Recently the Multi-Level algorithm was introduced as a general purpose solver for the solution of steady state Markov chains. In this paper, we consider the performance of the Multi-Level algorithm for solving Nearly Completely Decomposable (NCD) Markov chains, for which special-purpose iteractive aggregation/disaggregation algorithms such as the Koury-McAllister-Stewart (KMS) method have been developed that can exploit the decomposability of the the Markov chain. We present experimental results indicating that the general-purpose Multi-Level algorithm is competitive, and can be significantly faster than the special-purpose KMS algorithm when Gauss-Seidel and Gaussian Elimination are used for solving the individual blocks
For the stationary analysis of large Markov chains in continuous and discrete time a wide variety of...
The paper presents a class of numerical methods to compute the stationary distribution of Markov cha...
The purpose of this paper is to describe the special problems that emerge when Gaussian elimination ...
A new iterative algorithm, the multi-level algorithm, for the numerical solution of steady state Mar...
We discuss the recently introduced multilevel algorithm for the steady-state solution of Markov chai...
Experimental results for large, sparse Markov chains, especially the ill-conditioned nearly complete...
Experimental results for large, sparse Markov chains, especially the ill-conditioned nearly complete...
This paper presents an improved version of a componentwise bounding algorithm for the state probabil...
Ankara : Department of Computer Engineering and Information Science and the Institute of Engineering...
This paper highlights an algorithm that computes, if possible, a nearly completely decomposable (NCD...
Abstract aI A new iterative algorithm, the multi-level algorithm, for the numerical solution of stea...
Cataloged from PDF version of article.This paper presents an improved version of a componentwise bou...
We consider a variant of the well-known Gauss-Seidel method for the solution of Markov chains in ste...
This paper illustrates the current state of development of an algorithm for the steady state soluti...
We discuss the recently introduced multilevel algorithm for the steady-state solution of Markov chai...
For the stationary analysis of large Markov chains in continuous and discrete time a wide variety of...
The paper presents a class of numerical methods to compute the stationary distribution of Markov cha...
The purpose of this paper is to describe the special problems that emerge when Gaussian elimination ...
A new iterative algorithm, the multi-level algorithm, for the numerical solution of steady state Mar...
We discuss the recently introduced multilevel algorithm for the steady-state solution of Markov chai...
Experimental results for large, sparse Markov chains, especially the ill-conditioned nearly complete...
Experimental results for large, sparse Markov chains, especially the ill-conditioned nearly complete...
This paper presents an improved version of a componentwise bounding algorithm for the state probabil...
Ankara : Department of Computer Engineering and Information Science and the Institute of Engineering...
This paper highlights an algorithm that computes, if possible, a nearly completely decomposable (NCD...
Abstract aI A new iterative algorithm, the multi-level algorithm, for the numerical solution of stea...
Cataloged from PDF version of article.This paper presents an improved version of a componentwise bou...
We consider a variant of the well-known Gauss-Seidel method for the solution of Markov chains in ste...
This paper illustrates the current state of development of an algorithm for the steady state soluti...
We discuss the recently introduced multilevel algorithm for the steady-state solution of Markov chai...
For the stationary analysis of large Markov chains in continuous and discrete time a wide variety of...
The paper presents a class of numerical methods to compute the stationary distribution of Markov cha...
The purpose of this paper is to describe the special problems that emerge when Gaussian elimination ...