Mathematics – Operator Algebras
Scientific paper
2000-02-19
J.Geo.Phys. 48(2003) 275-296
Mathematics
Operator Algebras
16 pages, LaTeX
Scientific paper
We generalize the Serre-Swan theorem to non-commutative C$^{*}$-algebras. For a Hilbert C$^{*}$-module $X$ over a C$^{*}$-algebra ${\cal A}$, we introduce a hermitian vector bundle $\exx$ associated to $X$. We show that there is a linear subspace $\Gamma_{X}$ of the space of all holomorphic sections of ${\cal E}_{X}$ and a flat connection $D$ on ${\cal E}_{X}$ with the following properties: (i) $\Gamma_{X}$ is a Hilbert ${\cal A}$-module with the action of ${\cal A}$ defined by $D$, (ii) the C$^{*}$-inner product of $\Gamma_{X}$ is induced by the hermitian metric of ${\cal E}_{X}$, (iii) ${\cal E}_{X}$ is isomorphic to an associated bundle of an infinite dimensional Hopf bundle, (iv) $\Gamma_{X}$ is isomorphic to $X$.
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