TY - GEN
T1 - Markov convexity and local rigidity of distorted metrics
AU - Mendel, Manor
AU - Naor, Assaf
PY - 2008
Y1 - 2008
N2 - The geometry of discrete tree metrics is studied from the following perspectives: (1) Markov p-convexity, which was shown by Lee, Naor, and Peres to be a property of p-convex Banach space, is shown here to be equivalent to p-convexity of Banach spaces. (2) On the other hand, there exists an example of a metric space which is not Markov p-convex for any p < ∞, but does not uniformly contain complete binary trees. Note that the previous item implies that Banach spaces contain complete binary trees uniformly if and only if they are not Markov p-convex for any p < ∞. (3) For every B > 4, a metric space X is constructed such that all tree metrics can be embedded in X with distortion at most B, but when large complete binary trees are embedded in X, the distortion tends to B. Therefore the class of finite tree metrics do exhibit a dichotomy in the distortions achievable when embedding them in other metric spaces. This is in contrast to the dichotomy exhibited by the class of finite subsets of L1, and the class of all finite metric spaces.
AB - The geometry of discrete tree metrics is studied from the following perspectives: (1) Markov p-convexity, which was shown by Lee, Naor, and Peres to be a property of p-convex Banach space, is shown here to be equivalent to p-convexity of Banach spaces. (2) On the other hand, there exists an example of a metric space which is not Markov p-convex for any p < ∞, but does not uniformly contain complete binary trees. Note that the previous item implies that Banach spaces contain complete binary trees uniformly if and only if they are not Markov p-convex for any p < ∞. (3) For every B > 4, a metric space X is constructed such that all tree metrics can be embedded in X with distortion at most B, but when large complete binary trees are embedded in X, the distortion tends to B. Therefore the class of finite tree metrics do exhibit a dichotomy in the distortions achievable when embedding them in other metric spaces. This is in contrast to the dichotomy exhibited by the class of finite subsets of L1, and the class of all finite metric spaces.
KW - Bd-ramsey
KW - Markov convexity
KW - Metric dichotomy
KW - P-convexity
KW - Tree metrics
KW - Uniform convexity
UR - http://www.scopus.com/inward/record.url?scp=57349111077&partnerID=8YFLogxK
U2 - 10.1145/1377676.1377686
DO - 10.1145/1377676.1377686
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AN - SCOPUS:57349111077
SN - 9781605580715
T3 - Proceedings of the Annual Symposium on Computational Geometry
SP - 49
EP - 58
BT - Proceedings of the 24th Annual Symposium on Computational Geometry 2008, SCG'08
T2 - 24th Annual Symposium on Computational Geometry, SCG'08
Y2 - 9 June 2008 through 11 June 2008
ER -