331 research outputs found
Small feedback vertex sets in planar digraphs
Let be a directed planar graph on vertices, with no directed cycle of
length less than . We prove that contains a set of vertices
such that has no directed cycle, and if ,
if , and if . This
improves recent results of Golowich and Rolnick.Comment: 5 pages, 1 figure - v3 final versio
Precoloring co-Meyniel graphs
The pre-coloring extension problem consists, given a graph and a subset
of nodes to which some colors are already assigned, in finding a coloring of
with the minimum number of colors which respects the pre-coloring
assignment. This can be reduced to the usual coloring problem on a certain
contracted graph. We prove that pre-coloring extension is polynomial for
complements of Meyniel graphs. We answer a question of Hujter and Tuza by
showing that ``PrExt perfect'' graphs are exactly the co-Meyniel graphs, which
also generalizes results of Hujter and Tuza and of Hertz. Moreover we show
that, given a co-Meyniel graph, the corresponding contracted graph belongs to a
restricted class of perfect graphs (``co-Artemis'' graphs, which are
``co-perfectly contractile'' graphs), whose perfectness is easier to establish
than the strong perfect graph theorem. However, the polynomiality of our
algorithm still depends on the ellipsoid method for coloring perfect graphs
Equitable partition of graphs into induced forests
An equitable partition of a graph is a partition of the vertex-set of
such that the sizes of any two parts differ by at most one. We show that every
graph with an acyclic coloring with at most colors can be equitably
partitioned into induced forests. We also prove that for any integers
and , any -degenerate graph can be equitably
partitioned into induced forests.
Each of these results implies the existence of a constant such that for
any , any planar graph has an equitable partition into induced
forests. This was conjectured by Wu, Zhang, and Li in 2013.Comment: 4 pages, final versio
- …