PMLE.Clayton.Exponential: Parametric Inference for Bivariate Exponential Models with...
In depend.truncation: Statistical Methods for the Analysis of Dependently Truncated Data
Description
Usage
Arguments
Details
Value
Author(s)
References
Examples
Description
Maximum likelihood estimation (MLE) for dependent truncation data under
the Clayton copula with Exponential margins for a bivariate lifetimes (L, X). The truncated data (L_j, X_j), subject to L_j<=X_j for all j=1, ..., n,
are used to obtain the MLE for the population parameters of (L, X).
Usage
1
2
PMLE.Clayton.Exponential(l.trunc, x.trunc, GOF = TRUE,
Err=3, alpha_max=20,alpha_min=10^-4)
Arguments
l.trunc
vector of truncation variables satisfying l.trunc<=x.trunc
x.trunc
vector of variables satisfying l.trunc<=x.trunc
GOF
if TRUE, a goodness-of-fit test statistics is computed
Err
tuning parameter in the NR algorithm
alpha_max
upper bound for the copula parameter
alpha_min
lower bound for the copula parameter
Details
Original paper is submitted for review
Value
n
sample size
alpha
dependence parameter
lambda_L
scale parameter of L
lambda_X
scale parameter of X
mean_X
Mean lifetime of X, defined as E[X]
logL
Maximized log-likelihood
c
inclusion probability, defined by c=Pr(L<=X)
C
Cramer-von Mises goodness-of-fit test statistics
K
Kolmogorov-Smirnov goodness-of-fit test statistics
Author(s)
Takeshi Emura, Chi-Hung Pan
References
Emura T, Pan CH (2017), Parametric likelihood inference and goodness-of-fit for dependently left-truncated data, a copula-based approach, Statistical Papers, doi:10.1007/s00362-017-0947-z.
Examples
1
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4
5
6
7
8
9
10
11
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14
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16
17
18
19
20
21
22
23
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25
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27
28
29
30
l.trunc=c(22.207,23.002,23.982,28.551,21.789,17.042,25.997,23.220,18.854,21.857,
27.321,13.767,23.982,20.110,15.779,26.821,27.934,15.292,28.843,15.985,
23.580,53.770,21.731,28.844,17.046,16.506,15.696,27.959,13.272,16.482,
24.210,17.626,27.770,
18.264,17.694,20.014,13.152,16.886,14.894,15.531,6.951,15.841,14.974,
38.292,11.204,38.156,26.652,17.101,28.953,18.325,18.391,18.220,15.896,
16.447,23.642,19.170,23.257,20.428,20.947,28.462,23.210,17.900,46.134,
39.300,11.768,17.717,
30.863,22.350,44.976,18.169,30.164,21.822,18.201,22.895,27.189,10.915,
25.503,12.350,39.869,17.698,26.296,14.091,21.011,11.201,10.757,25.692,
32.372,13.592,19.102,16.112,53.281,57.298,36.450,19.651,20.755,30.788,20.0,39.62)
x.trunc = c(38.701,49.173,42.409,73.823,46.738,44.071,61.904,39.327,49.828,46.314,
56.150,50.549,54.930,54.039,49.170,44.795,72.238,107.783,81.609,45.228,
124.637,64.018,82.957,143.550,43.382,69.644,74.750,32.881,51.483,31.767,
77.633,63.745,82.965,
24.818,68.762,68.762,89.100,64.979,65.127,59.289,53.926,79.370,47.385,
61.395,72.826,53.980,37.220,44.224,50.826,65.460,86.726,43.819,100.605,
67.615,89.542,60.266,103.580,82.570,87.960,42.385,68.914,95.666,78.135,
83.643,18.617,92.629,
42.415,34.346,106.569,20.758,52.003,77.179, 68.934,78.661,165.543,79.547,
55.009,46.774,124.526,92.504,109.986,101.161,59.422,27.772,33.598,69.038,
75.222,58.373,105.610,56.158,55.913,83.770,123.468,68.994,101.869,87.627,
38.790,74.734)
u.min=10
l.trunc=l.trunc[-41]-u.min
x.trunc=x.trunc[-41]-u.min
PMLE.Clayton.Exponential(l.trunc,x.trunc)
depend.truncation documentation built on May 2, 2019, 3:04 a.m.
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Description Usage Arguments Details Value Author(s) References Examples
Description
Maximum likelihood estimation (MLE) for dependent truncation data under the Clayton copula with Exponential margins for a bivariate lifetimes (L, X). The truncated data (L_j, X_j), subject to L_j<=X_j for all j=1, ..., n, are used to obtain the MLE for the population parameters of (L, X).
Usage
1 2 | PMLE.Clayton.Exponential(l.trunc, x.trunc, GOF = TRUE,
Err=3, alpha_max=20,alpha_min=10^-4)
|
Arguments
l.trunc |
vector of truncation variables satisfying l.trunc<=x.trunc |
x.trunc |
vector of variables satisfying l.trunc<=x.trunc |
GOF |
if TRUE, a goodness-of-fit test statistics is computed |
Err |
tuning parameter in the NR algorithm |
alpha_max |
upper bound for the copula parameter |
alpha_min |
lower bound for the copula parameter |
Details
Original paper is submitted for review
Value
n |
sample size |
alpha |
dependence parameter |
lambda_L |
scale parameter of L |
lambda_X |
scale parameter of X |
mean_X |
Mean lifetime of X, defined as E[X] |
logL |
Maximized log-likelihood |
c |
inclusion probability, defined by c=Pr(L<=X) |
C |
Cramer-von Mises goodness-of-fit test statistics |
K |
Kolmogorov-Smirnov goodness-of-fit test statistics |
Author(s)
Takeshi Emura, Chi-Hung Pan
References
Emura T, Pan CH (2017), Parametric likelihood inference and goodness-of-fit for dependently left-truncated data, a copula-based approach, Statistical Papers, doi:10.1007/s00362-017-0947-z.
Examples
1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 | l.trunc=c(22.207,23.002,23.982,28.551,21.789,17.042,25.997,23.220,18.854,21.857,
27.321,13.767,23.982,20.110,15.779,26.821,27.934,15.292,28.843,15.985,
23.580,53.770,21.731,28.844,17.046,16.506,15.696,27.959,13.272,16.482,
24.210,17.626,27.770,
18.264,17.694,20.014,13.152,16.886,14.894,15.531,6.951,15.841,14.974,
38.292,11.204,38.156,26.652,17.101,28.953,18.325,18.391,18.220,15.896,
16.447,23.642,19.170,23.257,20.428,20.947,28.462,23.210,17.900,46.134,
39.300,11.768,17.717,
30.863,22.350,44.976,18.169,30.164,21.822,18.201,22.895,27.189,10.915,
25.503,12.350,39.869,17.698,26.296,14.091,21.011,11.201,10.757,25.692,
32.372,13.592,19.102,16.112,53.281,57.298,36.450,19.651,20.755,30.788,20.0,39.62)
x.trunc = c(38.701,49.173,42.409,73.823,46.738,44.071,61.904,39.327,49.828,46.314,
56.150,50.549,54.930,54.039,49.170,44.795,72.238,107.783,81.609,45.228,
124.637,64.018,82.957,143.550,43.382,69.644,74.750,32.881,51.483,31.767,
77.633,63.745,82.965,
24.818,68.762,68.762,89.100,64.979,65.127,59.289,53.926,79.370,47.385,
61.395,72.826,53.980,37.220,44.224,50.826,65.460,86.726,43.819,100.605,
67.615,89.542,60.266,103.580,82.570,87.960,42.385,68.914,95.666,78.135,
83.643,18.617,92.629,
42.415,34.346,106.569,20.758,52.003,77.179, 68.934,78.661,165.543,79.547,
55.009,46.774,124.526,92.504,109.986,101.161,59.422,27.772,33.598,69.038,
75.222,58.373,105.610,56.158,55.913,83.770,123.468,68.994,101.869,87.627,
38.790,74.734)
u.min=10
l.trunc=l.trunc[-41]-u.min
x.trunc=x.trunc[-41]-u.min
PMLE.Clayton.Exponential(l.trunc,x.trunc)
|
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