Let $B$ be a unital $C^*$-algebra which is strongly Morita equivalent to an irrational rotation $C^*$-algebra. Then Rieffel showed that it is isomorphic to $A_\theta\otimes M_n$ where $A_\theta$ is an irrational rotation $C^*$-algebra and $M_n$ is the $n\times n$ matrix algebra over $C$. In the present paper we will show that for any automorphism $\alpha$ of $A_\theta\otimes M_n$ there are unitary elements $w\in A_\theta\otimes M_n$, $W\in M_n$ and an automorphism $\beta$ of $ A_\theta$ such that $\alpha=\mathrm{Ad}(w)\circ(\beta\otimes\mathrm{Ad}(W))$.

Publié le : 1989-06-15
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@article{1270133556,
     author = {KODAKA, Kazunori},
     title = {Automorphisms of Unital $C^*$-Algebras Which are Strongly Morita Equivalent to Irrational Rotation $C^*$-Algebras},
     journal = {Tokyo J. of Math.},
     volume = {12},
     number = {2},
     year = {1989},
     pages = { 175-180},
     language = {en},
     url = {http://dml.mathdoc.fr/item/1270133556}
}

KODAKA, Kazunori. Automorphisms of Unital $C^*$-Algebras Which are Strongly Morita Equivalent to Irrational Rotation $C^*$-Algebras. Tokyo J. of Math., Tome 12 (1989) no. 2, pp.  175-180. http://gdmltest.u-ga.fr/item/1270133556/