631 research outputs found
Scheduling for a Processor Sharing System with Linear Slowdown
We consider the problem of scheduling arrivals to a congestion system with a
finite number of users having identical deterministic demand sizes. The
congestion is of the processor sharing type in the sense that all users in the
system at any given time are served simultaneously. However, in contrast to
classical processor sharing congestion models, the processing slowdown is
proportional to the number of users in the system at any time. That is, the
rate of service experienced by all users is linearly decreasing with the number
of users. For each user there is an ideal departure time (due date). A
centralized scheduling goal is then to select arrival times so as to minimize
the total penalty due to deviations from ideal times weighted with sojourn
times. Each deviation is assumed quadratic, or more generally convex. But due
to the dynamics of the system, the scheduling objective function is non-convex.
Specifically, the system objective function is a non-smooth piecewise convex
function. Nevertheless, we are able to leverage the structure of the problem to
derive an algorithm that finds the global optimum in a (large but) finite
number of steps, each involving the solution of a constrained convex program.
Further, we put forward several heuristics. The first is the traversal of
neighbouring constrained convex programming problems, that is guaranteed to
reach a local minimum of the centralized problem. This is a form of a "local
search", where we use the problem structure in a novel manner. The second is a
one-coordinate "global search", used in coordinate pivot iteration. We then
merge these two heuristics into a unified "local-global" heuristic, and
numerically illustrate the effectiveness of this heuristic
Robust Appointment Scheduling with Heterogeneous Costs
Designing simple appointment systems that under uncertainty in service times, try to achieve both high utilization of expensive medical equipment and personnel as well as short waiting time for patients, has long been an interesting and challenging problem in health care. We consider a robust version of the appointment scheduling problem, introduced by Mittal et al. (2014), with the goal of finding simple and easy-to-use algorithms. Previous work focused on the special case where per-unit costs due to under-utilization of equipment/personnel are homogeneous i.e., costs are linear and identical. We consider the heterogeneous case and devise an LP that has a simple closed-form solution. This solution yields the first constant-factor approximation for the problem. We also find special cases beyond homogeneous costs where the LP leads to closed form optimal schedules. Our approach and results extend more generally to convex piece-wise linear costs.
For the case where the order of patients is changeable, we focus on linear costs and show that the problem is strongly NP-hard when the under-utilization costs are heterogeneous. For changeable order with homogeneous under-utilization costs, it was previously shown that an EPTAS exists. We instead find an extremely simple, ratio-based ordering that is 1.0604 approximate
A State Transition MIP Formulation for the Unit Commitment Problem
In this paper, we present the state-transition formulation for the unit commitment problem. This formulation uses new decision variables that capture the state transitions of the generators, instead of their on/off statuses. We show that this new approach produces a formulation which naturally includes valid inequalities, commonly used to strengthen other formulations. We demonstrate the performance of the state-transition formulation and observe that it leads to improved solution times especially in longer time-horizon instances. As an important consequence, the new formulation allows us to solve realistic instances in less than 12 minutes on an ordinary desktop PC, leading to a speed-up of a factor of almost two, in comparison to the nearest contender. Finally, we demonstrate the value of considering longer planning horizons in UC problems
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