TY - JOUR
T1 - The homology of the Higman–Thompson groups
AU - Szymik, Markus
AU - Wahl, Nathalie
PY - 2019/5
Y1 - 2019/5
N2 -
We prove that Thompson’s group V is acyclic, answering a 1992 question of Brown in the positive. More generally, we identify the homology of the Higman–Thompson groups V
n
,
r
with the homology of the zeroth component of the infinite loop space of the mod n- 1 Moore spectrum. As V = V
2 , 1
, we can deduce that this group is acyclic. Our proof involves establishing homological stability with respect to r, as well as a computation of the algebraic K-theory of the category of finitely generated free Cantor algebras of any type n.
AB -
We prove that Thompson’s group V is acyclic, answering a 1992 question of Brown in the positive. More generally, we identify the homology of the Higman–Thompson groups V
n
,
r
with the homology of the zeroth component of the infinite loop space of the mod n- 1 Moore spectrum. As V = V
2 , 1
, we can deduce that this group is acyclic. Our proof involves establishing homological stability with respect to r, as well as a computation of the algebraic K-theory of the category of finitely generated free Cantor algebras of any type n.
UR - http://www.scopus.com/inward/record.url?scp=85064341310&partnerID=8YFLogxK
U2 - 10.1007/s00222-018-00848-z
DO - 10.1007/s00222-018-00848-z
M3 - Journal article
AN - SCOPUS:85064341310
SN - 0020-9910
VL - 216
SP - 445
EP - 518
JO - Inventiones Mathematicae
JF - Inventiones Mathematicae
IS - 2
ER -