MPI-I-98-1-005
The mutual exclusion scheduling problem for permutation and comparability graphs
Jansen, Klaus
January 1998, 12 pages.
.
Status: available - back from printing
In this paper, we consider the mutual exclusion scheduling problem
for comparability graphs.
Given an undirected graph $G$ and a fixed constant $m$, the problem is to
find a minimum coloring of $G$ such that each color is used at most $m$
times. The complexity of this problem for comparability graphs was mentioned as an open problem
by M\"ohring (1985) and for permutation graphs (a
subclass of comparability graphs) as an open problem by Lonc (1991). We
prove that this problem is already NP-complete for permutation graphs and
for each fixed constant $m \ge 6$.
-
- Attachement: MPI-I-98-1-005.ps (130 KBytes)
URL to this document: https://domino.mpi-inf.mpg.de/internet/reports.nsf/NumberView/1998-1-005
BibTeX
@TECHREPORT{Jansen98-1-005,
AUTHOR = {Jansen, Klaus},
TITLE = {The mutual exclusion scheduling problem for permutation and comparability graphs},
TYPE = {Research Report},
INSTITUTION = {Max-Planck-Institut f{\"u}r Informatik},
ADDRESS = {Im Stadtwald, D-66123 Saarbr{\"u}cken, Germany},
NUMBER = {MPI-I-98-1-005},
MONTH = {January},
YEAR = {1998},
ISSN = {0946-011X},
}