Affinity-based measures of biomarker performance evaluation

We propose new summary measures of biomarker accuracy which can be used as companions to existing diagnostic accuracy measures. Conceptually, our summary measures are tantamount to the so-called Hellinger affinity and we show that they can be regarded as measures of agreement constructed from similar geometrical principles as Pearson correlation. We develop a covariate-specific version of our summary index, which practitioners can use to assess the discrimination performance of a biomarker, conditionally on the value of a predictor. We devise nonparametric Bayes estimators for the proposed indexes, derive theoretical properties of the corresponding priors, and assess the performance of our methods through a simulation study. The proposed methods are illustrated using data from a prostate cancer diagnosis study.

[1]  A. Branscum,et al.  Bayesian nonparametric inference for the three-class Youden index and its associated optimal cutoff points , 2018, Statistical methods in medical research.

[2]  A. Branscum,et al.  Nonparametric Bayesian covariate‐adjusted estimation of the Youden index , 2017, Biometrics.

[3]  Aad van der Vaart,et al.  Fundamentals of Nonparametric Bayesian Inference , 2017 .

[4]  Dan Wang,et al.  Parametric methods for confidence interval estimation of overlap coefficients , 2017, Comput. Stat. Data Anal..

[5]  D. Gur,et al.  Estimating the Area Under ROC Curve When the Fitted Binormal Curves Demonstrate Improper Shape. , 2017, Academic radiology.

[6]  Miguel de Carvalho,et al.  On the Geometry of Bayesian Inference , 2017, Bayesian Analysis.

[7]  Miguel de Carvalho,et al.  Functional Covariate-Adjusted Partial Area under the Specificity-ROC Curve with an Application to Metabolic Syndrome Diagnosis , 2016 .

[8]  W. Johnson,et al.  Flexible regression models for ROC and risk analysis, with or without a gold standard , 2015, Statistics in Medicine.

[9]  Abel Rodríguez,et al.  Bayesian semiparametric estimation of covariate-dependent ROC curves. , 2014, Biostatistics.

[10]  Adam J. Branscum,et al.  Robust Medical Test Evaluation Using Flexible Bayesian Semiparametric Regression Models , 2013 .

[11]  Miguel de Carvalho,et al.  Bayesian nonparametric ROC regression modeling , 2013 .

[12]  Maria Antónia Amaral Turkman,et al.  Arrow plot: a new graphical tool for selecting up and down regulated genes and genes differentially expressed on sample subgroups , 2012, BMC Bioinformatics.

[13]  Fernando A. Quintana,et al.  On the Support of MacEachern’s Dependent Dirichlet Processes and Extensions , 2012 .

[14]  Stephen L Hillis,et al.  Using the mean-to-sigma ratio as a measure of the improperness of binormal ROC curves. , 2011, Academic radiology.

[15]  Wesley O Johnson,et al.  Bayesian Nonparametric Nonproportional Hazards Survival Modeling , 2009, Biometrics.

[16]  M. Muselli,et al.  Not proper ROC curves as new tool for the analysis of differentially expressed genes in microarray experiments , 2008, BMC Bioinformatics.

[17]  R. F. Wagner,et al.  Assessment of medical imaging systems and computer aids: a tutorial review. , 2007, Academic radiology.

[18]  Alaattin Erkanli,et al.  Bayesian semi‐parametric ROC analysis , 2006, Statistics in medicine.

[19]  P. Qiu The Statistical Evaluation of Medical Tests for Classification and Prediction , 2005 .

[20]  S. Walker,et al.  Extending Doob's consistency theorem to nonparametric densities , 2004 .

[21]  S. MacEachern,et al.  An ANOVA Model for Dependent Random Measures , 2004 .

[22]  Lancelot F. James,et al.  Approximate Dirichlet Process Computing in Finite Normal Mixtures , 2002 .

[23]  Xiao-Hua Zhou,et al.  Statistical Methods in Diagnostic Medicine , 2002 .

[24]  Lancelot F. James,et al.  Gibbs Sampling Methods for Stick-Breaking Priors , 2001 .

[25]  Gary Longton,et al.  Incorporating the Time Dimension in Receiver Operating Characteristic Curves: A Case Study of Prostate Cancer , 1999, Medical decision making : an international journal of the Society for Medical Decision Making.

[26]  C E Metz,et al.  The "proper" binormal model: parametric receiver operating characteristic curve estimation with degenerate data. , 1997, Academic radiology.

[27]  K. Berbaum,et al.  Proper receiver operating characteristic analysis: the bigamma model. , 1997, Academic radiology.

[28]  Chuhsing Kate Hsiao,et al.  Alternative Summary Indices for the Receiver Operating Characteristic Curve , 1996, Epidemiology.

[29]  J. Sethuraman A CONSTRUCTIVE DEFINITION OF DIRICHLET PRIORS , 1991 .

[30]  T. Ferguson A Bayesian Analysis of Some Nonparametric Problems , 1973 .

[31]  Miguel de Carvalho,et al.  Bayesian Nonparametric Biostatistics , 2015 .

[32]  Miguel de Carvalho,et al.  Bayesian Nonparametric Approaches for ROC Curve Inference , 2015 .

[33]  R Core Team,et al.  R: A language and environment for statistical computing. , 2014 .

[34]  A. V. D. Vaart,et al.  Asymptotic Statistics: Frontmatter , 1998 .

[35]  David Williams,et al.  Probability with Martingales , 1991, Cambridge mathematical textbooks.

[36]  W. Youden,et al.  Index for rating diagnostic tests , 1950, Cancer.

[37]  S. Ghosal,et al.  (www.interscience.wiley.com) DOI: 10.1002/sim.3366 Bayesian bootstrap estimation of ROC curve , 2022 .