问题1:
Let (Nt) be a Poisson process with rate lamda (and N0 = 0). Show that for s, t >= 0,
E[NtNt+s] = lamda* t (1 + lamda* (t + s))
问题2:
During a four-hour working session at a factory, errors occur according to a
Poisson process with time-dependent rate lamda(t) = 0.2 t, 0 <= t <= 4. Specify the
distribution of the number of errors made in a working-session and evaluate the
probability that more than one error is made in the session.
请知道的朋友帮忙解答一下。谢谢
Let (Nt) be a Poisson process with rate lamda (and N0 = 0). Show that for s, t >= 0,
E[NtNt+s] = lamda* t (1 + lamda* (t + s))
问题2:
During a four-hour working session at a factory, errors occur according to a
Poisson process with time-dependent rate lamda(t) = 0.2 t, 0 <= t <= 4. Specify the
distribution of the number of errors made in a working-session and evaluate the
probability that more than one error is made in the session.
请知道的朋友帮忙解答一下。谢谢