Polymatroid
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In mathematics, polymatroid is a polytope associated with a submodular function. The notion was introduced by Jack Edmonds in 1970.[1]
Definition
Consider any submodular set function on . Then define two associated polyhedra.
Here is called the polymatroid and is called the extended polymatroid associated with .[2]
Relation to matroids
If f is integer-valued, 1-Lipschitz, and then f is the rank-function of a matroid, and the polymatroid is the independent set polytope, so-called since Edmonds showed it is the convex hull of the characteristic vectors of all independent sets of the matroid.
Properties
is nonempty if and only if and that is nonempty if and only if .
Given any extended polymatroid there is a unique submodular function such that and .
Contrapolymatroids
For a supermodular f one analogously may define the contrapolymatroid
This analogously generalizes the dominant of the spanning set polytope of matroids.
References
- Footnotes
- ^ Edmonds, Jack. Submodular functions, matroids, and certain polyhedra. 1970. Combinatorial Structures and their Applications (Proc. Calgary Internat. Conf., Calgary, Alta., 1969) pp. 69–87 Gordon and Breach, New York. MR0270945
- ^ Schrijver, Alexander (2003), Combinatorial Optimization, Springer, §44, p. 767, ISBN 3-540-44389-4
- Additional reading
- Lee, Jon (2004), A First Course in Combinatorial Optimization, Cambridge University Press, ISBN 0-521-01012-8
- Fujishige, Saruto (2005), Submodular Functions and Optimization, Elsevier, ISBN 0-444-52086-4
- Narayanan, H. (1997), Submodular Functions and Electrical Networks, ISBN 0-444-82523-1