The Algebraic Kirchberg-Phillips Question for Leavitt path algebras
Abstract
The Algebraic Kirchberg-Phillips Question for Leavitt path algebras asks whether unital K-theory is a complete isomorphism invariant for unital, simple, purely infinite Leavitt path algebras over finite graphs. Most work on this problem has focused on determining whether (up to isomorphism) there is a unique unital, simple, Leavitt path algebra with trivial K-theory (often reformulated as the question of whether the Leavitt path algebras L2 and L2- are isomorphic). However, it is unknown whether a positive answer to this special case implies a positive answer to the Algebraic Kirchberg-Phillips Question. In this note, we pose a different question that asks whether two particular non-simple Leavitt path algebras Lk(F*) and Lk(F**) are isomorphic, and we prove that a positive answer to this question implies a positive answer to the Algebraic Kirchberg-Phillips Question.
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