Arrhenius-Lognormal Model: Difference between revisions

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::<math>\,\!e^{{\mu }'}=e^{\alpha _{0}+\frac{\alpha _{1}}{T}}=C\times e^{\frac{B}{T}}</math>  
::<math>\,\!e^{{\mu }'}=e^{\alpha _{0}+\frac{\alpha _{1}}{T}}=C\times e^{\frac{B}{T}}</math>  
In the book, the following results are provided:
*ML estimations for the model parameters are: <math>\,\!</math> ,<math>\,\!</math> , <math>\,\!</math>(or  <math>\,\!</math>).
*The 95% confidence interval for <math>\,\!</math>  is [0.75, 1.28], for  <math>\,\!</math> is [-19.1, -7.8] and for  <math>\,\!</math> is [0.47, 0.79].
*The variance/covariance matrix for  ,  , and  is
::<math>\,\!</math>
In terms of <math>\,\!</math> , <math>\,\!</math>  and <math>\,\!</math> , the variance/covariance matrix is
::<math>\,\!</math>






{{Reference_Example_Heading4|ALTA}}
{{Reference_Example_Heading4|ALTA}}

Revision as of 18:42, 10 June 2014

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ALTA_Reference_Examples

This example validates the calculation for the Arrhenius life stress relationship with a Lognormal distribution.


Reference Case

The data set is from Example 19.5 on page 498 in book Statistical Methods for Reliability Data by Dr. Meeker and Dr. Escobar, John Wiley & Sons, 1998.


Data

Device-A was tested under several different temperature settings.

Number in Group State F/S Time to State Temperature (°F) Subset ID
30 S 5000 283.15 1
1 F 1298 313.15 2
1 F 1390 313.15 2
1 F 3187 313.15 2
1 F 3241 313.15 2
1 F 3261 313.15 2
1 F 3313 313.15 2
1 F 4501 313.15 2
1 F 4568 313.15 2
1 F 4841 313.15 2
1 F 4982 313.15 2
90 S 5000 313.15 2
1 F 581 333.15 3
1 F 925 333.15 3
1 F 1432 333.15 3
1 F 1586 333.15 3
1 F 2452 333.15 3
1 F 2734 333.15 3
1 F 2772 333.15 3
1 F 4106 333.15 3
1 F 4674 333.15 3
11 S 5000 333.15 3
1 F 283 353.15 4
1 F 361 353.15 4
1 F 515 353.15 4
1 F 638 353.15 4
1 F 854 353.15 4
1 F 1024 353.15 4
1 F 1030 353.15 4
1 F 1045 353.15 4
1 F 1767 353.15 4
1 F 1777 353.15 4
1 F 1856 353.15 4
1 F 1951 353.15 4
1 F 1964 353.15 4
1 F 2884 353.15 4
1 S 5000 353.15 4


Result

The following function is used for the Ln-Mean [math]\displaystyle{ \,\!\mu {}' }[/math] :

[math]\displaystyle{ \,\!\mu {}'=\beta _{0}+\beta _{1}\times \frac{11605}{T} }[/math]

where T is the temperature; [math]\displaystyle{ \,\!\beta _{1} }[/math] is the activation energy; [math]\displaystyle{ \,\!11605 }[/math] is from reciprocal of the Boltzmann constant . This function can be written in the following way:

[math]\displaystyle{ \,\!e^{{\mu }'}=e^{\alpha _{0}+\frac{\alpha _{1}}{T}} }[/math]

The above equation is the general log-linear model in ALTA. In ALTA, the coefficients are denoted by [math]\displaystyle{ \,\!\alpha _{i} }[/math] .

In fact, the above model also can be expressed using the traditional Arrhenius model:

[math]\displaystyle{ \,\!e^{{\mu }'}=e^{\alpha _{0}+\frac{\alpha _{1}}{T}}=C\times e^{\frac{B}{T}} }[/math]

In the book, the following results are provided:

  • ML estimations for the model parameters are: [math]\displaystyle{ \,\! }[/math] ,[math]\displaystyle{ \,\! }[/math] , [math]\displaystyle{ \,\! }[/math](or [math]\displaystyle{ \,\! }[/math]).
  • The 95% confidence interval for [math]\displaystyle{ \,\! }[/math] is [0.75, 1.28], for [math]\displaystyle{ \,\! }[/math] is [-19.1, -7.8] and for [math]\displaystyle{ \,\! }[/math] is [0.47, 0.79].
  • The variance/covariance matrix for , , and is
[math]\displaystyle{ \,\! }[/math]

In terms of [math]\displaystyle{ \,\! }[/math] , [math]\displaystyle{ \,\! }[/math] and [math]\displaystyle{ \,\! }[/math] , the variance/covariance matrix is

[math]\displaystyle{ \,\! }[/math]



Results in ALTA