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 Date: 2015-12-08 04:58:57Mathematics Graph theory Geometry Geometric group theory Group theory Metric geometry Algebraic graph theory Cayley graph Quasi-isometry End Vertex-transitive graph Graph |
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CHARACTERIZING A VERTEX-TRANSITIVE GRAPH BY A LARGE BALL MIKAEL DE LA SALLE AND ROMAIN TESSERA, WITH AN APPENDIX BY JEAN-CLAUDE SIKORAV Abstract. It is well-known that a complete Riemannian manifold M which is locally is![THE FARRELL-JONES CONJECTURE FOR COCOMPACT LATTICES IN VIRTUALLY CONNECTED LIE GROUPS arXiv:1101.0469v2 [math.GT] 30 Jun 2013 ¨](https://www.pdfsearch.io/img/d9b6c5024eb7bc3fcc2669524afcf837.jpg "THE FARRELL-JONES CONJECTURE FOR COCOMPACT LATTICES IN VIRTUALLY CONNECTED LIE GROUPS arXiv:1101.0469v2 [math.GT] 30 Jun 2013 ¨")
![ERRATUM TO COCOMPACTLY CUBULATED GRAPH MANIFOLDS MARK F. HAGEN AND PIOTR PRZYTYCKI The following lemma is Lemma 4.7 of [HP15]. In the proof of part (2), we incorrectly invoked [CS11, PropHere we correct the proof](https://www.pdfsearch.io/img/192ae83d2c667a637cc53336948fe2e6.jpg "ERRATUM TO COCOMPACTLY CUBULATED GRAPH MANIFOLDS MARK F. HAGEN AND PIOTR PRZYTYCKI The following lemma is Lemma 4.7 of [HP15]. In the proof of part (2), we incorrectly invoked [CS11, PropHere we correct the proof")
