Title of article
Minimum (2, r)-Metrics and Integer Multiflows
Author/Authors
Karzanov، نويسنده , , Alexander V. and Manoussakis، نويسنده , , Yannis G. Yatracos، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 1996
Pages
10
From page
223
To page
232
Abstract
LetH=(T, U)be a connected graph. AT-partitionof a setV⊇Tis a partition ofVinto subsets, each containing exactly one element ofT.
rt with the following problem (*): given a multigraphG=(V, E)withV⊇T,find aT-partition Π ofVthat minimizes the sum of productsd(s, t)n(s, t)over alls,t∈T.Hered(s, t)is the distance fromstotinHandn(s, t)is the number of edges ofGbetween the sets in Π that containsandt.When the graphHis complete, (*) turns into the minimum multiway cut problem, which is known to be NP-hard even if|T|=3.On the other hand, whenHis the complete bipartite graphK2,rwith parts of 2 andr=|T|−2nodes, (*) is specialized to be the minimum (2,r)-metric problem, which can be solved in polynomial time.
ve that the multicommodity flow problem dual of the minimum (2,r)-metric problem has an integer optimal solution wheneverGisinner Eulerian(i.e. the degree of each node inV−Tis even), and such a solution can be found in polynomial time.
r nice property ofK2,ris that, independently ofG,the optimum objective value in (*) is the same as that in its factional relaxation. We call a graphHwith a similar propertyminimizableand give a description of the minimizable graphs in polyhedral terms. Finally, we show that every tree is minimizazble.
Journal title
European Journal of Combinatorics
Serial Year
1996
Journal title
European Journal of Combinatorics
Record number
1556416
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