论文信息 - Stability bounds in networks with dynamic link capacities

Stability bounds in networks with dynamic link capacities

We address the problem of stability in networks where the link capacities can change dynamically. We show that every network running a greedy scheduling policy is universally stable at any injection rate r<1/(Cd), where d is the largest number of links crossed by any packet and C is the maximum link capacity. We also show that system-wide time priority scheduling policies are universally stable at any injection rate r<1/(C(d-1)).

Vicent Cholvi

[1] Boaz Patt-Shamir,et al. New stability results for adversarial queuing , 2004, SIAM J. Comput..

[2] Allan Borodin,et al. Adversarial queuing theory , 2001, JACM.

[3] Jean-Yves Le Boudec,et al. Delay Bounds in a Network with Aggregate Scheduling , 2000, QofIS.

[4] Allan Borodin,et al. Adversarial queueing theory , 1996, STOC '96.

[5] Rene L. Cruz,et al. A calculus for network delay, Part I: Network elements in isolation , 1991, IEEE Trans. Inf. Theory.

[6] Paul G. Spirakis,et al. Performance and stability bounds for dynamic networks , 2007, J. Parallel Distributed Comput..

[7] Antonio Fernández,et al. Universal stability results for low rate adversaries in packet switched networks , 2003, IEEE Communications Letters.

[8] Baruch Awerbuch,et al. Universal-stability results and performance bounds for greedy contention-resolution protocols , 2001, JACM.