Surfaces of small diameter with large width
classification
🧮 math.DG
keywords
diameterwidthanswersareaboundingconstantconstructcycle
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Given a 2-dimensional surface M and a constant C we construct a Riemannian metric g, so that diameter diam(M,g)=1 and every 1-cycle dividing M into two regions of equal area has length >C. It follows that there exists no universal inequality bounding 1-width of M in terms of its diameter. This answers a question of Stephane Sabourau.
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