AbstractA digital search tree (DST) is a fundamental data structure on words that finds various applications from the popular Lempel–Zivʼ78 data compression scheme to distributed hash tables. The profile of a DST measures the number of nodes at the same distance from the root; it depends on the number of stored strings and the distance from the root. Most parameters of DST (e.g., depth, height, fillup) can be expressed in terms of the profile. We study here asymptotics of the average profile in a DST built from sequences generated independently by a memoryless source. After representing the average profile by a recurrence, we solve it using a wide range of analytic tools. This analysis is surprisingly demanding but once it is carried out it...
Version préliminaire (2006) d'un travail publié sous forme définitive (2009).International audienceI...
The goal of this research is twofold: (i) to analyze generalized digital search trees, and (ii) to d...
International audienceDigital trees, also known as $\textit{"tries''}$, are fundamental to a number ...
AbstractA digital search tree (DST) is a fundamental data structure on words that finds various appl...
A generalized Digital Search Tree (in short: b-DST), built from strings over a V-ary alphabet $\cal ...
International audienceThe digital search tree (dst) plays a central role in compres-sion algorithms,...
Ordinary digital search trees (DSTs) stores one word in each of its internal nodes and leaves, but a...
This thesis performs probabilistic analyses of the depth of digital trees [tries anddigital search t...
AbstractThis paper studies the average complexity of digital search trees from the successful search...
AbstractIn this paper distribution results are proved on the cost of insertion in digital search tre...
Digital trees are data structures that represent sets of strings according to their shared prefix st...
AbstractThe Lempel-Ziv parsing scheme finds a wide range of applications, most notably in data compr...
For random trees T generated by the binary search tree algorithm from uniformly distributed input we...
The goal of this research is threefold: (i) to analyze generalized digital search trees, (ii) to der...
AbstractWe study the height of the binary search tree—the most fundamental data structure used for s...
Version préliminaire (2006) d'un travail publié sous forme définitive (2009).International audienceI...
The goal of this research is twofold: (i) to analyze generalized digital search trees, and (ii) to d...
International audienceDigital trees, also known as $\textit{"tries''}$, are fundamental to a number ...
AbstractA digital search tree (DST) is a fundamental data structure on words that finds various appl...
A generalized Digital Search Tree (in short: b-DST), built from strings over a V-ary alphabet $\cal ...
International audienceThe digital search tree (dst) plays a central role in compres-sion algorithms,...
Ordinary digital search trees (DSTs) stores one word in each of its internal nodes and leaves, but a...
This thesis performs probabilistic analyses of the depth of digital trees [tries anddigital search t...
AbstractThis paper studies the average complexity of digital search trees from the successful search...
AbstractIn this paper distribution results are proved on the cost of insertion in digital search tre...
Digital trees are data structures that represent sets of strings according to their shared prefix st...
AbstractThe Lempel-Ziv parsing scheme finds a wide range of applications, most notably in data compr...
For random trees T generated by the binary search tree algorithm from uniformly distributed input we...
The goal of this research is threefold: (i) to analyze generalized digital search trees, (ii) to der...
AbstractWe study the height of the binary search tree—the most fundamental data structure used for s...
Version préliminaire (2006) d'un travail publié sous forme définitive (2009).International audienceI...
The goal of this research is twofold: (i) to analyze generalized digital search trees, and (ii) to d...
International audienceDigital trees, also known as $\textit{"tries''}$, are fundamental to a number ...