In the message transmission system in Problem 5.3.2, the solution to Problem 5.5.2 is a formula for the PMF of J, the number of transmissions of individual messages. For p = 0.8, find the expected value vector E[J], the correlation matrix RJ, and the covariance matrix CJ.
Problem 5.3.2
A wireless data terminal has three messages waiting for transmission. After sending a message, it expects an acknowledgement from the receiver. When it receives the acknowledgement, it transmits the next message. If the acknowledgement does not arrive, it sends the message again. The probability of successful transmission of a message is p independent of other transmissions. Let K = [K1 K2 K3] be the 3-dimensional random vector in which Ki is the total number of transmissions when message i is received successfully. (K3 is the total number of transmissions used to send all three messages.) Show that
(a) Find the PMF of K.
(b) For each j ∈ {1, 2,..., n - 1}, find the marginal PMF PK1,K2,...,K j(k1, k2,..., kj)
(c) For each i ∈ {1, 2,..., n}, find the marginal PMF PKi(ki).