8,716 research outputs found
B-urns
The fringe of a B-tree with parameter is considered as a particular
P\'olya urn with colors. More precisely, the asymptotic behaviour of this
fringe, when the number of stored keys tends to infinity, is studied through
the composition vector of the fringe nodes. We establish its typical behaviour
together with the fluctuations around it. The well known phase transition in
P\'olya urns has the following effect on B-trees: for , the
fluctuations are asymptotically Gaussian, though for , the
composition vector is oscillating; after scaling, the fluctuations of such an
urn strongly converge to a random variable . This limit is -valued and it does not seem to follow any classical law. Several properties
of are shown: existence of exponential moments, characterization of its
distribution as the solution of a smoothing equation, existence of a density
relatively to the Lebesgue measure on , support of . Moreover, a
few representations of the composition vector for various values of
illustrate the different kinds of convergence
Fringe trees, Crump-Mode-Jagers branching processes and -ary search trees
This survey studies asymptotics of random fringe trees and extended fringe
trees in random trees that can be constructed as family trees of a
Crump-Mode-Jagers branching process, stopped at a suitable time. This includes
random recursive trees, preferential attachment trees, fragmentation trees,
binary search trees and (more generally) -ary search trees, as well as some
other classes of random trees.
We begin with general results, mainly due to Aldous (1991) and Jagers and
Nerman (1984). The general results are applied to fringe trees and extended
fringe trees for several particular types of random trees, where the theory is
developed in detail. In particular, we consider fringe trees of -ary search
trees in detail; this seems to be new.
Various applications are given, including degree distribution, protected
nodes and maximal clades for various types of random trees. Again, we emphasise
results for -ary search trees, and give for example new results on protected
nodes in -ary search trees.
A separate section surveys results on height, saturation level, typical depth
and total path length, due to Devroye (1986), Biggins (1995, 1997) and others.
This survey contains well-known basic results together with some additional
general results as well as many new examples and applications for various
classes of random trees
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