Add to ORKGWe propose a new conjecture on some exponential sums. These particular sums have not apparently been considered in the literature. Subject to the conjecture we obtain the first effective construction of asymptotically good tree codes. The available numerical evidence is consistent with the conjecture and is sufficient to certify codes for significant-length communications
The performance of low-density parity-check (LDPC) codes in the error floor region is closely relate...
This paper explores the applications of a recent bound on some Weil-type exponential sums over Galoi...
In the present paper we consider a generalized class of extended binary trees in which leaves are di...
We propose a new conjecture on some exponential sums. These particular sums have not apparently bee...
AbstractThis paper introduces a new complexity measure for binary sequences, the tree complexity. Th...
tic analysis of algorithms Exponential tail bounds are derived for solutions of max-recursive equati...
Abstract. The number of “nonequivalent ” Huffman codes of length r over an alphabet of size t has be...
AbstractThe objective of this paper is to study, by new formal methods, the notion of tree code intr...
AbstractThis is a survey of some results recently obtained on the distribution of the weights of som...
AbstractWe investigate code trees and search trees with cost functions that increase exponentially w...
AbstractWe apply relations of n-dimensional Kloosterman sums to exponential sums over finite fields ...
International audienceWe study the asymptotic number of certain monotonically labeled increasing tre...
A new technique, based on the pseudo-random properties of certain graphs, known as expanders, is use...
We present various applications of the probabilistic method and polynomial method in additive combin...
36 pages, 14 figuresA compacted binary tree is a directed acyclic graph encoding a binary tree in wh...
The performance of low-density parity-check (LDPC) codes in the error floor region is closely relate...
This paper explores the applications of a recent bound on some Weil-type exponential sums over Galoi...
In the present paper we consider a generalized class of extended binary trees in which leaves are di...
We propose a new conjecture on some exponential sums. These particular sums have not apparently bee...
AbstractThis paper introduces a new complexity measure for binary sequences, the tree complexity. Th...
tic analysis of algorithms Exponential tail bounds are derived for solutions of max-recursive equati...
Abstract. The number of “nonequivalent ” Huffman codes of length r over an alphabet of size t has be...
AbstractThe objective of this paper is to study, by new formal methods, the notion of tree code intr...
AbstractThis is a survey of some results recently obtained on the distribution of the weights of som...
AbstractWe investigate code trees and search trees with cost functions that increase exponentially w...
AbstractWe apply relations of n-dimensional Kloosterman sums to exponential sums over finite fields ...
International audienceWe study the asymptotic number of certain monotonically labeled increasing tre...
A new technique, based on the pseudo-random properties of certain graphs, known as expanders, is use...
We present various applications of the probabilistic method and polynomial method in additive combin...
36 pages, 14 figuresA compacted binary tree is a directed acyclic graph encoding a binary tree in wh...
The performance of low-density parity-check (LDPC) codes in the error floor region is closely relate...
This paper explores the applications of a recent bound on some Weil-type exponential sums over Galoi...
In the present paper we consider a generalized class of extended binary trees in which leaves are di...