor...
International audienceIt has been conjectured that in a braid group, or more generally in a Garside ...
International audienceIt has been conjectured that in a braid group, or more generally in a Garside ...
First part: Word reversing is a rewriting operation associated to a presentation (of a semigroup, he...
First part: Word reversing is a rewriting operation associated to a presentation (of a semigroup, he...
First part: Word reversing is a rewriting operation associated to a presentation (of a semigroup, he...
AbstractWord reversing is a combinatorial operation on words that detects pairs of equivalent words ...
AbstractOne of the most interesting questions about a group is whether its word problem can be solve...
Garside-theoretical solutions to the conjugacy problem in braid groups depend on the determination o...
AbstractWe prove that the word problem in the mapping class group of the once-punctured surface of g...
. We exhibit a new quadratic time near-constant space algorithm for solving the word problem in the ...
Version 2: added section on Teichmueller geometry, removed section on train tracksInternational audi...
AbstractWe describe a new method for comparing braid words which relies both on the automatic struct...
We prove the existence of an algorithm that solves the reducibility problem in braid groups and runs...
We prove that the word problem in the mapping class group of the once-punctured surface of genus g h...
Abstract We address the long-standing conjecture that all permutations have polynomially bounded wor...