Partial group (co)actions of Hopf group coalgebras

Chen, Quanguo; Wang, Dingguo

doi:10.2298/fil1401131c

Cited by 4 publications

(4 citation statements)

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“…Furthermore, Birget [56] applied the partial action definition of Thompson's groups to study algorithmic problems for them. Since then the algebraic approach is being developed in diverse directions in various levels of generality, including partial actions of Hopf (or, more generally, weak Hopf) algebras [15,[17][18][19][20][21][22]48,69,72,[78][79][80][81][82][83][86][87][88]165,250,282], semigroups [68,97,132,[197][198][199]209,213,220,227,233,234,242,255], inductive constellations [198], groupoids [37,[40][41][42][43]178], and, more generally, categories [244]. In particular, further algebraic applications have been found to graded algebras [117,121], to Hecke algebras…”

Section: Mathematics Subject Classificationmentioning

confidence: 99%

“…Recent works around partial actions include also the study of the category of the partial Doi-Hopf modules in [86], of partial actions on power sets in [34], of the category of partial G-sets for a fixed group G in [28], of partial orbits and n-transitivity in [31], of partial group entwining structures and partial group (co)actions of a Hopf group coalgebra on a family of algebras in [87], of generalized partial smash products in [143], and of twisted partial Hopf coactions and corresponding partial crossed coproducts in [88], as well as a note on sums of ideals [33]. More information around partial actions may be found in the surveys [45,115,116,170,250,251,260].…”

Section: (G U(a))→pic(a G )→Pic(a) G →H 2 (G U(a))→b(a/a α )→ → H 1mentioning

confidence: 99%

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Recent developments around partial actions

Dokuchaev

2018

São Paulo J. Math. Sci.

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We give an overview of publications on partial actions and related concepts, paying main attention to some recent developments on diverse aspects of the theory, such as partial actions of semigroups, of Hopf algebras and groupoids, the globalization problem for partial actions, Morita theory of partial actions, twisted partial actions, partial projective representations and the Schur multiplier, cohomology theories related to partial actions, Galois theoretic results, ring theoretic properties and ideals of partial crossed products. Among the applications we consider in more detail the case of the Carlsen-Matsumoto C *-algebra related to an arbitrary subshift, but also mention many others. The total number of publications directly related to partial actions and partial representations is more than 130, so that it is impossible even to describe briefly the content of all of them within the constraints of the present survey. Thus, the majority of them are only cited with respects to specific topics, trying to give an idea about the involved matter. In order to complete the picture, we refer the reader to a recent book by Ruy Exel, to our previous surveys, as well as to those by other authors.

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Section: Mathematics Subject Classificationmentioning

confidence: 99%

Section: (G U(a))→pic(a G )→Pic(a) G →H 2 (G U(a))→b(a/a α )→ → H 1mentioning

confidence: 99%

Recent developments around partial actions

Dokuchaev

2018

São Paulo J. Math. Sci.

View full text Add to dashboard Cite

show abstract

Section: Then We Define Thementioning

confidence: 99%

“…Furthermore, J.-C. Birget [56] applied the partial action definition of Thompson's groups to study algorithmic problems for them. Since then the algebraic approach is being developed in diverse directions in various levels of generality, including partial actions of Hopf (or, more generally, weak Hopf) algebras [15], [17], [18], [19], [20], [21], [22], [48], [69], [72], [78], [79], [80], [81], [82], [83], [86], [87], [88], [165], [250], [282], semigroups [68], [97], [132], [197], [198], [199], [209] [213], [220], [227], [233], [234], [242], [255], inductive constellations [198], groupoids [37], [40], [41], [42], [43], [178], and, more generally, categories [244]. In particular, further algebraic applications have been found to graded algebras …”

mentioning

confidence: 99%