# Transport maps, non-branching sets of geodesics and measure rigidity

**Authors:** Martin Kell

arXiv: 1704.05422 · 2017-04-19

## TL;DR

This paper explores the connection between transport maps, non-branching geodesic sets, and measure rigidity in metric measure spaces, extending previous results and establishing new conditions for measure uniqueness and absolute continuity.

## Contribution

It generalizes existing results by linking qualitative non-degenericity to the existence of unique transport maps in essentially non-branching spaces and proves a new measure rigidity theorem.

## Key findings

- Qualitative non-degenericity implies unique transport maps in essentially non-branching spaces.
- Any two essentially non-branching, qualitatively non-degenerate measures are mutually absolutely continuous.
- Results apply to spaces with generalized finite dimensional Ricci curvature bounds.

## Abstract

In this paper we investigate the relationship between a general existence of transport maps of optimal couplings with absolutely continuous first marginal and the property of the background measure called essentially non-branching introduced by Rajala-Sturm (Calc.Var.PDE 2014). In particular, it is shown that the qualitative non-degenericity condition introduced by Cavalletti-Huesmann (Ann. Inst. H. Poincar\'e Anal. Non Lin\`eaire 2015) implies that any essentially non-branching metric measure space has a unique transport maps whenever initial measure is absolutely continuous. This generalizes a recently obtained result by Cavalletti-Mondino (Commun. Contemp. Math. 2017) on essentially non-branching spaces with the measure contraction condition $\mathsf{MCP}(K,N)$.   In the end we prove a measure rigidity result showing that any two essentially non-branching, qualitatively non-degenerate measures on a fixed metric spaces must be mutually absolutely continuous. This result was obtained under stronger conditions by Cavalletti-Mondino (Adv.Math. 2016). It applies, in particular, to metric measure spaces with generalized finite dimensional Ricci curvature bounded from below.

## Full text

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## References

30 references — full list in the complete paper: https://tomesphere.com/paper/1704.05422/full.md

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Source: https://tomesphere.com/paper/1704.05422