Litcius/Paper detail

Techniques to produce and evaluate realistic multivariate synthetic data

John Heine, Erin Fowler, Anders Berglund, Michael J. Schell, Steven A. Eschrich

2023Scientific Reports16 citationsDOIOpen Access PDF

Abstract

Data modeling requires a sufficient sample size for reproducibility. A small sample size can inhibit model evaluation. A synthetic data generation technique addressing this small sample size problem is evaluated: from the space of arbitrarily distributed samples, a subgroup (class) has a latent multivariate normal characteristic; synthetic data can be generated from this class with univariate kernel density estimation (KDE); and synthetic samples are statistically like their respective samples. Three samples (n = 667) were investigated with 10 input variables (X). KDE was used to augment the sample size in X. Maps produced univariate normal variables in Y. Principal component analysis in Y produced uncorrelated variables in T, where the probability density functions were approximated as normal and characterized; synthetic data was generated with normally distributed univariate random variables in T. Reversing each step produced synthetic data in Y and X. All samples were approximately multivariate normal in Y, permitting the generation of synthetic data. Probability density function and covariance comparisons showed similarity between samples and synthetic samples. A class of samples has a latent normal characteristic. For such samples, this approach offers a solution to the small sample size problem. Further studies are required to understand this latent class.

Topics & Concepts

UnivariateMultivariate statisticsPrincipal component analysisSynthetic dataSample size determinationStatisticsMathematicsMultivariate normal distributionCovarianceLatent variableKernel density estimationMultivariate kernel density estimationComputer scienceArtificial intelligenceKernel methodVariable kernel density estimationSupport vector machineEstimatorSoil Geostatistics and MappingData Analysis with RStatistical Methods and Bayesian Inference