Premium
The correlated random walk in continuous time with barriers
Author(s) -
Kapadia Asha Seth
Publication year - 1975
Publication title -
canadian journal of statistics
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.804
H-Index - 51
eISSN - 1708-945X
pISSN - 0319-5724
DOI - 10.2307/3315098
Subject(s) - laplace transform , position (finance) , random walk , constant (computer programming) , mathematics , statistical physics , distribution (mathematics) , instant , point (geometry) , scale (ratio) , probability distribution , mathematical analysis , statistics , physics , computer science , geometry , quantum mechanics , finance , economics , programming language
In this paper correlation has been introduced between two successive transitions in the model investigated by Moyal and Heathcote (1959). The transition rate has been taken to be constant and for simplicity of mathematical expressions the time scale has been so chosen that this rate is unity. For the unrestricted walk we find that the mean position of the particle at time t is that position for which the probability of the particle arriving at some earlier instant from the left is 1/2. With both the barriers either absorbing or reflecting, we have obtained the Laplace Transform of the distributions, but because of the complicated nature of the mathematical expressions involved we are able to find only the asymptotic distributions. For the reflecting barrier case, we find that the process tends to a stationary distribution and that the expected position is eventually the middle point between the barriers.