TY - JOUR
T1 - Expanders with respect to Hadamard spaces and random graphs
AU - Mendel, Manor
AU - Naor, Assaf
N1 - Publisher Copyright:
© 2015.
PY - 2015
Y1 - 2015
N2 - It is shown that there exist a sequence of 3-regular graphs {Gn}∞n=1 and a Hadamard space X such that {Gn}∞n=1 forms an expander sequence with respect to X, yet random regular graphs are not expanders with respect to X. This answers a question of the second author and Silberman. The graphs {Gn}∞n=1 are also shown to be expanders with respect to random regular graphs, yielding a deterministic sublineartime constant-factor approximation algorithm for computing the average squared distance in subsets of a random graph. The proof uses the Euclidean cone over a random graph, an auxiliary continuous geometric object that allows for the implementation of martingale methods.
AB - It is shown that there exist a sequence of 3-regular graphs {Gn}∞n=1 and a Hadamard space X such that {Gn}∞n=1 forms an expander sequence with respect to X, yet random regular graphs are not expanders with respect to X. This answers a question of the second author and Silberman. The graphs {Gn}∞n=1 are also shown to be expanders with respect to random regular graphs, yielding a deterministic sublineartime constant-factor approximation algorithm for computing the average squared distance in subsets of a random graph. The proof uses the Euclidean cone over a random graph, an auxiliary continuous geometric object that allows for the implementation of martingale methods.
UR - http://www.scopus.com/inward/record.url?scp=84930859553&partnerID=8YFLogxK
U2 - 10.1215/00127094-3119525
DO - 10.1215/00127094-3119525
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AN - SCOPUS:84930859553
SN - 0012-7094
VL - 164
SP - 1471
EP - 1548
JO - Duke Mathematical Journal
JF - Duke Mathematical Journal
IS - 8
ER -