6 research outputs found
Optimal Algorithms for Scheduling under Time-of-Use Tariffs
We consider a natural generalization of classical scheduling problems in which using a time unit for processing a job causes some time-dependent cost which must be paid in addition to the standard scheduling cost. We study the scheduling objectives of minimizing the makespan and the sum of (weighted) completion times. It is not difficult to derive a polynomial-time algorithm for preemptive scheduling to minimize the makespan on unrelated machines. The problem of minimizing the total (weighted) completion time is considerably harder, even on a single machine. We present a polynomial-time algorithm that computes for any given sequence of jobs an optimal schedule, i.e., the optimal set of time-slots to be used for scheduling jobs according to the given sequence. This result is based on dynamic programming using a subtle analysis of the structure of optimal solutions and a potential function argument. With this algorithm, we solve the unweighted problem optimally in polynomial time. For the more general problem, in which jobs may have individual weights, we develop a polynomial-time approximation scheme (PTAS) based on a dual scheduling approach introduced for scheduling on a machine of varying speed. As the weighted problem is strongly NP-hard, our PTAS is the best possible approximation we can hope for
Optimal Algorithms and a PTAS for Cost-Aware Scheduling
We consider a natural generalization of classical scheduling
problems in which using a time unit for processing a job causes some
time-dependent cost which must be paid in addition to the standard
scheduling cost. We study the scheduling objectives of minimizing the
makespan and the sum of (weighted) completion times. It is not dicult
to derive a polynomial-time algorithm for preemptive scheduling to minimize
the makespan on unrelated machines. The problem of minimizing
the total (weighted) completion time is considerably harder, even on a
single machine. We present a polynomial-time algorithm that computes
for any given sequence of jobs an optimal schedule, i.e., the optimal set of
time-slots to be used for scheduling jobs according to the given sequence.
This result is based on dynamic programming using a subtle analysis
of the structure of optimal solutions and a potential function argument.
With this algorithm, we solve the unweighted problem optimally in polynomial
time. Furthermore, we argue that there is a (4+")-approximation
algorithm for the strongly NP-hard problem with individual job weights.
For this weighted version, we also give a PTAS based on a dual scheduling
approach introduced for scheduling on a machine of varying speed
Optimal Algorithms and a PTAS for Cost-Aware Scheduling
We consider a natural generalization of classical scheduling
problems in which using a time unit for processing a job causes some
time-dependent cost which must be paid in addition to the standard
scheduling cost. We study the scheduling objectives of minimizing the
makespan and the sum of (weighted) completion times. It is not dicult
to derive a polynomial-time algorithm for preemptive scheduling to minimize
the makespan on unrelated machines. The problem of minimizing
the total (weighted) completion time is considerably harder, even on a
single machine. We present a polynomial-time algorithm that computes
for any given sequence of jobs an optimal schedule, i.e., the optimal set of
time-slots to be used for scheduling jobs according to the given sequence.
This result is based on dynamic programming using a subtle analysis
of the structure of optimal solutions and a potential function argument.
With this algorithm, we solve the unweighted problem optimally in polynomial
time. Furthermore, we argue that there is a (4+")-approximation
algorithm for the strongly NP-hard problem with individual job weights.
For this weighted version, we also give a PTAS based on a dual scheduling
approach introduced for scheduling on a machine of varying speed
Optimal Algorithms for Scheduling under Time-of-Use Tariffs
We consider a natural generalization of classical scheduling problems in which using a time unit for processing a job causes some time-dependent cost which must be paid in addition to the standard scheduling cost. We study the scheduling objectives of minimizing the makespan and the sum of (weighted) completion times. It is not difficult to derive a polynomial-time algorithm for preemptive scheduling to minimize the makespan on unrelated machines. The problem of minimizing the total (weighted) completion time is considerably harder, even on a single machine. We present a polynomial-time algorithm that computes for any given sequence of jobs an optimal schedule, i.e., the optimal set of time-slots to be used for scheduling jobs according to the given sequence. This result is based on dynamic programming using a subtle analysis of the structure of optimal solutions and a potential function argument. With this algorithm, we solve the unweighted problem optimally in polynomial time. For the more general problem, in which jobs may have individual weights, we develop a polynomial-time approximation scheme (PTAS) based on a dual scheduling approach introduced for scheduling on a machine of varying speed. As the weighted problem is strongly NP-hard, our PTAS is the best possible approximation we can hope for
Optimal algorithms for scheduling under time-of-use tariffs
We consider a natural generalization of classical scheduling problems to a setting in which using a time unit for processing a job causes some time-dependent cost, the time-of-use tariff, which must be paid in addition to the standard scheduling cost. We focus on preemptive single-machine scheduling and two classical scheduling cost functions, the sum of (weighted) completion times and the maximum completion time, that is, the makespan. While these problems are easy to solve in the classical scheduling setting, they are considerably more complex when time-of-use tariffs must be considered. We contribute optimal polynomial-time algorithms and best possible approximation algorithms. For the problem of minimizing the total (weighted) completion time on a single machine, we present a polynomial-time algorithm that computes for any given sequence of jobs an optimal schedule, i.e., the optimal set of time slots to be used for preemptively scheduling jobs according to the given sequence. This result is based on dynamic programming using a subtle analysis of the structure of optimal solutions and a potential function argument. With this algorithm, we solve the unweighted problem optimally in polynomial time. For the more general problem, in which jobs may have individual weights, we develop a polynomial-time approximation scheme (PTAS) based on a dual scheduling approach introduced for scheduling on a machine of varying speed. As the weighted problem is strongly NP-hard, our PTAS is the best possible approximation we can hope for. For preemptive scheduling to minimize the makespan, we show that there is a comparably simple optimal algorithm with polynomial running time. This is true even in a certain generalized model with unrelated machines
Optimizing low dimensional functions over the integers
We consider box-constrained integer programs with objective g(Wx) + cTx, where g is a âcomplicatedâ function with an m dimensional domain. Here we assume we have nâ« m variables and that Wâ Zm Ă n is an integer matrix with coefficients of absolute value at most Î. We design an algorithm for this problem using only the mild assumption that the objective can be optimized efficiently when all but m variables are fixed, yielding a running time of nm(mÎ)O(m2). Moreover, we can avoid the term nm in several special cases, in particular when c= 0. Our approach can be applied in a variety of settings, generalizing several recent results. An important application are convex objectives of low domain dimension, where we imply a recent result by Hunkenschröder et al. [SIOPTâ22] for the 0-1-hypercube and sharp or separable convex g, assuming W is given explicitly. By avoiding the direct use of proximity results, which only holds when g is separable or sharp, we match their running time and generalize it for arbitrary convex functions. In the case where the objective is only accessible by an oracle and W is unknown, we further show that their proximity framework can be implemented in n(mÎ)O(m2) -time instead of n(mÎ)O(m3). Lastly, we extend the result by Eisenbrand and Weismantel [SODAâ17, TALGâ20] for integer programs with few constraints to a mixed-integer linear program setting where integer variables appear in only a small number of different constraints