Abstract
The aim of this work is the description of the isomorphism classes of all Leavitt path algebras coming from graphs satisfying Condition (Sing) with up to three vertices. In particular, this classication recovers the one achieved by Abrams et al. (1) in the case of graphs whose Leavitt path algebras are purely innite simple. The description of the isomorphism classes is given in terms of a series of invariants including the K0 group, the socle, the number of loops with no exits and the number of hereditary and saturated subsets of the graph.
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