The socle series of a Leavitt path algebra
Abstract
We investigate the ascending Loewy socle series of Leavitt path algebras LK(E) for an arbitrary graph E and field K. We classify those graphs E for which LK(E)=Sλ for some element Sλ of the Loewy socle series. We then show that for any ordinal λ there exists a graph E so that the Loewy length of LK(E) is λ. Moreover, λ ≤ ω (the first infinite ordinal) if E is a row-finite graph.
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