Gudmund Pammer scite author profile

The optimal weak transport problem has recently been introduced by Gozlan et. al. [25]. We provide general existence and duality results for these problems on arbitrary Polish spaces, as well as a necessary and sufficient optimality criterion in the spirit of cyclical monotonicity. As an application we extend the Brenier-Strassen Theorem of Gozlan-Juillet [23] to general probability measures on R d under minimal assumptions.A driving idea behind our proofs is to consider the set of transport plans with a new ('adapted') topology which seems better suited for the weak transport problem and allows to carry out arguments which are close to the proofs in the classical setup.

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Disease momentum: Estimating the reproduction number in the presence of superspreading

Johnson

Beiglböck

Eder

et al. 2021

Infectious Disease Modelling

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Stability of martingale optimal transport and weak optimal transport

Backhoff-Veraguas¹,

Pammer²

2019

Preprint

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Under mild regularity assumptions, the transport problem is stable in the following sense: if a sequence of optimal transport plans π 1 , π 2 , . . . converges weakly to a transport plan π, then π is also optimal (between its marginals).Alfonsi, Corbetta and Jourdain [3] asked whether the same property is true for the martingale transport problem. This question seems particularly pressing since martingale transport is motivated by robust finance where data is naturally noisy. On a technical level, stability in the martingale case appears more intricate than for classical transport since optimal transport plans π are not characterized by a 'monotonicity'-property of supp π.In this paper we give a positive answer and establish stability of the martingale transport problem. As a particular case, this recovers the stability of the left curtain coupling established by Juillet [32]. An important auxiliary tool is an unconventional topology which takes the temporal structure of martingales into account. Our techniques also apply to the the weak transport problem introduced by Gozlan et al.

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Weak monotone rearrangement on the line

Backhoff-Veraguas¹,

Beiglböck²,

Pammer³

2020

Electron. Commun. Probab.

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Weak optimal transport has been recently introduced by Gozlan et al. The original motivation stems from the theory of geometric inequalities; further applications concern numerics of martingale optimal transport and stability in mathematical finance.In this note we provide a complete geometric characterization of the weak version of the classical monotone rearrangement between measures on the real line, complementing earlier results of Alfonsi, Corbetta, and Jourdain. arXiv:1902.05763v1 [math.PR]

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The Wasserstein space of stochastic processes

Bartl¹,

Beiglböck²,

Pammer³

2021

Preprint

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Wasserstein distance induces a natural Riemannian structure for the probabilities on the Euclidean space. This insight of classical transport theory is fundamental for tremendous applications in various fields of pure and applied mathematics.We believe that an appropriate probabilistic variant, the adapted Wasserstein distance AW, can play a similar role for the class FP of filtered processes, i.e. stochastic processes together with a filtration. In contrast to other topologies for stochastic processes, probabilistic operations such as the Doob-decomposition, optimal stopping and stochastic control are continuous w.r.t. AW. We also show that (FP, AW) is a geodesic space, isometric to a classical Wasserstein space, and that martingales form a closed geodesically convex subspace.

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Gudmund Pammer

Existence, duality, and cyclical monotonicity for weak transport costs

Disease momentum: Estimating the reproduction number in the presence of superspreading

Stability of martingale optimal transport and weak optimal transport

Weak monotone rearrangement on the line

The Wasserstein space of stochastic processes

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