A probability metric for identifying high-performing facilities: an application for pay-for-performance programs

Med Care. 2014 Dec;52(12):1030-6. doi: 10.1097/MLR.0000000000000242.

Abstract

Background: Two approaches are commonly used for identifying high-performing facilities on a performance measure: one, that the facility is in a top quantile (eg, quintile or quartile); and two, that a confidence interval is below (or above) the average of the measure for all facilities. This type of yes/no designation often does not do well in distinguishing high-performing from average-performing facilities.

Objective: To illustrate an alternative continuous-valued metric for profiling facilities--the probability a facility is in a top quantile--and show the implications of using this metric for profiling and pay-for-performance.

Methods: We created a composite measure of quality from fiscal year 2007 data based on 28 quality indicators from 112 Veterans Health Administration nursing homes. A Bayesian hierarchical multivariate normal-binomial model was used to estimate shrunken rates of the 28 quality indicators, which were combined into a composite measure using opportunity-based weights. Rates were estimated using Markov Chain Monte Carlo methods as implemented in WinBUGS. The probability metric was calculated from the simulation replications.

Results: Our probability metric allowed better discrimination of high performers than the point or interval estimate of the composite score. In a pay-for-performance program, a smaller top quantile (eg, a quintile) resulted in more resources being allocated to the highest performers, whereas a larger top quantile (eg, being above the median) distinguished less among high performers and allocated more resources to average performers.

Conclusion: The probability metric has potential but needs to be evaluated by stakeholders in different types of delivery systems.

Publication types

  • Research Support, U.S. Gov't, Non-P.H.S.

MeSH terms

  • Bayes Theorem
  • Benchmarking / methods*
  • Humans
  • Markov Chains
  • Probability
  • Quality Indicators, Health Care / statistics & numerical data*
  • Quality of Health Care / standards*
  • Reimbursement, Incentive / statistics & numerical data*
  • United States
  • United States Department of Veterans Affairs