On the continuity of partial actions of Hausdorff groups on metric spaces

Carlos Enrique Uzcátegui Aylwin; Héctor Pinedo; Jorge A. Gómez

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On the continuity of partial actions of Hausdorff groups on metric spaces

Autores: Carlos Enrique Uzcátegui Aylwin, Héctor Pinedo, Jorge A. Gómez
Localización: Revista Colombiana de Matemáticas, ISSN-e 0034-7426, Vol. 52, Nº. 1, 2018, págs. 1-7
Idioma: inglés
DOI: 10.15446/recolma.v1n52.74521
Títulos paralelos:
- Sobre la continuidad de acciones parciales de grupos de Hausdorff en espacios métricos
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Referencias bibliográficas
- F. Abadie, Enveloping actions and takai duality for partial actions, Journal of Func. Anal. 197 (2003), 14-67.
- H. Becker and A. Kechris, The Descriptive Set Theory of Polish Group
- Actions, London Math. Soc. Lect. Notes, 1996.
- K. Choi and Y. Lim, Transitive partial actions of groups, Period. Math.
- Hung. 56 (2008), no. 2, 169-181.
- K. Mc Clanahan, k-theory for partial crossed products by discrete groups, J. Funct. Anal. 130 (1995), 77-117.
- M. Dokuchaev and M. Khrypchenko, Partial cohomology of groups, J. Algebra 427 (2015), 142-182.
- M. Dokuchaev, B. Novikov, and H. Pinedo, The partial schur multiplier
- of a group, J. Algebra 392 (2013), 199-225.
- R. Exel, Partial actions of groups and actions of inverse semigroups, Proc. Am. Math. Soc. 126 (1998), no. 12, 3481-3494.
- S. Gao, Invariant Descriptive Set Theory, Chapmann & Hall, 2009.
- J. Gómez, H. Pinedo, and C. Uzcátegui, The open mapping principle for
- partial actions of polish groups, J. Math. Anal. Appl. 462 (2018), no. 1,
- -346.
- J. Hoffmann-Jorgensen and F. Topsoe, Analytic spaces and their application, in analytic sets., Academic Press 37 (1980), 311-340.
- J. Kellendonk and M. V. Lawson, Partial actions of groups, Internat. J.
- Algebra Comput. 14 (2004), no. 1, 87-114.
- H. Pinedo, Partial projective representations and the partial schur multiplier: a survey, Bol. Mat. 22 (2015), no. 2, 167-175.
- H. Pinedo and C. Uzcátegui, Borel globalization of partial actions of polish groups, To appear in Archive for Mathematical Logic.
- H. Pinedo and C. Uzcátegui, Polish globalization of polish group partial actions, Math. Log. Quart. 63 (2017), no. 6, 481-490.
- J. C. Quigg and I. Raeburn, Characterizations of crossed products by partial actions, J. Operator Theory 37 (1997), 311-340.