TY - JOUR
T1 - Approximate realizations for outerplanaric degree sequences
AU - Bar-Noy, Amotz
AU - Böhnlein, Toni
AU - Peleg, David
AU - Ran, Yingli
AU - Rawitz, Dror
N1 - Publisher Copyright:
© 2024 Elsevier Inc.
PY - 2025/3
Y1 - 2025/3
N2 - We study the question of whether a sequence d=(d1,…,dn) of positive integers is the degree sequence of some outerplanar graph G. If so, G is an outerplanar realization of d and d is an outerplanaric sequence. The case where ∑d≤2n−2 is easy, as d has a realization by a forest. In this paper, we consider the family D of all sequences d of even sum 2n≤∑d≤4n−6−2ω1, where ωx is the number of x's in d. We partition D into two disjoint subfamilies, D=DNOP∪D2PBE, such that every sequence in DNOP is provably non-outerplanaric, and every sequence in D2PBE is given a realizing graph G enjoying a 2-page book embedding (and moreover, one of the pages is also bipartite).
AB - We study the question of whether a sequence d=(d1,…,dn) of positive integers is the degree sequence of some outerplanar graph G. If so, G is an outerplanar realization of d and d is an outerplanaric sequence. The case where ∑d≤2n−2 is easy, as d has a realization by a forest. In this paper, we consider the family D of all sequences d of even sum 2n≤∑d≤4n−6−2ω1, where ωx is the number of x's in d. We partition D into two disjoint subfamilies, D=DNOP∪D2PBE, such that every sequence in DNOP is provably non-outerplanaric, and every sequence in D2PBE is given a realizing graph G enjoying a 2-page book embedding (and moreover, one of the pages is also bipartite).
KW - Book embedding
KW - Degree realization
KW - Outerplanar graph
UR - http://www.scopus.com/inward/record.url?scp=85206468418&partnerID=8YFLogxK
U2 - 10.1016/j.jcss.2024.103588
DO - 10.1016/j.jcss.2024.103588
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AN - SCOPUS:85206468418
SN - 0022-0000
VL - 148
JO - Journal of Computer and System Sciences
JF - Journal of Computer and System Sciences
M1 - 103588
ER -