On the transient behaviour of the GI/G/1 waiting-times

Abstract

Consider a single-server queuing system, where the arrival intervals T_i and the service-times U_i of consecutive customers form two independent sequences of independent and equally distributed random variables. Assume that customers arriving when the server is busy line up and that they are then served in order of arrival. Let W_n be the waiting-time of the nth customer and suppose that the server is idle at the start, i.e. W₁ = 0. Put W = lim _n ∞ W_n when the limit exists. Furthermore, let F_n (⋅) be the c.d.f. of W_n and put EW_n =ω _n .