Biological Age: Difference between revisions

Line 38: Line 38:
| More than 50 years ago
| More than 50 years ago
| Aging biomarkers are determined by the correlation with CA using MLR model
| Aging biomarkers are determined by the correlation with CA using MLR model
| MLR is the preliminary method and is easy to operate
|
| (1) The standards of aging biomarkers lead to the paradox of CA
* MLR is the preliminary method and is easy to operate
(2) MLR also distorts the BA at the regression edge and ignores discontinuity in the aging rate{{pmid|6873212}}{{pmid|3226152}}{{pmid|950448}}
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* The standards of aging biomarkers lead to the paradox of CA
* MLR also distorts the BA at the regression edge and ignores discontinuity in the aging rate{{pmid|6873212}}{{pmid|3226152}}{{pmid|950448}}
| Hollingsworth et al{{pmid|5841151}} and Kroll and Saxtrup{{pmid|11708217}}
| Hollingsworth et al{{pmid|5841151}} and Kroll and Saxtrup{{pmid|11708217}}
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|-
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| 1985
| 1985
| PCA uses fewer uncorrelated variables to explain the main variance
| PCA uses fewer uncorrelated variables to explain the main variance
|  
|
# Biomarkers are uncorrelated variables{{pmid|16318865}}
* Biomarkers are uncorrelated variables{{pmid|16318865}}
# PCA avoids the influence of regression edge in MLR{{pmid|3226152}}
* PCA avoids the influence of regression edge in MLR{{pmid|3226152}}
| PCA cannot avoid the paradox of CA and some statistical deficiencies of MLR{{pmid|16318865}}
|
* PCA cannot avoid the paradox of CA and some statistical deficiencies of MLR{{pmid|16318865}}
| Nakamura et al,{{pmid|2737197}}{{pmid|2282902}} Nakamura and Miyao,{{pmid|12634284}} Nakamura et al,{{pmid|8026568}}{{pmid|9762521}} Nakamura and Miyao,{{pmid|17921421}} Nakamura et al,{{pmid|3226152}} Nakamura,<ref>75. Nakamura E. The assessment of physiological age based upon a principal component analysis of various physiological variables. J Kyoto Pref Univ Med. 1985;94:757–769. [Google Scholar]</ref> Nakamura and Miyao,{{pmid|18840798}} Nakamura et al,{{pmid|8803500}} Park et al,{{pmid|18597867}} Bai et al,{{pmid|19940465}} and Zhang{{pmid|25470806}}–{{pmid|24659482}}
| Nakamura et al,{{pmid|2737197}}{{pmid|2282902}} Nakamura and Miyao,{{pmid|12634284}} Nakamura et al,{{pmid|8026568}}{{pmid|9762521}} Nakamura and Miyao,{{pmid|17921421}} Nakamura et al,{{pmid|3226152}} Nakamura,<ref>75. Nakamura E. The assessment of physiological age based upon a principal component analysis of various physiological variables. J Kyoto Pref Univ Med. 1985;94:757–769. [Google Scholar]</ref> Nakamura and Miyao,{{pmid|18840798}} Nakamura et al,{{pmid|8803500}} Park et al,{{pmid|18597867}} Bai et al,{{pmid|19940465}} and Zhang{{pmid|25470806}}–{{pmid|24659482}}
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|-
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| 1989
| 1989
| Hochschild’s method aims to select aging biomarkers according to their effects on life expectancy{{pmid|2684676}}
| Hochschild’s method aims to select aging biomarkers according to their effects on life expectancy{{pmid|2684676}}
| (1) Hochschild’s method solves the paradox of CA
|
(2) Hochschild’s method avoids statistical problems of MLR
* Hochschild’s method solves the paradox of CA
| (1) Hochschild’s method is nonstandard and relatively complicated
* Hochschild’s method avoids statistical problems of MLR
(2) Hochschild’s method is not based on the definition of BA
|
(3) A large number of subjects are required when this approach is adopted for another system{{pmid|20005245}}
* Hochschild’s method is nonstandard and relatively complicated
* Hochschild’s method is not based on the definition of BA
* A large number of subjects are required when this approach is adopted for another system{{pmid|20005245}}
| Hochschild{{pmid|2684676}}{{pmid|2583248}}<ref>76. Hochschild R. Validating Biomarkers of Aging-Mathematical Approaches and Results of a 2462-Person Study. Boca Raton: CRC Press; 1994. [Google Scholar]</ref>
| Hochschild{{pmid|2684676}}{{pmid|2583248}}<ref>76. Hochschild R. Validating Biomarkers of Aging-Mathematical Approaches and Results of a 2462-Person Study. Boca Raton: CRC Press; 1994. [Google Scholar]</ref>
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| 2006
| 2006
| KDM is based on minimizing the distance between ''m'' regression lines and ''m'' biomarker points in an ''m''-dimensional space of all biomarkers{{pmid|16318865}}
| KDM is based on minimizing the distance between ''m'' regression lines and ''m'' biomarker points in an ''m''-dimensional space of all biomarkers{{pmid|16318865}}
| (1) KDM performed better than CA{{pmid|23213031}}
|
(2) KDM is precise when compared with other methods{{pmid|23213031}}{{pmid|20005245}}{{pmid|28110151}}
* KDM performed better than CA{{pmid|23213031}}
(3) KDM solves the paradox of CA{{pmid|23213031}}{{pmid|20005245}}
* KDM is precise when compared with other methods{{pmid|23213031}}{{pmid|20005245}}{{pmid|28110151}}
| The calculation of KDM is complicated{{pmid|20005245}}
* KDM solves the paradox of CA{{pmid|23213031}}{{pmid|20005245}}
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* The calculation of KDM is complicated{{pmid|20005245}}
| Klemera and Doubal,{{pmid|16318865}} Levine,{{pmid|23213031}} Levine and Crimmins,{{pmid|25088793}} Cho et al{{pmid|20005245}} and Jee and Park{{pmid|28110151}}
| Klemera and Doubal,{{pmid|16318865}} Levine,{{pmid|23213031}} Levine and Crimmins,{{pmid|25088793}} Cho et al{{pmid|20005245}} and Jee and Park{{pmid|28110151}}
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