The maximal dimensions of path and graph algebras
Abstract
We consider the class of acyclic connected directed graphs with N≥ 1. In this paper we find the optimal upper bound for the number of paths amongst acyclic, connected graphs with N edges. We prove that it is in fact optimal by finding an acyclic, connected graph with N edges that realizes this bound. We then adapt these methods to find an optimal bound for Leavitt path algebras over a finite, acyclic, connected graph with N edges.
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