The Two Phases Method for operating rooms planning and scheduling

被引:0
作者
Toub, Maha [1 ]
Achchab, Said [1 ]
Souissi, Omar [2 ]
机构
[1] ENSIAS, ALQUALSADI Team, Rabat, Morocco
[2] INPT, Data Team, Rabat, Morocco
来源
2020 IEEE INTERNATIONAL CONFERENCE ON TECHNOLOGY MANAGEMENT, OPERATIONS AND DECISIONS (ICTMOD) | 2020年
关键词
Operation Research; Healthcare; Operating room; Scheduling; Planning; Optimization; Two Phases Method; MODEL;
D O I
10.1109/ICTMOD49425.2020.9380584
中图分类号
TM [电工技术]; TN [电子技术、通信技术];
学科分类号
0808 ; 0809 ;
摘要
Over the last three or four decades, there have been numerous optimization problems in Healthcare which have been approached by researchers. Hospital logistics which must be organized and structured in order to secure patient satisfaction in terms of quality, quantity, time, security and least cost, forms part of the quest for global performance. According to the literature review, the problem of operating rooms planning and scheduling involves different conflicting objectives while considering constraints on availability of rooms, patients and doctors. In this paper, we proposed the Two Phases Method (TPM), which is a general technique that is likely to solve multi-objective combinatorial optimization (MOCO) problems. As it is known, TPM has never been applied to solve operating room planning and scheduling problem. In this paper, we developed the TPM to resolve the cited issue, while focusing on optimizing both total completion time and patients' waiting time.
引用
收藏
页数:7
相关论文
共 20 条
  • [1] BICRITERIA TRANSPORTATION PROBLEM
    ANEJA, YP
    NAIR, KPK
    [J]. MANAGEMENT SCIENCE, 1979, 25 (01) : 73 - 78
  • [2] Multi-objective integrated planning and scheduling model for operating rooms under uncertainty
    Ansarifar, Javad
    Tavakkoli-Moghaddam, Reza
    Akhavizadegan, Faezeh
    Amin, Saman Hassanzadeh
    [J]. PROCEEDINGS OF THE INSTITUTION OF MECHANICAL ENGINEERS PART H-JOURNAL OF ENGINEERING IN MEDICINE, 2018, 232 (09) : 930 - 948
  • [3] Bastos L. S. L., 2018, EUR J OPER RES
  • [4] Blake J T, 1997, J Soc Health Syst, V5, P17
  • [5] Conforti Domenico, 2010, 2010 IEEE Workshop on Health Care Management (WHCM), DOI 10.1109/WHCM.2010.5441264
  • [6] CONNOLLY D, 1991, J OPER RES SOC, V42, P513
  • [7] FINDING ALL THE PERFECT MATCHINGS IN BIPARTITE GRAPHS
    FUKUDA, K
    MATSUI, T
    [J]. APPLIED MATHEMATICS LETTERS, 1994, 7 (01) : 15 - 18
  • [8] PROPER EFFICIENCY AND THEORY OF VECTOR MAXIMIZATION
    GEOFFRION, AM
    [J]. JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS, 1968, 22 (03) : 618 - +
  • [9] Bi-Criteria Scheduling of Surgical Services for an Outpatient Procedure Center
    Gul, Serhat
    Denton, Brian T.
    Fowler, John W.
    Huschka, Todd
    [J]. PRODUCTION AND OPERATIONS MANAGEMENT, 2011, 20 (03) : 406 - 417
  • [10] A sequential stochastic mixed integer programming model for tactical master surgery scheduling
    Kumar, Ashwani
    Costa, Alysson M.
    Fackrell, Mark
    Taylor, Peter G.
    [J]. EUROPEAN JOURNAL OF OPERATIONAL RESEARCH, 2018, 270 (02) : 734 - 746