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Title: mortality estimation
Description: This note allows master's and bachelorβs students to learn mortality estimation, which helps you to estimate individual or group mortality with limited information. It is as straightforward as possible.
Description: This note allows master's and bachelorβs students to learn mortality estimation, which helps you to estimate individual or group mortality with limited information. It is as straightforward as possible.
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Mortality Estimation
Empirical Estimator For Complete Data
Individual data
1
...
The empirical distribution is a distribution based on a study
1
with n observations
...
2
...
m
...
Grouped data is a data set that has a set of intervals and the number of observations in each interval
but does not provide the exact value of each observation
...
2
...
For mortality grouped by age, use of the ogive
to determine survival time is the same as using UDD
...
ππ
ππ (π₯) =
π(ππ β ππβ1 )
Where x is in the interval [ππ β ππβ1 ), there are ππ in the interval and n points altogether
...
We treat a censored
observation as a grouped observation
...
If data
are left censored, we know an observation is below d but not the exact value, then the likelihood
is πΉ(π)
...
If data are left truncated at d, then the likelihood of x is
π(π₯)
π(π₯)
=
Pr(π > π) 1 β πΉ(π)
-
For the rarer case of right truncated data, the likelihood of x is
π(π₯)
π(π₯)
=
Pr(π > π) πΉ(π’)
Where for the expression on the right side we are assuming that X is a continuous random
variable
...
Grouped data that are between d and ππ in the presence of truncation at d has likelihood
πΉ(ππ )βπΉ(π)
1βπΉ(π)
...
Formula
πβ1
π π
ππ (π‘) = β (1 β ) ,
ππ
π¦πβ1 β€ π‘ β€ π¦π
π=1
-
-
π (π¦ ) β ππ (π¦π ),
π₯ = π¦π , 1 β€ π β€ π
π(π₯) = { π πβ1
0,
ππ‘βπππ€ππ π
Discrete failure rate function: For a discrete random variable that has nonzero probability only
for a set of values π¦π ,
π(π¦π )
β(π¦π ) = Pr(π = π¦π |π β₯ π¦π ) =
,
1β€πβ€π
π(π¦πβ1 )
Hazard rate function for a continuous distribution,
π(π₯)
β(π₯) =
π(π₯)
π(π¦π ) = π(π¦πβ1 ) β π(π¦π )
π(π¦π )
β(π¦π ) = 1 β
π(π¦πβ1 )
π
π(π¦π ) = β (1 β β(π¦π ))
πβ1
π=1
π
π(π¦π ) = π(π¦πβ1 ) β π(π¦π ) = β (1 β β(π¦π )) β β (1 β β(π¦π ))
πβ1
π=1
π=1
πβ1
= β (1 β β(π¦π )) (1 β (1 β β(π¦π ))) = β(π¦π ) β (1 β β(π¦π ))
π=1
π=1
-
Let ππ = β(π¦π ) and using maximum likelihood to estimate ππ
...
Withdrawals at the time of deaths do count in the risk set
...
Tail correction
- Def: Extrapolation of the survival function past the last time in the study
...
Otherwise, there are two extreme
options:
o Efronβs tail correction: assume nobody survives past π¦πππ₯ , ππ (π¦) β₯ 0 for π¦ β₯ π¦πππ₯
o Klein and Moeschbergerβs tail correction: assume nobody dies past π¦πππ₯ until some
plausible upper limit πΎ for survival time,
π (π¦ ),
π¦πππ₯ β€ π¦ < πΎ
ππ (π¦) = { π π
0,
π¦β₯πΎ
- Brown, Hollander, and Korwarβs exponential tail correction:
π¦
ππ (π¦) = ππ (π¦π )π¦πππ₯ , π¦ β₯ π¦πππ₯
Title: mortality estimation
Description: This note allows master's and bachelorβs students to learn mortality estimation, which helps you to estimate individual or group mortality with limited information. It is as straightforward as possible.
Description: This note allows master's and bachelorβs students to learn mortality estimation, which helps you to estimate individual or group mortality with limited information. It is as straightforward as possible.