We consider continuous-time robust network flows with capacity constraints and unknown but bounded time-varying demand. The problem of interest is to design a control strategy off-line with no knowledge of the demand realization. Such a control strategy regulates the flow on-line as a function of the realized demand. We address both the case of systems without and with buffers. The main novelty in this work is that we consider a convex cost which is a function of the long-run average-flow and average-demand. We distinguish a worst-case scenario where the demand is the worst-one from a deterministic scenario where the demand has a neutral behavior. The resulting strategies are called min-max or deterministically optimal respectively. The main contribution are constructive methods to design either min-max or deterministically optimal strategies. We prove that while the min-max optimal strategy is memoryless, i.e., it is a piece-wise affine function of the current demand, deterministically optimal strategy must keep memory of the average flow up to the current time.

Bauso, D., Blanchini, F., Pesenti, R. (2010). Optimization of Long-Run Average-Flow Cost in Networks With Time-Varying Unknown Demand. IEEE TRANSACTIONS ON AUTOMATIC CONTROL, 55, 20-31 [10.1109/TAC.2009.2034204].

Optimization of Long-Run Average-Flow Cost in Networks With Time-Varying Unknown Demand

BAUSO, Dario;
2010-01-01

Abstract

We consider continuous-time robust network flows with capacity constraints and unknown but bounded time-varying demand. The problem of interest is to design a control strategy off-line with no knowledge of the demand realization. Such a control strategy regulates the flow on-line as a function of the realized demand. We address both the case of systems without and with buffers. The main novelty in this work is that we consider a convex cost which is a function of the long-run average-flow and average-demand. We distinguish a worst-case scenario where the demand is the worst-one from a deterministic scenario where the demand has a neutral behavior. The resulting strategies are called min-max or deterministically optimal respectively. The main contribution are constructive methods to design either min-max or deterministically optimal strategies. We prove that while the min-max optimal strategy is memoryless, i.e., it is a piece-wise affine function of the current demand, deterministically optimal strategy must keep memory of the average flow up to the current time.
2010
Bauso, D., Blanchini, F., Pesenti, R. (2010). Optimization of Long-Run Average-Flow Cost in Networks With Time-Varying Unknown Demand. IEEE TRANSACTIONS ON AUTOMATIC CONTROL, 55, 20-31 [10.1109/TAC.2009.2034204].
File in questo prodotto:
File Dimensione Formato  
BlanchiniTAC.pdf

accesso aperto

Descrizione: Articolo
Dimensione 513.61 kB
Formato Adobe PDF
513.61 kB Adobe PDF Visualizza/Apri

I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.

Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/10447/58923
Citazioni
  • ???jsp.display-item.citation.pmc??? ND
  • Scopus 18
  • ???jsp.display-item.citation.isi??? 19
social impact