3 research outputs found
Covering line graphs with equivalence relations
An equivalence graph is a disjoint union of cliques, and the equivalence
number of a graph is the minimum number of equivalence
subgraphs needed to cover the edges of . We consider the equivalence number
of a line graph, giving improved upper and lower bounds: . This disproves a
recent conjecture that is at most three for triangle-free
; indeed it can be arbitrarily large.
To bound we bound the closely-related invariant
, which is the minimum number of orientations of such that for
any two edges incident to some vertex , both and are oriented
out of in some orientation. When is triangle-free,
. We prove that even when is triangle-free, it
is NP-complete to decide whether or not .Comment: 10 pages, submitted in July 200