Question: The Inhomogenous Poisson Counting Process MA is defined for t20 as follows (a) MO)=0 (b) MA has independent increments (c) For all to> ti, [a(v)dy

The Inhomogenous Poisson Counting Process MA is defined for t20 as follows (a) MO)=0 (b) MA has independent increments (c) For all to> ti, [a(v)dy PIN(t, ) - N(1,] = n! exp - ja(v)dv , n>0 2(4) is called the intensity function. Note that it is a function of time for Inhomogeneous Poissson Counting Processes. Compare this with a Uniform Poisson Counting Process where it is a constant and find a. Its mean function mean function LM() b. Its correlation function RAM( ti, to)

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