Title of article
Independent sets with domination constraints Original Research Article
Author/Authors
Magnus M. Halldorsson، نويسنده , , Jan Kratochv??l، نويسنده , , Jan Arne Telle، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2000
Pages
16
From page
39
To page
54
Abstract
A ρ-independent set S in a graph is parameterized by a set ρ of non-negative integers that constrains how the independent set S can dominate the remaining vertices (∀v∉S: |N(v)∩S|∈ρ.) For all values of ρ, we classify as either NP-complete or polynomial-time solvable the problems of deciding if a given graph has a ρ-independent set. We complement this with approximation algorithms and inapproximability results, for all the corresponding optimization problems. These approximation results extend also to several related independence problems. In particular, we obtain a m approximation of the Set Packing problem, where m is the number of base elements, as well as a n approximation of the maximum independent set in power graphs Gt, for t even.
Journal title
Discrete Applied Mathematics
Serial Year
2000
Journal title
Discrete Applied Mathematics
Record number
885013
Link To Document