Profinite extensions of centralizers and the profinite completion of limit groups PA Zalesskiĭ, TAD Zapata Revista Matemática Iberoamericana 36 (1), 61-78, 2019 | 8 | 2019 |
Profinite groups in which centralizers are abelian P Shumyatsky, P Zalesskii, T Zapata Israel Journal of Mathematics 230, 831-854, 2019 | 6 | 2019 |
Splitting theorems for pro-p groups acting on pro-p trees W Herfort, P Zalesskii, T Zapata Selecta Mathematica 22 (3), 1245-1268, 2016 | 4 | 2016 |
Splitting theorems for pro- groups acting on pro- trees and 2-generated subgroups of free pro- products with procyclic amalgamations W Herfort, P Zalesskii, T Zapata arXiv preprint arXiv:1103.2955, 2011 | 3 | 2011 |
MR3518550 Reviewed W Herfort, P Zalesskii, T Zapata Selecta Math.(NS) 22 (3), 1245-1268, 2016 | | 2016 |
SPLITTING THEOREMS FOR PRO-p GROUPS ACTING ON PRO-p TREES AND 2-GENERATED PRO-p SUBGROUPS OF FREE PRO-p PRODUCTS WITH PROCYCLIC AMALGAMATIONS W HERFORT, P ZALESSKII, T ZAPATA | | 2013 |
Grupos pro-finitos limites TAD Zapata | | 2012 |
Formas automórficas e as L-funções de Hecke-Maass e Rankin Selberg TAD Zapata | | 2006 |
Dëmushkin Groups TAD Zapata Boas vindas, 11, 0 | | |