Biologically relevant simulations for validating risk models under small-sample conditions

In designing scientific experiments, power analysis is too often given a superficial treatment— choice of sample size is often made based on idealized distributions and simplistic tests that do not reflect the real-world constraints under which the actual data will be collected. We have developed a general Monte Carlo framework for two-group comparisons which samples points from a two-dimensional parameter space and at each point generates simulated datasets which are compared to simulated datasets for a “control group” at a fixed point in the parameter space. Rather than uniformly sampling this parameter space, our algorithm rapidly converges on a contour corresponding to the smallest detectable difference for the sample size of interest.

[1]  M. Rose,et al.  The Gompertz equation as a predictive tool in demography , 1995, Experimental Gerontology.

[2]  M. L. Rizzo,et al.  A Monte Carlo Power Analysis of Traditional Repeated Measures and Hierarchical Multivariate Linear Models in Longitudinal Data Analysis. , 2008, Journal of modern applied statistical methods : JMASM.

[3]  S. Hekimi,et al.  Different Mechanisms of Longevity in Long-Lived Mouse and Caenorhabditis elegans Mutants Revealed by Statistical Analysis of Mortality Rates , 2016, Genetics.

[4]  Alexander M. Schoemann,et al.  Using Monte Carlo simulations to determine power and sample size for planned missing designs , 2014 .

[5]  D.,et al.  Regression Models and Life-Tables , 2022 .

[6]  D. Steinsaltz,et al.  Validated analysis of mortality rates demonstrates distinct genetic mechanisms that influence lifespan , 2008, Experimental Gerontology.

[7]  J. Curtsinger,et al.  Why do life spans differ? Partitioning mean longevity differences in terms of age-specific mortality parameters. , 2000, The journals of gerontology. Series A, Biological sciences and medical sciences.

[8]  P. Grambsch,et al.  Proportional hazards tests and diagnostics based on weighted residuals , 1994 .

[9]  Lee-Jen Wei,et al.  The accelerated failure time model: a useful alternative to the Cox regression model in survival analysis. , 1992, Statistics in medicine.

[10]  M. Pike,et al.  Slow mortality rate accelerations during aging in some animals approximate that of humans. , 1990, Science.

[11]  Pletcher Model fitting and hypothesis testing for age‐specific mortality data , 1999 .

[12]  Pie Müller,et al.  Power analysis for generalized linear mixed models in ecology and evolution , 2014, Methods in ecology and evolution.

[13]  C. Bult,et al.  Aging in inbred strains of mice: study design and interim report on median lifespans and circulating IGF1 levels , 2009, Aging cell.

[14]  Edward J Masoro,et al.  Caloric restriction and aging: controversial issues. , 2006, The journals of gerontology. Series A, Biological sciences and medical sciences.

[15]  D. Harrington A class of rank test procedures for censored survival data , 1982 .