Algebraic topology of C*-algebras

Abstract

Any C*-algebra can be regarded as a generalization of locally compact, Hausdorff topological space X. From the commutative commutative Gelfand-Namark theorem it follows that the spectrum of any commutative C*-algebra is a locally compact, Hausdorff space which have the exact information of the C*-algebra. Here we consider a Gelfand spaces of C*-algebras which can be regarded as a generalization of the spectrum. In case of commutative C*-algebras the Gelfand space coincides with the spectrum. Generally Gelfand spaces are not Hausdorff and provide more detailed information of noncommutative C*-algebras. Sometimes the Gelfand space contains the full information of noncommutative C*-algebra. Usage of Gelfand spaces of C*-algebra enables us to define some C*-algebraic analogs of several notions of the classical algebraic topology.

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