<div class="csl-bib-body">
<div class="csl-entry">Beiglböck, M., Nutz, M., & Touzi, N. (2016). Complete Duality for Martingale Optimal Transport on the Line. <i>Annals of Probability</i>, <i>45</i>(5), 3038–3074. https://doi.org/10.1214/16-aop1131</div>
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dc.identifier.issn
0091-1798
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dc.identifier.uri
http://hdl.handle.net/20.500.12708/149557
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dc.description.abstract
We study the optimal transport between two probability measures on the real line, where the transport plans are laws of one-step martingales. A quasi-sure formulation of the dual problem is introduced and shown to yield a complete duality theory for general marginals and measurable reward (cost) functions: absence of a duality gap and existence of dual optimizers. Both properties are shown to fail in the classical formulation. As a consequence of the duality result, we obtain a general principle of cyclical monotonicity describing the geometry of optimal transports.
en
dc.language.iso
en
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dc.publisher
INST MATHEMATICAL STATISTICS-IMS
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dc.relation.ispartof
Annals of Probability
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dc.subject
Statistics and Probability
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dc.subject
Statistics, Probability and Uncertainty
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dc.subject
49N05
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dc.subject
Martingale Optimal Transport Kantorovich Duality AMS 2010 Subject Classification 60G42
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dc.title
Complete Duality for Martingale Optimal Transport on the Line
