Description Usage Arguments Value Source
Calculates the average run length (ARL) for an upward CUSUM scheme for discrete distributions (i.e. Poisson and binomial) using the Markov chain approach.
1 2 |
h |
decision interval |
k |
reference value |
theta |
distribution parameter for the cumulative distribution function (cdf) F, i.e. rate λ for Poisson variates or probability p for binomial variates |
distr |
|
W |
Winsorizing value |
digits |
|
... |
further arguments for the distribution function, i.e. number of trials |
Returns a list with the ARL of the regular (zero-start)
and the fast initial response (FIR)
CUSUM scheme with reference value k
, decision interval h
for
X \sim F(θ), where F is the Poisson or binomial cdf
ARL |
one-sided ARL of the regular (zero-start) CUSUM scheme |
FIR.ARL |
one-sided ARL of the FIR CUSUM scheme with head start \frac{\code{h}}{2} |
Based on the FORTRAN code of
Hawkins, D. M. (1992). Evaluation of Average Run Lengths of Cumulative Sum Charts for an Arbitrary Data Distribution. Communications in Statistics - Simulation and Computation, 21(4), p. 1001-1020.
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