proposal_1
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| - | [[unimodular|Unimodularity for groups and manifolds]] | + | ====Unimodularity for groups and manifolds==== |
| + | === Presentation === | ||
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| + | Forgetting the group structure via Schreier graphs, invariant random subgroups in discrete groups can be regarded as random graphs satisfying an invariance property called //unimodularity//. In the continuous setting, one can translate IRSs in Lie groups into random Riemannian manifolds with an ad hoc invariance property, which makes sense beyond the locally symmetric setting. | ||
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| + | === References === | ||
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| + | * Ian Biringer, Omer Tamuz, //Unimodularity of Invariant Random Subgroups//, Trans. AMS 2016, [[https://arxiv.org/abs/1402.1042|Arxiv version]]. | ||
| + | * Miklós Abért, Ian Biringer, //Unimodular measures on the space of all Riemannian manifolds //, [[https://arxiv.org/abs/1606.03360|Arxiv preprint]]. | ||
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| + | ====...==== | ||
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