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arxiv: 1702.08205 · v1 · pith:3SBKULH3new · submitted 2017-02-27 · 🧮 math.GR

On flat submaps of maps of non-positive curvature

classification 🧮 math.GR
keywords mapscontainsflativanovonlyplaneschuppsubmaps
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We prove that for every $r>0$ if a non-positively curved $(p,q)$-map $M$ contains no flat submaps of radius $r$, then the area of $M$ does not exceed $Crn$ for some constant $C$. This strengthens a theorem of Ivanov and Schupp. We show that an infinite $(p,q)$-map which tessellates the plane is quasi-isometric to the Euclidean plane if and only if the map contains only finitely many non-flat vertices and faces. We also generalize Ivanov and Schupp's result to a much larger class of maps, namely to maps with angle functions.

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