Profiles of random trees: correlation and width of random recursive trees and binary search trees
2005 ◽
Vol 37
(2)
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pp. 321-341
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In a tree, a level consists of all those nodes that are the same distance from the root. We derive asymptotic approximations to the correlation coefficients of two level sizes in random recursive trees and binary search trees. These coefficients undergo sharp sign-changes when one level is fixed and the other is varying. We also propose a new means of deriving an asymptotic estimate for the expected width, which is the number of nodes at the most abundant level. Crucial to our methods of proof is the uniformity achieved by singularity analysis.
2005 ◽
Vol 37
(02)
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pp. 321-341
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Keyword(s):
2002 ◽
Vol 11
(6)
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pp. 587-597
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2010 ◽
Vol 19
(4)
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pp. 561-578
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Keyword(s):
2012 ◽
Vol 21
(3)
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pp. 412-441
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Keyword(s):
Keyword(s):
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