Definition of Laplace Transforms for Distribution of the First Passage of Zero Level of the Semi-Markov Random Process with Positive Tendency and Negative Jump ()
Abstract
One of the important problems of stochastic process theory is to define the Laplace transforms for the distribution of semi-markov random processes. With this purpose, we will investigate the semimarkov random processes with positive tendency and negative jump in this article. The first passage of the zero level of the process will be included as a random variable. The Laplace transforms for the distribution of this random variable is defined. The parameters of the distribution will be calculated on the basis of the final results.
Share and Cite:
T. Nasirova and U. Kerimova, "Definition of Laplace Transforms for Distribution of the First Passage of Zero Level of the Semi-Markov Random Process with Positive Tendency and Negative Jump,"
Applied Mathematics, Vol. 2 No. 7, 2011, pp. 908-911. doi:
10.4236/am.2011.27122.
Conflicts of Interest
The authors declare no conflicts of interest.
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