Abstract
To understand human longevity, inherent aging processes must be distinguished from known etiologies leading to age-related chronic diseases. Such deconvolution is difficult to achieve because it requires tracking patients throughout their entire lives. Here, we used machine learning to infer health trajectories over the entire adulthood age range using extrapolation from electronic medical records with partial longitudinal coverage. Using this approach, our model tracked the state of patients who were healthy and free from known chronic disease risk and distinguished individuals with higher or lower longevity potential using a multivariate score. We showed that the model and the markers it uses performed consistently on data from Israeli, British and US populations. For example, mildly low neutrophil counts and alkaline phosphatase levels serve as early indicators of healthy aging that are independent of risk for major chronic diseases. We characterize the heritability and genetic associations of our longevity score and demonstrate at least 1 year of extended lifespan for parents of high-scoring patients compared to matched controls. Longitudinal modeling of healthy individuals is thereby established as a tool for understanding healthy aging and longevity.
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Data availability
UKBB data are available to approved researchers via the UKBB Research Analysis Platform (www.ukbiobank.ac.uk/enable-your-research/research-analysis-platform). The longevity GWAS results are available at https://gwasresults.s3.ap-south-1.amazonaws.com/gwas_longevity_age_sex_covar_extended.tsv.gz. The NHANES data can be accessed at www.cdc.gov/nchs/nhanes/index.htm. Access to the CHSDB data used for this study can be made available upon reasonable request, at the discretion of the CHS, subject to an internal review by A.T. to ensure that participant privacy is protected, and subject to completion of a data sharing agreement, approval from the institutional review board of CHS and institutional guidelines, and in accordance with the current data sharing guidelines of CHS and Israeli law. Subject to receipt of the aforementioned CHS consent and subsequent approvals, data sharing will be made in a secure setting, on a per-case-specific manner, solely for the purpose of reproducing the analysis carried in the research paper, as defined by the chief information security officer of CHS. Please submit such requests to A.T.
Code availability
All model training was performed by applying the newly developed mldpEHR R package (https://github.com/tanaylab/mldpEHR) on CHDB. Laboratory normalization was conducted using the labNorm R package (http://github.com/tanaylab/labNorm). The code applied to the UKBB for models score computation, patient classification and genetic analysis is available at https://github.com/tanaylab/Mendelson_et_al_2023 and in Supplementary Software File 1.
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Acknowledgements
We thank N. Rappaport, A. Bercovich and O. Milman for critical reading of the manuscript and all members of the Tanay laboratory for discussions. Research at the Tanay group was supported in part by the Adelis Foundation, the Kahn Foundation, the Bolton Hope Foundation and the Israel Science Foundation BRG grant and Israel Precision Medicine program.
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N.M.C., A.L., G.I.B. and A.T. conceived and designed the study. N.M.C., R.J., A.L., E.R. and A.T. developed the software and pipeline. R.B. provided access and initial context to the data. N.M.C., A.L. and E.R. analyzed the data with help from R.J., L.I.S., G.I.B. and A.T. N.M.C., A.L. and A.T. wrote the manuscript with input from all authors.
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Extended data
Extended Data Fig. 1 CHSDB cohort longitudinal coverage.
a. Age distribution. Shown are the number of patients available for each age (x axis) and sex (grey for males, pink for females). b. Patient tracking duration distribution. Shown is the cumulative distribution of tracking duration (in years) for all patients in the age range of 30 to 85. c. Chronological patient year distribution. Shown are the number of patients, 30 < age < 85, in each calendric year. Males shown in grey, females in pink. d. Number of lab interactions by age. Shown is the percentage of patients at each age according to the number of WBC tests performed in the previous 3 years (as a proxy for CBC).
Extended Data Fig. 2 Longevity models.
a. High longevity score survival curves. Shown are the Kaplan-Meier survival curves for the two best scoring longevity groups of patients age 80: top 98â100% (yellow, nâ=â4474) and 96â98% (turquoise, nâ=â4475). Longevity scores were computed from cross validation on CHSDB. Error bars indicate 95% confidence intervals. b. Longevity model features. Heatmap of mean lab (y axis) feature value for patients age 80 by quantile normalized longevity score (x axis). Lab values were quantile normalized per age/sex (11). c. Disease predispositions by longevity. Chronic diseases with increased mortality (11) were screened for significant difference as a function of longevity score, in estimated 8-year cumulative incidence (with death as competing risk) using cmprsk R package. Shown are the top 5 chronic diseases for patients age 80 (nâ=â205839), which show a significant fold-increase in disease incidence. Points (center) indicate the cumulative incidence after 8 years for the disease for each bin of longevity score (X-axis). Error bars indicate 95% confidence intervals. d. Disease/Lab only survival model. Shown are the 5-year survival probability estimates (center points) for males (left, nâ=â92937) and females (right, nâ=â130804) age 80 stratified by longevity score (x axis) according to a model using only disease information (red), only lab test measurements (yellow) and lab with disease data (blue). Error bars reflect 95% confidence intervals. e. Longevity model training. The schematic describes the longevity model training process. Starting from all patients at age 80, 5-year longevity model is trained using mortality data from patients with 3-year clinical data and 5-year known outcome, dead (0, purple) or alive (1, green). Cross validation model is applied to all patients with available clinical data, including patients with missing outcome. Top 5% scoring patients will be considered as positive cases (class=1) for age 75 longevity model. In 5-year intervals, younger age model is trained based on 5-year outcome and score from older age model. f. Longevity model transition matrices. Shown are the Markov model 5-year transition matrices by age (column) and sex (rows) color coded by log2 probability for transitioning from score at younger age to score at age+5 years. Score values were binned to 20 bins of 5% quantiles. An additional âno scoreâ bin was added for patients missing required lab data.
Extended Data Fig. 3 Disease models.
a. Disease model training. The schematic describes the disease models training process. Starting from all patients at age 80, 5-year disease model is trained using onset data with death as competing risk from patients with 3-year clinical data and 5-year known outcome that were not already sick at age 80, healthy (0, blue) or sick (1, red). Cross validation model is applied to all healthy (not already sick with the disease) patients with available clinical data, including patients with missing outcome. The top scoring patients, according to the expected number of patients to get sick between ages 80 and 85 computed from population cumulative incidence rates (Dprob(80,85)), will be considered as positive cases (class=1) for age 75 disease model. In 5-year intervals, younger age model is trained based on 5-year outcome and score from older age model. b. 5-year disease prevalence. Shown are the inferred 5-year (short-term) disease prevalence by age (x-axis) for low disease score (bottom 5%, blue) and high disease score (top 5%, red). Note that patients with suspected but unverified T2D were excluded from this analysis. c. Alzheimerâs disease. Shown is the 10-year cumulative incidence estimation for Alzheimerâs disease (left) and death (right) stratified by disease score (quantile normalized) for all patients without disease at age 80 (nâ=â171827) by disease score. Error bars indicate 95% confidence intervals. d. Prostate cancer. Shown are the incidence rate, and lifelong risk for prostate cancer disease model. e. Lung cancer. Similar to D for lung cancer disease model. f. Model features. Shown are mean values by age for key features contributing to prediction of lifelong disease risk in high- and low-risk patients (top/bottom five percentiles). g. Relative chronic disease risks. Similar to Fig. 4c, patients were separated into high / low risk according the disease risk listed in each column. Shown is the lifelong risk for diseases listed in each row. h. Distribution of age difference in T2D onset and other diseases onset. For each T2D newly diagnosed patient, we computed the time difference between T2D onset and the onset of each of the other modeled diseases (if these exist). Shown are boxplots of such time differences stratified by the age at first T2D diagnosis. The middle line indicates the median, box limits represent quartiles, and whiskers are 1.5Ã the interquartile range.
Extended Data Fig. 4 MLDP disease models features.
Heatmap of mean normalized feature value for patients age 55 for each disease stratified by quantile normalized disease risk (x-axis).
Extended Data Fig. 5 Multivariate MLDP score UMAP projection.
Quantile normalized longevity scores and disease scores were projected via UMAP for each age separately. Each dot represents a single patient. Only patients that were not diagnosed with any of the main diseases are shown.
Extended Data Fig. 6 Strongly healthy patients.
a. Disease predispositions by longevity in strongly healthy patients. Similar to Extended Data Fig. 2c for patients with low disease risk score for all modeled diseases (<0.5) and that were not diagnosed with cancer. Nâ=â157239 age 30, 134983 age 40, 91796 age 50, 86081 age 60, and 53596 age 70. Error bars indicate 95% confidence intervals. b. Model features raw values. Similar to Fig 4g, showing lab raw value (not normalized for age and sex). c. High longevity score survival in strongly healthy patients. Shown are the Kaplan-Meier 10-year survival curves for the two best scoring longevity groups: top 95â100% (yellow) and 90â95% (turquoise) longevity score by patients age (x-axis) in strongly healthy patients. Nâ=â23168/ 21778/ 16058/ 12236/ 8872 patients at age 60/65/70/75/80. Error bars indicate 95% confidence intervals.
Extended Data Fig. 7 MLDP performance using 10-year follow-ups.
a. 10-year lifelong risk models. Similar to Fig. 4c for models trained using 10 years follow-up time. b. 10-year Model features. Similar to Extended Data Fig. 3f for models with 10 years follow-up time. c. Comparing 5ây to 10ây disease model prediction. Shown are the 10-year estimated cumulative incidence of the diseases (rows) for selected ages (columns) stratified by disease score (quantile) as computed from 5-year (nâ=â2176596/ 1935991/ 1597164/ 1789586/ 1469513 for age 30/ 40/ 50/60/ 70) and 10-year (nâ=â2176591/ 1935234/ 1595472/ 1786253/ 1463280 for age 30/ 40/ 50/ 60/ 70) cross validation models on CHSDB. Error bars indicate 95% confidence intervals.
Extended Data Fig. 8 CVD risk model validation.
a-b. Framingham and Score2 score comparison. Framingham score and Score2 were computed on UKBB patients. Shown are the 10-year cumulative incidence estimates (with death as competing risk) for CVD by age stratified by score quantiles (x-axis) for Framingham and Score2 (dashed lines) and by our MLDP CVD score (solid line). Nâ=â49486 / 55673/ 63991/ 82738/ 60391 for patients at age 50/ 55/ 60/ 65/ 70. Error bars indicate 95% confidence intervals.
Extended Data Fig. 9 Longevity heritability.
a. Parent-child correlations of disease risk. Disease risks were rank-based inverse normal transformed per disease and age. Parent-child correlation was estimated as the slope of linear regression between child and average of parents whereby parents were 15 years older than offspring. Shown are the estimates of parent-child correlations for each disease ± std error, stratified by age (x-axis) computed for male offspring (grey), female offspring (pink) and combined (black). nâ=â430347/ 376405/ 281894/ 173863/ 93739/ 45398/ 15364/ 2321 for T2D, nâ=â452927/ 400504/ 303569/ 189851/ 103988/ 50925/ 17291/ 2642 for CKD, nâ=â451686/ 398285/ 300855/ 187115/ 101900/ 49838/ 16914/ 2575 for COPD, nâ=â456341/ 404196/ 306780/ 192024/ 105297/ 51745/ 17672/ 2702 for CVD, and nâ=â452001/ 398489/ 300724/ 186539/ 101144/ 49292/ 16734/ 2559 for LD at ages 30/ 35/ 40/ 45/ 50/ 55/ 60/ 65. b. Parent-child correlations of longevity. Similar to A on patientsâ longevity score, computed on the entire population (left, nâ=â536348/ 516826/ 442573/ 333617/ 238153/ 151855/ 67968/ 14587 for ages 30/ 35/ 40/ 45/ 50/ 55/ 60/ 65) and on strongly-healthy offspring individuals (right, nâ=â229886/ 242594/ 202371/ 141002/ 91847/ 54022/ 22286/ 4405 for ages 30/ 35/ 40/ 45/ 50/ 55/ 60/ 65). c. Longevity snps allele frequencies. Similar to Fig. 6a (right), showing breakdown of allele frequencies of all 15 predisposition groups as shown in Fig. 5d.
Extended Data Fig. 10 Longevity GWAS.
a. Alkaline-phosphotase distribution by ALPL genotype. Shown is the cumulative distribution of alkaline-phosphotase in patients by genetic variant of ALPL rs149344982 snp. b. Parents survival by ALPL variant and alk-phos values. Shown are the survival estimates for parents reaching the age of 85, stratified by ALPL snp variant (left, nâ=â181972/4942 for genotype 0/1) and by alk-phos lab values (right, nâ=â70668/108379 with low/high alk-phos). Error bars indicate 95% confidence intervals. c. Parents survival by longevity score, excluding alk-phos contribution. Similar to B, stratifying also by longevity score, computed using a model that did not consider alkaline-phosphatase feature. Nâ=â30945/863 for genotype 0/1 in low longevity score, nâ=â64518/1790 for genotype 0/1 in mid longevity score and nâ=â74586/1983 for genotype 0/1 in high longevity score. Error bars indicate 95% confidence intervals. d. QQ (quantile-quantile) plot of GWAS on the longevity score with the five disease predisposition scores introduced as confounders. Shown are observed versus expected GWAS p-values on the âlog10 scale. E. Variants with significant association to longevity score that were inconsistent with parentsâ survival. Shown are the six snps, oriented by longevity score (high mortality in red), annotated by beta estimate for the longevity model with disease scores as covariates. GWAS for lab tests was obtained from Neale lab (65) and significant associations (pval < 5e-8) are depicted with red indicating variant high values and blue indicating low values inferred from GWAS beta estimates. Cox proportional hazards and Kaplan Meier survival estimates was performed on all snps on mother, father and parents combined. Also shown are Kaplan Meier (km) p-values.
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Cohen, N.M., Lifshitz, A., Jaschek, R. et al. Longitudinal machine learning uncouples healthy aging factors from chronic disease risks. Nat Aging 4, 129â144 (2024). https://doi.org/10.1038/s43587-023-00536-5
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DOI: https://doi.org/10.1038/s43587-023-00536-5
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