An optimal transport-based characterization of convex order

An optimal transport-based characterization of convex order

For probability measures μ,ν\mu ,\nu , and ρ\rho , define the cost functionals C(μ,ρ)≔supπ∈Π(μ,ρ)∫⟨x,y⟩π(dx,dy)andC(ν,ρ)≔supπ∈Π(ν,ρ)∫⟨x,y⟩π(dx,dy),C\left(\mu ,\rho ):= \mathop{\sup }\limits_{\pi \in \Pi \left(\mu ,\rho )}\int \langle x,y\rangle \pi \left({\rm{d}}x,{\rm{d}}y)\hspace{1.0em}{\rm{and}}\...

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Bibliographic Details
Main Authors:	Wiesel Johannes, Zhang Erica
Format:	Article
Language:	English
Published:	De Gruyter 2023-10-01
Series:	Dependence Modeling
Subjects:	convex order optimal transport wasserstein distance model-independent finance 60g46 60g42 91g80
Online Access:	https://doi.org/10.1515/demo-2023-0102

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