Motivated by applications in telecommunications, computer science and physics, we consider a discrete-time Markov process with restart in the Borel state space. At each step the process either with a positive probability restarts from a given distribution, or with the complementary probability continues according to a Markov transition kernel. The main focus of the present work is the expectation of the hitting time (to a given target set) of the process with restart, for which we obtain the explicit formula. Observing that the process with restart is positive Harris recurrent, we obtain the expression of its unique invariant probability. Then we show the equivalence of the following statements: (a) the boundedness (with respect to the initial state) of the expectation of the hitting time; (b) the finiteness of the expectation of the hitting time for almost all the initial states with respect to the unique invariant probability; and (c) the target set is of positive measure with respect to the invariant probability. We illustrate our results with two examples in uncountable and countable state spaces.
from HAL : Dernières publications http://ift.tt/1DjelOC
from HAL : Dernières publications http://ift.tt/1DjelOC
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