We develop a stochastic approximation version of the classical Kaczmarz algorithm that is incremental in nature and takes as input noisy real time data. Our analysis shows that with probability one it mimics the behavior of the original scheme: starting from the same initial point, our algorithm and the corresponding deterministic Kaczmarz algorithm converge to precisely the same point. The motivation for this work comes from network tomography where network parameters are to be estimated based upon end-to-end measurements. Numerical examples via Matlab based simulations demonstrate the efficacy of the algorithm. (C) 2013 Elsevier Ltd. All rights reserved
This article studies the problem of reconstructing the topology of a network of interacting agents v...
The Kaczmarz’s alternating projection method has been widely used for solving a consistent (mostly o...
Passive network tomography uses end-to-end observations of network communication to characterize the...
In this paper is shown, how delay properties of the edges of a network with stochastic properties ca...
We propose two new algebraic reconstruction techniques based on Kaczmarz's method that produce a reg...
In this work we show how existing network coding algorithms can be used to perform network tomograph...
This work considers a diffusion network responding to streaming data, and studies the problem of ide...
The Kaczmarz method for solving linear systems of equations is an iterative algorithm that ...
Abstract — In this work we show how existing network coding algorithms can be used to perform networ...
Abstract Random fields serve as natural models for patterns with random fluctuations. Given a parame...
This work considers the problem of reconstructing the topology of a network of interacting agents vi...
As an active branch of network tomography, delay tomography has received considerable attentions in ...
Network tomography aims to obtain link-level performance characteristics, such as loss rate and aver...
AbstractIn this paper, we present a constrained version of Kaczmarz extended algorithm for improving...
Solving systems of linear equations, iterative methods are widely used for computing e ciency, thoug...
This article studies the problem of reconstructing the topology of a network of interacting agents v...
The Kaczmarz’s alternating projection method has been widely used for solving a consistent (mostly o...
Passive network tomography uses end-to-end observations of network communication to characterize the...
In this paper is shown, how delay properties of the edges of a network with stochastic properties ca...
We propose two new algebraic reconstruction techniques based on Kaczmarz's method that produce a reg...
In this work we show how existing network coding algorithms can be used to perform network tomograph...
This work considers a diffusion network responding to streaming data, and studies the problem of ide...
The Kaczmarz method for solving linear systems of equations is an iterative algorithm that ...
Abstract — In this work we show how existing network coding algorithms can be used to perform networ...
Abstract Random fields serve as natural models for patterns with random fluctuations. Given a parame...
This work considers the problem of reconstructing the topology of a network of interacting agents vi...
As an active branch of network tomography, delay tomography has received considerable attentions in ...
Network tomography aims to obtain link-level performance characteristics, such as loss rate and aver...
AbstractIn this paper, we present a constrained version of Kaczmarz extended algorithm for improving...
Solving systems of linear equations, iterative methods are widely used for computing e ciency, thoug...
This article studies the problem of reconstructing the topology of a network of interacting agents v...
The Kaczmarz’s alternating projection method has been widely used for solving a consistent (mostly o...
Passive network tomography uses end-to-end observations of network communication to characterize the...