Semblanza
Grupos Kleinianos Complejos que actuan en espacio proyectivos
Publicaciones
2019 - Barrera, W. and Cano, A. and Garc\'{\i}a, R. and Navarrete, J. P. (ver en línea)Chains homotopy in the complement of a knot in the sphere
{$S^3$}.
Bulletin of the Brazilian Mathematical Society. New Series.
Boletim da Sociedade Brasileira de Matem\'{a}tica, 971--9972017 - Cano, Angel and Liu, Bingyuan and L\'{o}pez, Marlon M. (ver en línea)The limit set for discrete complex hyperbolic groups.
Indiana University Mathematics Journal, 927--9482017 - Cano, Angel and Loeza, Luis (ver en línea)Two-dimensional {V}eronese groups with an invariant ball.
International Journal of Mathematics, 1750070, 172017 - Cano, Angel and Loeza, Luis and Ucan-Puc, Alejandro (ver en línea)On classical uniformization theorems for higher dimensional
complex {K}leinian groups.
Bulletin of the Brazilian Mathematical Society. New Series.
Boletim da Sociedade Brasileira de Matem\'{a}tica, 641--6472017 - Alderete, Vanessa and Cabrera, Carlos and Cano, Angel and
M\'{e}ndez, Mayra (ver en línea)Extending the action of {S}chottky groups on the complex
anti--de {S}itter space to the projective space.
Singularities in geometry, topology, foliations and dynamics, 1--162017 - Cano, Angel and Loeza, Luis and Ucan-Puc, Alejandro (ver en línea)Projective cyclic groups in higher dimensions.
Linear Algebra and its Applications, 169--2092016 - Barrera, Waldemar and Cano, Angel and Navarrete, Ju\'{a}n (ver en línea)On the number of lines in the limit set for discrete subgroups
of {${\rm PSL}(3,\Bbb C)$}.
Pacific Journal of Mathematics, 17--492016 - Cano, Angel and Parker, John R. and Seade, Jos\'{e} (ver en línea)Action of {$\Bbb R$}-{F}uchsian groups on {$\Bbb{CP}^2$}.
Asian Journal of Mathematics, 449--4732015 - Barrera, W. and Cano, A. and Navarrete, J. P. and Seade, J. (ver en línea)Complex {K}leinian groups.
Geometry, groups and dynamics, 1--412015 - Cano, Angel and Seade, Jos\'{e} (ver en línea)An overview of complex {K}leinian groups.
Nonlinear dynamics new directions, 167--1942014 - Barrera, Waldemar and Cano, Angel and Navarrete, Juan Pablo (ver en línea)One line complex {K}leinian groups.
Pacific Journal of Mathematics, 275--3032014 - Barrera, W. and Cano, A. and Navarrete, J. P. (ver en línea)Pappus' {T}heorem and a construction of complex {K}leinian
groups with rich dynamics.
Bulletin of the Brazilian Mathematical Society. New Series.
Boletim da Sociedade Brasileira de Matem\'{a}tica, 25--522014 - Cano, Angel and Seade, Jos\'{e} (ver en línea)On discrete groups of automorphisms of
{$\Bbb{P}^2_{\Bbb{C}}$}.
Geometriae Dedicata, 9--602013 - Cano, Angel and Navarrete, Juan Pablo and Seade, Jos\'{e} (ver en línea)Complex {K}leinian groups.
, xx+2712011 - Barrera, W. and Cano, A. and Navarrete, J. P. (ver en línea)Subgroups of {$PSL(3,{\Bbb C})$} with four lines in general
position in its limit set.
Conformal Geometry and Dynamics. An Electronic Journal of the
American Mathematical Society, 160--1762011 - Barrera Vargas, Waldemar del Jes\'{u}s and Cordero, Angel Cano and
Carrillo, Juan Pablo Navarrete (ver en línea)The limit set of discrete subgroups of {${\rm PSL}(3,\Bbb
C)$}.
Mathematical Proceedings of the Cambridge Philosophical
Society, 129--1462010 - Cano, Angel and Seade, Jos\'{e} (ver en línea)On the equicontinuity region of discrete subgroups of {${\rm
PU}(1,n)$}.
Journal of Geometric Analysis, 291--3052008 - Cano, Angel (ver en línea)Schottky groups can not act on {$\bold P^{2n}_{\bold C}$} as
subgroups of {${\rm PSL}_{2n+1}(\bold C)$}.
Bulletin of the Brazilian Mathematical Society. New Series.
Boletim da Sociedade Brasileira de Matem\'{a}tica, 573--586