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ชื่อเรื่อง: | An intermediate value theorem for the arboricities |
ผู้แต่ง: | Punnim N. Chantasartrassmee A. |
วันที่เผยแพร่: | 2011 |
บทคัดย่อ: | Let G be a graph. The vertex (edge) arboricity of G denoted by a (G) (a 1 (G)) is the minimum number of subsets into which the vertex (edge) set of G can be partitioned so that each subset induces an acyclic subgraph. Let d be a graphical sequence and let R (d) be the class of realizations of d. We prove that if π∈{a, a1}, then there exist integers x (π) and y (π) such that d has a realization G with π(G) = z if and only if z is an integer satisfying x (π) < z < y (π). Thus, for an arbitrary graphical sequence d and π∈{a, a1}, the two invariants x (π) = min (π, d): = min { (G): G R (d) } and y (π) = max (π, d): = m a x {π G): G ∈ R (d) } naturally arise and hence (d): = {π(G): G ∈ R (d) } = { z ∈ ℤ: x (π)< z < y (π)}. We write d = rn: = (r, r, ⋯, r) for the degree sequence of an r -regular graph of order n. We prove that a1 (rn) = {(r + 1) / 2 }. We consider the corresponding extremal problem on vertex arboricity and obtain m in (a, rn) in all situations and max (a, rn) for all n > 2 r + 2. © 2011 Avapa Chantasartrassmee and Narong Punnim. |
URI: | https://ir.swu.ac.th/jspui/handle/123456789/14472 https://www.scopus.com/inward/record.uri?eid=2-s2.0-80052656856&doi=10.1155%2f2011%2f947151&partnerID=40&md5=714a8b3f87c390368ec5068b4b15ba12 |
ISSN: | 1611712 |
Appears in Collections: | Scopus 1983-2021 |
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