Extreme points of general transportation polytopes
Abstract
Transportation matrices are m× n non-negative matrices whose row sums and row columns are equal to, or dominated above with given integral vectors R and C. Those matrices belong to a convex polytope whose extreme points have been previously characterized. In this article, a more general set of non-negative transportation matrices is considered, whose row sums are bounded by two integral non-negative vectors Rmin and Rmax and column sums are bounded by two integral non-negative vectors Cmin and Cmax. It is shown that this set is also a convex polytope whose extreme points are then fully characterized.
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