Perturbation of the stationary distribution measured by ergodicity coefficients

E. Seneta

doi:10.2307/1427277

Abstract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

It is shown that an easily calculated ergodicity coefficient of a stochastic matrix P with a unique stationary distribution πT, may be used to assess sensitivity of πT to perturbation of P.

References

[1] Funderlic, R. E. and Meyer, C. D. (1986) Sensitivity of the stationary distribution vector for an ergodic Markov chain. Linear Algebra Appl. 76, 1–17.CrossRef Google Scholar

[2] Schweitzer, P. J. (1968) Perturbation theory and finite Markov chains. J. Appl. Prob. 5, 401–413.Google Scholar

[3] Schweitzer, P. J. (1986) Posterior bounds on the equilibrium distribution of a finite Markov chain. Commun. Statist.-Stochastic Models 2, 323–338.Google Scholar

[4] Seneta, E. (1981) Non-Negative Matrices and Markov Chains, 2nd edn. Springer-Verlag, New York.Google Scholar

[5] Seneta, E. (1987) Sensitivity to perturbation of the stationary distribution: some refinements (submitted).Google Scholar

[6] Tan, C. P. (1982) A functional form for a particular coefficient of ergodicity. J. Appl. Prob. 19, 858–863.Google Scholar

[7] Tan, C. P. (1983) Coefficients of ergodicity with respect to vector norms. J. Appl. Prob. 20, 277–287.Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Goldstein, Jerome A. and Rieder, Gisèle Ruiz 1989. Advances in Computing and Control. Vol. 130, Issue. , p. 338.

Goldstein, Jerome A and Rieder, Gisèle Ruiz 1990. Continuous dependence of ergodic limits. Journal of Multivariate Analysis, Vol. 32, Issue. 1, p. 150.

Rhodius, Adolf 1993. On explicit forms for ergodicity coefficients. Linear Algebra and its Applications, Vol. 194, Issue. , p. 71.

Seneta, E. 1993. Sensitivity of finite Markov chains under perturbation. Statistics & Probability Letters, Vol. 17, Issue. 2, p. 163.

Hildenbrandt, R. 1993. A special stochastic decision problem. Optimization, Vol. 28, Issue. 1, p. 95.

Kirkland, Stephen J. Neumann, Michael and Shader, Bryan L. 1998. Applications of Paz's inequality to perturbation bounds for Markov chains. Linear Algebra and its Applications, Vol. 268, Issue. , p. 183.

Froyland, Gary 1998. Approximating physical invariant measures of mixing dynamical systems in higher dimensions. Nonlinear Analysis: Theory, Methods & Applications, Vol. 32, Issue. 7, p. 831.

Cho, Grace E. and Meyer, Carl D. 2000. Markov chain sensitivity measured by mean first passage times. Linear Algebra and its Applications, Vol. 316, Issue. 1-3, p. 21.

Kirkland, Stephen J. and Neumann, Michael 2000. Regular Markov chains for which the transition matrix has large exponent. Linear Algebra and its Applications, Vol. 316, Issue. 1-3, p. 45.

Cho, Grace E. and Meyer, Carl D. 2001. Comparison of perturbation bounds for the stationary distribution of a Markov chain. Linear Algebra and its Applications, Vol. 335, Issue. 1-3, p. 137.

Solan, Eilon and Vieille, Nicolas 2003. Perturbed Markov chains. Journal of Applied Probability, Vol. 40, Issue. 1, p. 107.

Neumann, Michael and Xu, Jianhong 2003. On the stability of the computation of the stationary probabilities of Markov chains using Perron complements. Numerical Linear Algebra with Applications, Vol. 10, Issue. 7, p. 603.

Hunter, Jeffrey J. 2005. Stationary distributions and mean first passage times of perturbed Markov chains. Linear Algebra and its Applications, Vol. 410, Issue. , p. 217.

Hunter, Jeffrey J. 2006. Mixing times with applications to perturbed Markov chains. Linear Algebra and its Applications, Vol. 417, Issue. 1, p. 108.

Pal, Ranadip Datta, Aniruddha and Dougherty, Edward R. 2007. Robustness of Intervention Strategies for Probabilistic Boolean Networks. p. 1.

Pal, R. Datta, A. and Dougherty, E.R. 2008. Robust Intervention in Probabilistic Boolean Networks. IEEE Transactions on Signal Processing, Vol. 56, Issue. 3, p. 1280.

Kirkland, Stephen J. Neumann, Michael and Sze, Nung-Sing 2008. On optimal condition numbers for Markov chains. Numerische Mathematik, Vol. 110, Issue. 4, p. 521.

Rabta, Boualem and Aïssani, Djamil 2008. Strong stability and perturbation bounds for discrete Markov chains. Linear Algebra and its Applications, Vol. 428, Issue. 8-9, p. 1921.

Mouhoubi, Zahir and Aïssani, Djamil 2010. New perturbation bounds for denumerable Markov chains. Linear Algebra and its Applications, Vol. 432, Issue. 7, p. 1627.

Ipsen, Ilse C. F. and Selee, Teresa M. 2011. Ergodicity Coefficients Defined by Vector Norms. SIAM Journal on Matrix Analysis and Applications, Vol. 32, Issue. 1, p. 153.

Download full list

Article contents

Perturbation of the stationary distribution measured by ergodicity coefficients

Abstract

Keywords

References

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Article contents

Perturbation of the stationary distribution measured by ergodicity coefficients

Abstract

Keywords

References

Save article to Kindle

Save article to Dropbox

Save article to Google Drive

Reply to: Submit a response

Your details

You have entered the maximum number of contributors

Conflicting interests