Results 1  10
of
21,357
Why Asymptotic Results:
"... Represents a signal of length n having k nonzero elements with m measurements, where k < m << n. 2 Decoder: Tries to recover back the original signal based on the measurements. Goal Study the asymptotic behaviour of NodeBased VerificationBased (NBVB) algorithms over random regular bipar ..."
Abstract
 Add to MetaCart
Represents a signal of length n having k nonzero elements with m measurements, where k < m << n. 2 Decoder: Tries to recover back the original signal based on the measurements. Goal Study the asymptotic behaviour of NodeBased VerificationBased (NBVB) algorithms over random regular
Asymptotic results for silent elimination
 DISCRETE MATHEMATICS AND THEORETICAL COMPUTER SCIENCE
"... Following the model of Bondesson, Nilsson, and Wikstrand, we consider randomly filled urns, where the probability of falling into urn i is the geometric probability (1 − q)q i−1. Assuming n independent random entries, and a fixed parameter k, the interest is in the following parameters: Let T be the ..."
Abstract

Cited by 1 (1 self)
 Add to MetaCart
T be the smallest index, such that urn T is nonempty, but the following k are empty, then: XT = number of balls in urn T, ST = number of balls in urns with index larger than T, and finally T itself. We analyse the recursions (that appeared earlier) precisely, and derive results about the joint distribution of a
Asymptotic results in survey sampling:
"... rejective sampling inclusion probabilities and application to high order correlations ..."
Abstract
 Add to MetaCart
rejective sampling inclusion probabilities and application to high order correlations
Critical Power for Asymptotic Connectivity in Wireless Networks
, 1998
"... : In wireless data networks each transmitter's power needs to be high enough to reach the intended receivers, while generating minimum interference on other receivers sharing the same channel. In particular, if the nodes in the network are assumed to cooperate in routing each others ' pack ..."
Abstract

Cited by 541 (19 self)
 Add to MetaCart
as the number of nodes in the network goes to infinity. It is shown that if n nodes are placed in a disc of unit area in ! 2 and each node transmits at a power level so as to cover an area of ßr 2 = (log n + c(n))=n, then the resulting network is asymptotically connected with probability one if and only
Panel Cointegration; Asymptotic and Finite Sample Properties of Pooled Time Series Tests, With an Application to the PPP Hypothesis; New Results. Working paper
, 1997
"... We examine properties of residualbased tests for the null of no cointegration for dynamic panels in which both the shortrun dynamics and the longrun slope coefficients are permitted to be heterogeneous across individual members of the panel+ The tests also allow for individual heterogeneous fixed ..."
Abstract

Cited by 529 (13 self)
 Add to MetaCart
We examine properties of residualbased tests for the null of no cointegration for dynamic panels in which both the shortrun dynamics and the longrun slope coefficients are permitted to be heterogeneous across individual members of the panel+ The tests also allow for individual heterogeneous fixed effects and trend terms, and we consider both pooled within dimension tests and group mean between dimension tests+ We derive limiting distributions for these and show that they are normal and free of nuisance parameters+ We also provide Monte Carlo evidence to demonstrate their small sample size and power performance, and we illustrate their use in testing purchasing power parity for the post–Bretton Woods period+ 1.
On The Distribution And Asymptotic Results For Exponential Functionals Of Lévy Processes
, 1997
"... The aim of this note is to study the distribution and the asymptotic behavior of the exponential functional A t := R t 0 e s ds, where ( s ; s 0) denotes a L'evy process. When A1 ! 1, we show that in most cases, the law of A1 is a solution of an integrodifferential equation ; moreover, ..."
Abstract

Cited by 105 (11 self)
 Add to MetaCart
The aim of this note is to study the distribution and the asymptotic behavior of the exponential functional A t := R t 0 e s ds, where ( s ; s 0) denotes a L'evy process. When A1 ! 1, we show that in most cases, the law of A1 is a solution of an integrodifferential equation ; moreover
Asymptotic results on the length of coalescent trees
 Ann. Appl. Prob
"... Abstract. We give the asymptotic distribution of the length of partial coalescent trees for Beta and related coalescents. This allows us to give the asymptotic distribution of the number of (neutral) mutations in the partial tree. This is a first step to study the asymptotic distribution of a natura ..."
Abstract

Cited by 23 (2 self)
 Add to MetaCart
Abstract. We give the asymptotic distribution of the length of partial coalescent trees for Beta and related coalescents. This allows us to give the asymptotic distribution of the number of (neutral) mutations in the partial tree. This is a first step to study the asymptotic distribution of a
Asymptotic results for multiplexing subexponential onoff processes
 Advances in Applied Probability
, 1998
"... Consider an aggregate arrival process AN obtained by multiplexing N OnOff processes with exponential Off periods of rate λ and subexponential On periods τon. As N goes to infinity, with λN → Λ, AN approaches an M/G/ ∞ type process. Both for finite and infinite N, we obtain the asymptotic characteri ..."
Abstract

Cited by 78 (18 self)
 Add to MetaCart
characterization of the arrival process activity period. Using these results we investigate a fluid queue with the limiting M/G/ ∞ arrival process A ∞ t and capacity c. When On periods are regularly varying (with noninteger exponent), we derive a precise asymptotic behavior of the queue length random variable QP
Results 1  10
of
21,357