Twisted Cyclic Homology And Crossed Product Algebras

Abstract: $HC_(A \rtimes G)$ is the cyclic homology of the crossed product algebra $A \rtimes G.$ For any $g \epsilon G$ we will define a homomorphism from $HC_^g(A),$ the twisted cylic homology of $A$ with respect to $g,$ to $HC_(A \rtimes G).$ If $G$ is the finite cyclic group generated by $g$ and $|G|=r$ is invertible in $k,$ then $HC_(A \rtimes G)$ will be isomorphic to a direct sum of $r$ copies of $HC_^g(A).$ For the case where $|G|$ is finite and $Q \subset k$ we will generalize the Karoubi and Connes periodicity exact sequences for $HC_^g(A)$ to Karoubi and Connes periodicity exact sequences for $HC_*(A \rtimes G)$ .