TY - JOUR
T1 - Sliceable groups and towers of fields
AU - Böge, Sigrid
AU - Jarden, Moshe
AU - Lubotzky, Alexander
N1 - Publisher Copyright:
© 2016 by De Gruyter.
PY - 2016/5/1
Y1 - 2016/5/1
N2 - Let l be a prime number, K a finite extension of ℚl, and D a finite-dimensional central division algebra over K.We prove that the profinite group G D D×/K× is finitely sliceable, i.e. G has finitely many closed subgroups H1,⋯, Hn of infinite index such that G = ∪ni=1 HGi. Here, HGi = {hg | h ∈ Hi, g ∈ G}. On the other hand, we prove for l ≠ 2 that no open subgroup of GL2(ℤl) is finitely sliceable and we give an arithmetic interpretation to this result, based on the possibility of realizing GL2(ℤl) as a Galois group over ℚ. Nevertheless, we prove that G = GL2(ℤl) has an infinite slicing, that is G = ∪∞i=1 HGi, where each Hi is a closed subgroup of G of infinite index and Hi ∩ Hj has infinite index in both Hi and Hj if i ≠ j.
AB - Let l be a prime number, K a finite extension of ℚl, and D a finite-dimensional central division algebra over K.We prove that the profinite group G D D×/K× is finitely sliceable, i.e. G has finitely many closed subgroups H1,⋯, Hn of infinite index such that G = ∪ni=1 HGi. Here, HGi = {hg | h ∈ Hi, g ∈ G}. On the other hand, we prove for l ≠ 2 that no open subgroup of GL2(ℤl) is finitely sliceable and we give an arithmetic interpretation to this result, based on the possibility of realizing GL2(ℤl) as a Galois group over ℚ. Nevertheless, we prove that G = GL2(ℤl) has an infinite slicing, that is G = ∪∞i=1 HGi, where each Hi is a closed subgroup of G of infinite index and Hi ∩ Hj has infinite index in both Hi and Hj if i ≠ j.
UR - http://www.scopus.com/inward/record.url?scp=84969543429&partnerID=8YFLogxK
U2 - 10.1515/jgth-2016-0509
DO - 10.1515/jgth-2016-0509
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AN - SCOPUS:84969543429
SN - 1433-5883
VL - 19
SP - 365
EP - 390
JO - Journal of Group Theory
JF - Journal of Group Theory
IS - 3
ER -