Quotients of Ultragraph C*-Algebras
Abstract
Let G be an ultragraph and let C*(G) be the associated C*-algebra introduced by Mark Tomforde. For any gauge invariant ideal I(H,B) of C*(G), we analyze the structure of the quotient C*-algebra C*(G)/I(H,B). For simplicity's sake, we first introduce the notion of quotient ultragraph G/(H,B) and an associated C*-algebra C*(G/(H,B)) such that C*(G/(H,B)) C*(G)/I(H,B). We then prove the gauge invariant and the Cuntz-Krieger uniqueness theorems for C*(G/(H,B)) and describe primitive gauge invariant ideals of C*(G/(H,B)).
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