This paper presents a problem of optimal flow control for discrete-time M|M|l queues, where the decision-maker seeks to maximize the throughput subject to a bound on the average queue size. The problem is cast as a constrained Markov decision process and solved via Lagrangian arguments. The optimal strategy is shown to be a threshold policy which asturates the constraint. The method of analysis proceeds through the discounted version of the Lagrangian problems whose value functions are shown to be integer-concave. Dynamic Programming and stochastic comparison ideas constitute the main ingredients of the solution
We consider a general control problem for networks which includes the special cases of scheduling in...
The problem of finding the optimal routing and flow control of a single-class Markovian network unde...
We present a new unifying framework for investigating throughput-WIP (Work-in-Process) optimal contr...
This paper presents a problem of optimal flow control for discrete M|M|1 queues. The problem is cast...
The purpose of flow control is to reduce the congestion experienced in many systems, such as data ne...
The first part considers discrete-time constrained Markov Decision Processes (MDPs). At each epoch, ...
We consider the problem of dynamic flow control of arriving packets into an infinite buffer. The ser...
In manufacturing and telecommunication systems we often encounter the situation that there are diffe...
In [5], the authors showed that threshold policies solve an optimal flow control problem for discret...
The (optimal) design of many engineering systems can be adequately recast as a Markov decision proce...
We consider a class of queueing processes represented by a Skorokhod problem coupled with a controll...
In this talk we consider queueing systems which are subject to control (e.g. admission control, rout...
We consider a GI/M/s queuing system that is controlled by either accepting or rejecting arriving cus...
Two types of traffic, e.g., voice and data, share a single synchronous and noisy communication chann...
AbstractWe address a rate control problem associated with a single server Markovian queueing system ...
We consider a general control problem for networks which includes the special cases of scheduling in...
The problem of finding the optimal routing and flow control of a single-class Markovian network unde...
We present a new unifying framework for investigating throughput-WIP (Work-in-Process) optimal contr...
This paper presents a problem of optimal flow control for discrete M|M|1 queues. The problem is cast...
The purpose of flow control is to reduce the congestion experienced in many systems, such as data ne...
The first part considers discrete-time constrained Markov Decision Processes (MDPs). At each epoch, ...
We consider the problem of dynamic flow control of arriving packets into an infinite buffer. The ser...
In manufacturing and telecommunication systems we often encounter the situation that there are diffe...
In [5], the authors showed that threshold policies solve an optimal flow control problem for discret...
The (optimal) design of many engineering systems can be adequately recast as a Markov decision proce...
We consider a class of queueing processes represented by a Skorokhod problem coupled with a controll...
In this talk we consider queueing systems which are subject to control (e.g. admission control, rout...
We consider a GI/M/s queuing system that is controlled by either accepting or rejecting arriving cus...
Two types of traffic, e.g., voice and data, share a single synchronous and noisy communication chann...
AbstractWe address a rate control problem associated with a single server Markovian queueing system ...
We consider a general control problem for networks which includes the special cases of scheduling in...
The problem of finding the optimal routing and flow control of a single-class Markovian network unde...
We present a new unifying framework for investigating throughput-WIP (Work-in-Process) optimal contr...