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On quasi-Markov random fields

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  • Chay, S. C.

Abstract

In this paper we define the quasi-Markov property and give a complete characterization of a stationary Gaussian quasi-Markov process. We show that the only stationary Gaussian quasi-Markov process on the whole real line is a Markov process, but there exists a non-Markovian singular stationary Gaussian quasi-Markov process on the set of all the integers. The Markov property implies the quasi-Markov property, and a sufficient condition for a stationary quasi-Markov process to be Markov is given. Following Rozanov we define a generalized notion of boundary, called an L-boundary, and the L-Markov property, and we give a discussion of the uniqueness of a probability distribution corresponding to a family of conditional distributions for the stationary Gaussian L-Markov case. A characterization of the stationary Gaussian L-field is given in terms of the spectral distribution as well as a discussion of the relationship between L-Markov and L-field. We study the existence of a properly nonsingular-stationary Gaussian L-field and show that it can exist only in three or higher dimensions. We also discuss the technique of the best linear interpolation in mean-square and show how this technique can be used in studying the above problems.

Suggested Citation

  • Chay, S. C., 1972. "On quasi-Markov random fields," Journal of Multivariate Analysis, Elsevier, vol. 2(1), pages 14-76, March.
    • Handle: RePEc:eee:jmvana:v:2:y:1972:i:1:p:14-76
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    Cited by:

    1. Lévy, Bernard C., 1997. "Characterization of Multivariate Stationary Gaussian Reciprocal Diffusions, ," Journal of Multivariate Analysis, Elsevier, vol. 62(1), pages 74-99, July.
    2. Giovanni Conforti & Paolo Dai Pra & Sylvie Rœlly, 2017. "Reciprocal Class of Jump Processes," Journal of Theoretical Probability, Springer, vol. 30(2), pages 551-580, June.

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