TY - JOUR
T1 - Optimal covers with Hamilton cycles in random graphs
AU - Hefetz, Dan
AU - Kühn, Daniela
AU - Lapinskas, John
AU - Osthus, Deryk
N1 - Publisher Copyright:
© 2014, János Bolyai Mathematical Society and Springer-Verlag Berlin Heidelberg.
PY - 2014/10
Y1 - 2014/10
N2 - A packing of a graph G with Hamilton cycles is a set of edge-disjoint Hamilton cycles in G. Such packings have been studied intensively and recent results imply that a largest packing of Hamilton cycles in Gn,p a.a.s. has size ⌊δ(Gn,p)/2⌋. Glebov, Krivelevich and Szabó recently initiated research on the ‘dual’ problem, where one asks for a set of Hamilton cycles covering all edges of G. Our main result states that for (Formula Presented.), a.a.s. the edges of Gn,p can be covered by ⌈Δ (Gn,p)/2⌉ Hamilton cycles. This is clearly optimal and improves an approximate result of Glebov, Krivelevich and Szabó, which holds for p ≥ n−1+ɛ. Our proof is based on a result of Knox, Kühn and Osthus on packing Hamilton cycles in pseudorandom graphs.
AB - A packing of a graph G with Hamilton cycles is a set of edge-disjoint Hamilton cycles in G. Such packings have been studied intensively and recent results imply that a largest packing of Hamilton cycles in Gn,p a.a.s. has size ⌊δ(Gn,p)/2⌋. Glebov, Krivelevich and Szabó recently initiated research on the ‘dual’ problem, where one asks for a set of Hamilton cycles covering all edges of G. Our main result states that for (Formula Presented.), a.a.s. the edges of Gn,p can be covered by ⌈Δ (Gn,p)/2⌉ Hamilton cycles. This is clearly optimal and improves an approximate result of Glebov, Krivelevich and Szabó, which holds for p ≥ n−1+ɛ. Our proof is based on a result of Knox, Kühn and Osthus on packing Hamilton cycles in pseudorandom graphs.
UR - http://www.scopus.com/inward/record.url?scp=84939876280&partnerID=8YFLogxK
U2 - 10.1007/s00493-014-2956-z
DO - 10.1007/s00493-014-2956-z
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AN - SCOPUS:84939876280
SN - 0209-9683
VL - 34
SP - 573
EP - 596
JO - Combinatorica
JF - Combinatorica
IS - 5
ER -