On a Nielsen–Thurston classification theory for cluster modular groups

Abstract: Les Annales de l'institut Fourier sont membres du Centre Mersenne pour l'édition scienti que ouverte www.centre-mersenne.org Tsukasa I On a Nielsen-Thurston classi cation theory for cluster modular groups Tome , n o (), p.- .

“…Next let us turn our attention to the problem finding a good generators of cluster modular groups. As a candidate for an appropriate class of generators, the cluster Dehn twists has been introduced in the author's previous work [15]. He proved that the cluster Dehn twists have a similar dynamical behavior to that of Dehn twists in mapping class groups.…”

Presentations of Cluster Modular Groups and Generation by Cluster Dehn Twists

“…Next let us turn our attention to the problem finding a good generators of cluster modular groups. As a candidate for an appropriate class of generators, the cluster Dehn twists has been introduced in the author's previous work [15]. He proved that the cluster Dehn twists have a similar dynamical behavior to that of Dehn twists in mapping class groups.…”

Presentations of Cluster Modular Groups and Generation by Cluster Dehn Twists

“…Based on this correspondence, the first author gave an analogue of the Nielsen-Thurston classification for a general cluster modular group in [23], which classifies the mutation loops into three types: periodic, cluster-reducible and cluster-pseudo-Anosov. However there exists a slight discrepancy between pseudo-Anosov and cluster-pseudo-Anosov even for a mutation loop given by a mapping class: a pseudo-Anosov mapping class provides a cluster-pseudo-Anosov mutation loop, but the converse is not true.…”

Algebraic entropy of sign-stable mutation loops

“…If χ(T n,w ) = 0 then the cluster modular group of a type T n,w cluster algebra is exactly Γ Tn,w . Let (12) i odd = {i j |3 ≤ j ≤ n i , j odd} and i even = {i j |3 ≤ j ≤ n i , j even}.…”

Cluster Modular Groups of Affine and Doubly Extended Cluster Algebras