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dc.contributor.author Jahanbakhsh, N .
dc.contributor.author Nikandish, R.
dc.contributor.author Nikmehr, M. J .
dc.date.accessioned 2019-12-03T10:30:05Z
dc.date.available 2019-12-03T10:30:05Z
dc.date.issued 2019
dc.identifier.uri http://hdl.handle.net/123456789/4376
dc.description Jahanbakhsh N. On the inclusion ideal graph of a poset / N . Jahanbakhsh , R . Nikandish , M. J . Nikmehr // Algebra and Discrete Mathematics. - 2019. - Vol. 27. - Number 2. - Рp. 269-279 uk_UA
dc.description.abstract Let (P, 6) be an atomic partially ordered set (poset, briefly) with a minimum element 0 and I(P) the set of nontrivial ideals of P. The inclusion ideal graph of P, denoted by Ω(P), is an undirected and simple graph with the vertex set I(P) and two distinct vertices I, J ∈ I(P) are adjacent in Ω(P) if and only if I ⊂ J or J ⊂ I. We study some connections between the graph theoretic properties of this graph and some algebraic properties of a poset. We prove that Ω(P) is not connected if and only if P = {0, a1, a2}, where a1, a2 are two atoms. Moreover, it is shown that if Ω(P) is connected, then diam(Ω(P)) 6 3. Also, we show that if Ω(P) contains a cycle, then girth(Ω(P)) ∈ {3, 6}. Furthermore, all posets based on their diameters and girths of inclusion ideal graphs are characterized. Among other results, all posets whose inclusion ideal graphs are path, cycle and star are characterized. uk_UA
dc.language.iso en uk_UA
dc.relation.ispartofseries Математичні науки;
dc.subject poset uk_UA
dc.subject inclusion ideal graph uk_UA
dc.subject diameter uk_UA
dc.subject girth uk_UA
dc.subject connectivity uk_UA
dc.title On the inclusion ideal graph of a poset uk_UA
dc.type Article uk_UA


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