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RANK DISTRIBUTIONS ON COARSE SPACES AND IDEAL STRUCTURE OF ROE ALGEBRAS

Published online by Cambridge University Press:  20 September 2006

XIAOMAN CHEN
Affiliation:
Institute of Mathematics, Fudan University, Shanghai, 200433, P. R. [email protected]
QIN WANG
Affiliation:
Department of Applied Mathematics, Dong Hua University, Shanghai, 200051, P. R. [email protected] Current address: Department of Mathematics, Vanderbilt University, 1326 Stevenson Center, Nashville, TN 37240, USA
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Abstract

The notions of controlled truncations for operators in the Roe algebras $C^*(X)$ of a coarse space $(X, \cal{E})$ with uniformly locally finite coarse structure, and rank distributions on $(X, \cal{E})$ are introduced. It is shown that the controlled propagation operators in an ideal $I$ of $C^*(X)$ are exactly the controlled truncations of elements in $I$. It follows that the lattice of the ideals of $C^*(X)$ in which controlled propagation operators are dense is isomorphic to the lattice of all rank distributions on $(X, \cal{E})$. If $X$ is a discrete metric space with Yu's property A, then the ideal structure of the Roe algebra $C^*(X)$ is completely determined by the rank distributions on $X$.

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Papers
Copyright
© The London Mathematical Society 2006

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