Types of Irreducible Divisor Graphs of Noncommutative Domains, II
Abstract
In this paper, we continue investigation of the directed and undirected irreducible divisor graph concepts G(x) and (x) of x∈ D U(D), respectively, which were introduced in [7]. Consequently, we introduce two generalizations of these concepts. The first one is the irreducible divisor simplicial complex S(x) of x∈ D U(D) in a noncommutative atomic domain D, which simultaneously extends the commutative case that was introduced by R. Baeth and J. Hobson in [3]. The second one is the directed and undirected τ -irreducible divisor graphs Gτ (x) and τ (x) of x∈ D U(D), respectively, in a noncommutative τ -atomic domain D with a symmetric and associate preserving relation τ on D U(D). Those graphs also extend the commutative case that was introduced by C. P. Mooney in [5]. Furthermore, we extend the results of [3] and [5] to give a characterization of n-unique factorization domains via those two generalizations.
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