Staffing to Stabilize the Tail Probability of Delay in Service Systems with Time-Varying Demand

Analytic formulas are developed to set the time-dependent number of servers to stabilize the tail probability of customer waiting times for the Gt/GI/st + GI queueing model, which has a nonstationary non-Poisson arrival process (the Gt), nonexponential service times (the first GI), and allows customer abandonment according to a nonexponential patience distribution (the +GI). Specifically, for any delay target w > 0 and probability target α ∈ (0, 1), we determine appropriate staffing levels (the st) so that the time-varying probability that the waiting time exceeds a maximum acceptable value w is stabilized at α at all times. In addition, effective approximating formulas are provided for other important performance functions such as the probabilities of delay and abandonment, and the means of delay and queue length. Many-server heavy-traffic limit theorems in the efficiency-driven regime are developed to show that (i) the proposed staffing function achieves the goal asymptotically as the scale increases, a...

[1]  Barry L. Nelson,et al.  Modelling and simulating non-stationary arrival processes to facilitate analysis , 2011, J. Simulation.

[2]  W. Whitt,et al.  APPENDIX to Stabilizing Performance in Many-Server Queues with Time-Varying Arrivals and Customer Feedback , 2013 .

[3]  Ward Whitt,et al.  A many-server fluid limit for the Gt/G//st+G/ queueing model experiencing periods of overloading , 2012, Oper. Res. Lett..

[4]  Avishai Mandelbaum,et al.  Statistical Analysis of a Telephone Call Center , 2005 .

[5]  Ward Whitt,et al.  Staffing of Time-Varying Queues to Achieve Time-Stable Performance , 2008, Manag. Sci..

[6]  Ward Whitt,et al.  Are Call Center and Hospital Arrivals Well Modeled by Nonhomogeneous Poisson Processes? , 2014, Manuf. Serv. Oper. Manag..

[7]  Inneke Van Nieuwenhuyse,et al.  Controlling excessive waiting times in small service systems with time-varying demand: An extension of the ISA algorithm , 2013, Decis. Support Syst..

[8]  Ward Whitt,et al.  Many‐server loss models with non‐poisson time‐varying arrivals , 2017 .

[9]  Avishai Mandelbaum,et al.  Erlang-R: A Time-Varying Queue with Reentrant Customers, in Support of Healthcare Staffing , 2014, Manuf. Serv. Oper. Manag..

[10]  Avishai Mandelbaum,et al.  Call Centers with Impatient Customers: Many-Server Asymptotics of the M/M/n + G Queue , 2005, Queueing Syst. Theory Appl..

[11]  Ward Whitt,et al.  Stabilizing Customer Abandonment in Many-Server Queues with Time-Varying Arrivals , 2012, Oper. Res..

[12]  Avishai Mandelbaum,et al.  Telephone Call Centers: Tutorial, Review, and Research Prospects , 2003, Manuf. Serv. Oper. Manag..

[13]  Ward Whitt,et al.  STAFFING A SERVICE SYSTEM WITH NON-POISSON NON-STATIONARY ARRIVALS , 2016 .

[14]  Ward Whitt,et al.  Server Staffing to Meet Time-Varying Demand , 1996 .

[15]  Avishai Mandelbaum,et al.  Designing a Call Center with Impatient Customers , 2002, Manuf. Serv. Oper. Manag..

[16]  Zeynep Akşin,et al.  The Modern Call Center: A Multi‐Disciplinary Perspective on Operations Management Research , 2007 .

[17]  W Mark,et al.  [Hospital nurse staffing and quality of care]. , 2005, Professioni infermieristiche.

[18]  Ward Whitt,et al.  STABILIZING PERFORMANCE IN NETWORKS OF QUEUES WITH TIME-VARYING ARRIVAL RATES , 2014, Probability in the Engineering and Informational Sciences.

[19]  Ward Whitt,et al.  Many-server heavy-traffic limit for queues with time-varying parameters , 2014, 1401.3933.

[20]  WhittWard,et al.  Stabilizing Customer Abandonment in Many-Server Queues with Time-Varying Arrivals , 2012 .

[21]  Ward Whitt,et al.  STAFFING TO STABILIZE BLOCKING IN LOSS MODELS WITH TIME-VARYING ARRIVAL RATES , 2015, Probability in the Engineering and Informational Sciences.

[22]  Ward Whitt,et al.  Many-Server Fluid Queue , 2010 .

[23]  Ding Ding,et al.  Models and Insights for Hospital Inpatient Operations: Time-Dependent ED Boarding Time , 2015, Manag. Sci..

[24]  Stephen L Hillis,et al.  Effects of weekend admission and hospital teaching status on in-hospital mortality. , 2004, The American journal of medicine.

[25]  Ran Liu Modeling and Simulation of Nonstationary Non-Poisson Processes. , 2013 .

[26]  Ward Whitt,et al.  Coping with Time‐Varying Demand When Setting Staffing Requirements for a Service System , 2007 .

[27]  M. Bullard,et al.  Revisions to the Canadian Emergency Department Triage and Acuity Scale (CTAS) Guidelines. , 2014, CJEM.