A new way to iterate Brzeziński crossed products

Leonard Dăuş; Florin Panaite

doi:10.4064/cm142-1-2

Geodesic

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A new way to iterate Brzeziński crossed products

Leonard Dăuş ¹ ; Florin Panaite ²

¹ Department of Mathematical Sciences UAE University PO Box 15551 Al Ain, United Arab Emirates
² Institute of Mathematics Romanian Academy PO Box 1-764 RO-014700 Bucureşti, Romania

Colloquium Mathematicum, Tome 142 (2016) no. 1, pp. 51-60.

Voir la notice de l'article provenant de la source Institute of Mathematics Polish Academy of Sciences

Résumé

If $A\otimes _{R, \sigma }V$ and $A\otimes _{P, \nu }W$ are two Brzeziński crossed products and $Q:W\otimes V\rightarrow V\otimes W$ is a linear map satisfying certain properties, we construct a Brzeziński crossed product $A\otimes _{S, \theta }(V\otimes W)$. This construction contains as a particular case the iterated twisted tensor product of algebras.

DOI : 10.4064/cm142-1-2

Keywords: otimes sigma otimes brzezi ski crossed products otimes rightarrow otimes linear map satisfying certain properties construct brzezi ski crossed product otimes theta otimes construction contains particular iterated twisted tensor product algebras

Affiliations des auteurs :

Leonard Dăuş ¹ ; Florin Panaite ²

¹ Department of Mathematical Sciences UAE University PO Box 15551 Al Ain, United Arab Emirates
² Institute of Mathematics Romanian Academy PO Box 1-764 RO-014700 Bucureşti, Romania

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Leonard Dăuş; Florin Panaite. A new way to iterate Brzeziński crossed products. Colloquium Mathematicum, Tome 142 (2016) no. 1, pp. 51-60. doi : 10.4064/cm142-1-2. http://geodesic.mathdoc.fr/articles/10.4064/cm142-1-2/

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