In the present paper we consider a generalized class of extended binary trees in which leaves are distinguished in order to represent the location of a key within a trie of the same structure. We prove an exact asymptotic equivalent to the average stack-size of trees with α internal nodes and β leaves corresponding to keys; we assume that all trees with the same parameters α and β have the same probability. The assumption of that uniform model is motivated for example by the usage of tries for the compression of blockcodes. Furthermore, we will prove asymptotics for the r-th moments of the stack-size and we will show that a normalized stack-size possesses a theta distribution in the limit
The performance of low-density parity-check (LDPC) codes in the error floor region is closely relate...
Tries and patricia tries are two popular data structures for storing strings. Let Hn denote the heig...
In a recently proposed graphical compression algorithm by Choi and Szpankowski (2009), the following...
In the present paper we consider a generalized class of extended binary trees in which leaves are ...
In the present paper we consider a generalized class of extended binary trees in which leaves are di...
AbstractIn this paper, we introduce a class of extended binary trees that resembles all possible tre...
Digital trees or tries are a general purpose flexible data structure that implements dictionaries b...
Nebel M. The stack-size of tries: a combinatorial study. Theor. Comput. Sci. 2002;270(1-2):441--461
We give general theorems on asymptotic normality for additive functionals of random tries generated ...
We consider random tries and random patricia trees constructed from n independent strings of symbols...
AbstractWe consider random tries and random PATRICIA trees constructed from n independent strings of...
Abstract. We study a class of adaptive multi-digit tries, in which the numbers of digits rn processe...
LC tries were introduced by Andersson and Nilsson in 1993. They are compacted versions of tries or p...
A widely used class of binary trees is studied in order to provide information useful in evaluating ...
International audienceRecently, Aspnes and Ruppert (DISC 2016) defined the following simple random e...
The performance of low-density parity-check (LDPC) codes in the error floor region is closely relate...
Tries and patricia tries are two popular data structures for storing strings. Let Hn denote the heig...
In a recently proposed graphical compression algorithm by Choi and Szpankowski (2009), the following...
In the present paper we consider a generalized class of extended binary trees in which leaves are ...
In the present paper we consider a generalized class of extended binary trees in which leaves are di...
AbstractIn this paper, we introduce a class of extended binary trees that resembles all possible tre...
Digital trees or tries are a general purpose flexible data structure that implements dictionaries b...
Nebel M. The stack-size of tries: a combinatorial study. Theor. Comput. Sci. 2002;270(1-2):441--461
We give general theorems on asymptotic normality for additive functionals of random tries generated ...
We consider random tries and random patricia trees constructed from n independent strings of symbols...
AbstractWe consider random tries and random PATRICIA trees constructed from n independent strings of...
Abstract. We study a class of adaptive multi-digit tries, in which the numbers of digits rn processe...
LC tries were introduced by Andersson and Nilsson in 1993. They are compacted versions of tries or p...
A widely used class of binary trees is studied in order to provide information useful in evaluating ...
International audienceRecently, Aspnes and Ruppert (DISC 2016) defined the following simple random e...
The performance of low-density parity-check (LDPC) codes in the error floor region is closely relate...
Tries and patricia tries are two popular data structures for storing strings. Let Hn denote the heig...
In a recently proposed graphical compression algorithm by Choi and Szpankowski (2009), the following...