The Monge Problem in Banach Spaces |
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| Authors: | Henri Heinich |
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| Affiliation: | (1) Département de Génie Mathématique, INSA de Rouen, place E. Blondel, 76131 Mont-Saint-Aignan Cedex, France |
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| Abstract: | In this paper, we generalize the Kantorovich functional to K?the-spaces for a cost or a profit function. We examine the convergence of probabilities with respect to this functional for some K?the-spaces. We study the Monge problem: Let  be a K?the-space, P and Q two Borel probabilities defined on a Polish space M and a cost function  . A K?the functional  is defined by  (P, Q) = inf  where  is the law of X. If c is a profit function, we note  . (P, Q) = sup  Under some conditions, we show the existence of a Monge function, φ, such that  , or  . |
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| Keywords: | Cost and profit functions Monge– Kantorovich transportation problem Monge problem optimal coupling K?the and Orlicz spaces |
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