Injectives over Leavitt path algebras of graphs with disjoint cycles
Abstract
Let K be any field, and let E be a finite graph with the property that every vertex in E is the base of at most one cycle (we say such a graph satisfies Condition (AR)). We explicitly construct the injective envelope of each simple left module over the Leavitt path algebra LK(E). The main idea girding our construction is that of a "formal power series" extension of modules, thereby developing for all graphs satisfying Condition (AR) the understanding of injective envelopes of simple modules over LK(E) achieved previously for the simple modules over the Toeplitz algebra.
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