On the extremality, uniqueness and optimality of transference plans
by
Stefano Bianchini
Laura Caravenna
Vol. 4 No. 4 (2009) P.353~P.454
ABSTRACT
We consider the following standard problems appearing in optimal mass transportation theory:
- ‧ when a transference plan is extremal,
- ‧ when a transference plan is the unique transference plan concentrated on a set $A$,
- ‧ when a transference plan is optimal.
We study these three problems with a general approach:
- (1) choose some necessary conditions, depending on the problem
we are considering;
- (2) find a partition into sets $B_\alpha$ where these necessary conditions
become also sufficient;
- (3) show that all the transference plans are concentrated on $\cup_{\alpha}B_{\alpha}$
Explicit procedures are provided in the three cases above, the
principal one being that the problem has an hidden structure of
linear preorder with universally measurable graph.
As by sides results, we study the disintegration theorem w.r.t. a family of equivalence relations, the construction of optimal potentials, a natural relation obtained from $c$-cyclical monotonicity.
KEYWORDS
MATHEMATICAL SUBJECT CLASSIFICATION 2010
Primary:
MILESTONES
Received: 2009-09-22
Revised :
Accepted: 2009-09-23
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