On bias reduction in parametric estimation in stage structured development models

Hoa Pham; Huong T. T. Pham; Kai Siong Yow

doi:10.1515/mcma-2024-2001

Article

On bias reduction in parametric estimation in stage structured development models

Hoa Pham , Huong T. T. Pham and Kai Siong Yow

Published/Copyright: January 31, 2024

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From the journal Monte Carlo Methods and Applications Volume 30 Issue 2

Abstract

Multi-stage models for cohort data are popular statistical models in several fields such as disease progressions, biological development of plants and animals, and laboratory studies of life cycle development. A Bayesian approach on adopting deterministic transformations in the Metropolis–Hastings (MH) algorithm was used to estimate parameters for these stage structured models. However, the biases in later stages are limitations of this methodology, especially the accuracy of estimates for the models having more than three stages. The main aim of this paper is to reduce these biases in parameter estimation. In particular, we conjoin insignificant previous stages or negligible later stages to estimate parameters of a desired stage, while an adjusted MH algorithm based on deterministic transformations is applied for the non-hazard rate models. This means that current stage parameters are estimated separately from the information of its later stages. This proposed method is validated in simulation studies and applied for a case study of the incubation period of COVID-19. The results show that the proposed methods could reduce the biases in later stages for estimates in stage structured models, and the results of the case study can be regarded as a valuable continuation of pandemic prevention.

Keywords: Multi-stage models; stage structured models; stage duration data; stage frequency data; Bayesian analysis; incubation period of COVID-19

MSC 2020: 62N02; 62F15; 62P10; 62P12

A Appendix

Table 5

Summary of MCMC convergence diagnostic tests of shape a j , j = 1 , 2 , 3 , and rate λ j , j = 1 , 2 , 3 , estimates for the three-stage non-hazard rate model.

Gelman and Rubin diagnostic			Geweke diagnostic

Potential scale reduction factors			Fraction in 1st window	0.1
	Point est.	Upper CI	Fraction in 2nd window	0.5
a 1	1.00	1.00	a 1	0.638
λ 1	1.00	1.00	λ 1	0.532
Multivariable psrf	1.00

a 2	1.00	1.01	a 2	1.105
λ 2	1.00	1.00	λ 2	0.865
Multivariable psrf	1.00

a 3	1.01	1.00	a 3	−1.136
λ 3	1.01	1.01	λ 3	−1.235
Multivariable psrf	1.01

Table 6

Summary of MCMC convergence diagnostic tests of shape a j , j = 1 , 2 , 3 , 4 , 5 , and rate λ j , j = 1 , 2 , 3 , 4 , 5 , estimates for the five-stage non-hazard rate model.

Gelman and Rubin diagnostic			Geweke diagnostic

Potential scale reduction factors			Fraction in 1st window	0.1
	Point est.	Upper CI	Fraction in 2nd window	0.5
a 1	1.00	1.00	a 1	0.571
λ 1	1.00	1.00	λ 1	0.688
Multivariable psrf	1.00

a 2	1.00	1.01	a 2	1.783
λ 2	1.00	1.00	λ 2	1.568
Multivariable psrf	1.00

a 3	1.00	1.00	a 3	−0.436
λ 3	1.00	1.00	λ 3	−0.735
Multivariable psrf	1.01

a 4	1.01	1.03	a 4	1.368
λ 4	1.02	1.01	λ 4	1.529
Multivariable psrf	1.00

a 5	1.01	1.01	a 5	−1.231
λ 5	1.02	1.01	λ 5	−1.412
Multivariable psrf	1.02

Table 7

Summary of MCMC convergence diagnostic tests of shape a j , j = 1 , 2 , 3 , 4 , 5 , 6 , 7 , and rate λ j , j = 1 , 2 , 3 , 4 , 5 , 6 , 7 , estimates for the seven-stage non-hazard rate model.

Gelman and Rubin diagnostic			Geweke diagnostic

Potential scale reduction factors			Fraction in 1st window	0.1
	Point est.	Upper CI	Fraction in 2nd window	0.5
a 1	1.01	1.00	a 1	−1.138
λ 1	1.00	1.00	λ 1	−1.331
Multivariable psrf	1.00

a 2	1.01	1.01	a 2	0.705
λ 2	1.00	1.00	λ 2	0.865
Multivariable psrf	1.00

a 3	1.01	1.00	a 3	−0.536
λ 3	1.01	1.01	λ 3	−0.675
Multivariable psrf	1.01

a 4	1.00	1.03	a 4	0.798
λ 4	1.01	1.01	λ 4	0.980
Multivariable psrf	1.01

a 5	1.02	1.03	a 5	1.302
λ 5	1.01	1.04	λ 5	1.033
Multivariable psrf	1.01

a 6	1.01	1.02	a 6	−1.359
λ 6	1.02	1.01	λ 6	−1.560
Multivariable psrf	1.02

a 7	1.02	1.03	a 7	1.736
λ 7	1.01	1.05	λ 7	1.975
Multivariable psrf	1.03

Table 8

The incubation period of COVID-19 data.

𝑡	Expose stage	The incubation stage	Final stage
0	98	0	0
1	89	9	0
2	78	11	9
3	66	12	20
4	56	10	32
5	47	9	42
6	40	7	51
7	33	7	58
8	28	5	65
9	23	5	70
10	18	5	75
11	15	3	80
12	12	3	83
13	10	2	86
14	8	2	88
15	6	2	90
16	5	1	92
17	4	1	93
18	3	1	94
19	2	1	95
20	1	1	96
21	0	1	97
22	0	0	98

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Received: 2023-07-15

Revised: 2023-12-22

Accepted: 2024-01-10

Published Online: 2024-01-31

Published in Print: 2024-06-01

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Articles in the same Issue

https://doi.org/10.1515/mcma-2024-2001

Keywords for this article

Multi-stage models; stage structured models; stage duration data; stage frequency data; Bayesian analysis; incubation period of COVID-19

𝑡	Expose stage	The incubation stage	Final stage
0	98	0	0
1	89	9	0
2	78	11	9
3	66	12	20
4	56	10	32
5	47	9	42
6	40	7	51
7	33	7	58
8	28	5	65
9	23	5	70
10	18	5	75
11	15	3	80
12	12	3	83
13	10	2	86
14	8	2	88
15	6	2	90
16	5	1	92
17	4	1	93
18	3	1	94
19	2	1	95
20	1	1	96
21	0	1	97
22	0	0	98

𝑡	Expose stage	The incubation stage	Final stage
0	98	0	0
1	89	9	0
2	78	11	9
3	66	12	20
4	56	10	32
5	47	9	42
6	40	7	51
7	33	7	58
8	28	5	65
9	23	5	70
10	18	5	75
11	15	3	80
12	12	3	83
13	10	2	86
14	8	2	88
15	6	2	90
16	5	1	92
17	4	1	93
18	3	1	94
19	2	1	95
20	1	1	96
21	0	1	97
22	0	0	98

𝑡	Expose stage	The incubation stage	Final stage
0	98	0	0
1	89	9	0
2	78	11	9
3	66	12	20
4	56	10	32
5	47	9	42
6	40	7	51
7	33	7	58
8	28	5	65
9	23	5	70
10	18	5	75
11	15	3	80
12	12	3	83
13	10	2	86
14	8	2	88
15	6	2	90
16	5	1	92
17	4	1	93
18	3	1	94
19	2	1	95
20	1	1	96
21	0	1	97
22	0	0	98