Performance of the Smallest-Variance-First Rule in Appointment Sequencing
成果类型:
Article
署名作者:
de Kemp, A. Madelon; Mandjes, Michel; Olver, Neil
署名单位:
University of Amsterdam; University of London; London School Economics & Political Science
刊物名称:
OPERATIONS RESEARCH
ISSN/ISSBN:
0030-364X
DOI:
10.1287/opre.2020.2025
发表日期:
2021
页码:
1909-1935
关键词:
health-care
systems
摘要:
A classic problem in appointment scheduling with applications in healthcare concerns the determination of the patients' arrival times that minimize a cost function that is a weighted sum of mean waiting times and mean idle times. One aspect of this problem is the sequencing problem, which focuses on ordering the patients. We assess the performance of the smallest-variance-first (SVF) rule, which sequences patients in order of increasing variance of their service durations. Although it is known that SVF is not always optimal, it has been widely observed that it performs well in practice and simulation. We provide a theoretical justification for this observation by proving, in various settings, quantitative worst -case bounds on the ratio between the cost incurred by the SVF rule and the minimum at-tainable cost. We also show that, in great generality, SVF is asymptotically optimal, that is, the ratio approaches one as the number of patients grows large. Although evaluating policies by considering an approximation ratio is a standard approach in many algorithmic settings, our results appear to be the first of this type in the appointment-scheduling literature.
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