Maurice Tutor
$15/per page/Negotiable
Consider a renewal process with interarrivai distribution G0(x). Suppose each event is kept with probability q and deleted with probability 1 — 5, and then the time scale is expanded by a factor ljq (see Problem 19). Show that the mean interarrivai time is the same for the original and the new process. Repeat the above operation of deletion and scale expansion to obtain a sequence of renewal processes with interarrivai distribution given by G(n)(x) after n such transformations of the process. In all these operations q is held fixed. Show that if 0<>
