On the definition of "on-line" in job scheduling problems

Subscribe (Full Service)


	Search: The ACM Digital Library The Guide

	Feedback

On the definition of "on-line" in job scheduling problems

Full text

Pdf (992 KB)

Source

ACM SIGACT News archive
Volume 36 , Issue 1 (March 2005) table of contents

Pages: 122 - 131

Year of Publication: 2005

ISSN:0163-5700

Authors

Dror G. Feitelson	The Hebrew University of Jerusalem, Jerusalem, Israel
Ahuva W. Mu'alem	The Hebrew University of Jerusalem, Jerusalem, Israel

Publisher

ACM New York, NY, USA

Bibliometrics

Downloads (6 Weeks): 2, Downloads (12 Months): 11, Citation Count: 0

Additional Information:

abstract references index terms collaborative colleagues

Tools and Actions:	Review this Article Save this Article to a Binder Display Formats: BibTeX EndNote ACM Ref

DOI Bookmark:	Use this link to bookmark this Article: http://doi.acm.org/10.1145/1052796.1052797 What is a DOI?

ABSTRACT

The conventional model of on-line scheduling postulates that jobs have non-trivial release dates, and are not known in advance. However, it fails to impose any stability constraints, leading to algorithms and analyses that must deal with unrealistic load conditions arising from trivial release dates as a special case. In an effort to make the model more realistic, we show how stability can be expressed as a simple constraint on release times and processing times. We then give empirical and theoretical justifications that such a constraint can close the gap between the theory and practice. As it turns out, this constraint seems to trivialize the scheduling problem.

REFERENCES

Note: OCR errors may be found in this Reference List extracted from the full text article. ACM has opted to expose the complete List rather than only correct and linked references.

	1	A. Batat, Gang Scheduling with Memory Considerations. Master's thesis, Hebrew University, Sep 1999.
	2	Allan Borodin , Jon Kleinberg , Prabhakar Raghavan , Madhu Sudan , David P. Williamson, Adversarial queuing theory, Journal of the ACM (JACM), v.48 n.1, p.13-38, Jan. 2001 [doi>10.1145/363647.363659]
	3	C. Chekuri , R. Motwani , B. Natarajan , C. Stien, Approximation techniques for average completion time scheduling, Proceedings of the eighth annual ACM-SIAM symposium on Discrete algorithms, p.609-618, January 05-07, 1997, New Orleans, Louisiana, United States
	4	D. G. Feitelson, A Survey of Scheduling in Multiprogrammed Parallel Systems. Research Report RC 19790 (87657), IBM T. J. Watson Research Center, Oct 1994.
	5	Dror G. Feitelson , Larry Rudolph , Uwe Schwiegelshohn , Kenneth C. Sevcik , Parkson Wong, Theory and Practice in Parallel Job Scheduling, Proceedings of the Job Scheduling Strategies for Parallel Processing, p.1-34, April 05, 1997
	6	M. Garey and R. Graham, "Bounds for multiprocessor scheduling with resource constraints". SIAM J. Comput.4(2), pp. 187--200, Jun 1975.
	7	R. L. Graham, E. L. Lawler, J. K. Lenstra, and A. H. G. Rinnooy Kan, "Optimization and approximation in deterministic sequencing and scheduling: a survey". In Annals of Discrete Mathematics 5, pp. 287--326, North-Holland, 1979.
	8	Leonard Kleinrock, Theory, Volume 1, Queueing Systems, Wiley-Interscience, 1975
	9	Stefano Leonardi , Danny Raz, Approximating total flow time on parallel machines, Proceedings of the twenty-ninth annual ACM symposium on Theory of computing, p.110-119, May 04-06, 1997, El Paso, Texas, United States [doi>10.1145/258533.258562]
	10	David A. Lifka, The ANL/IBM SP Scheduling System, Proceedings of the Workshop on Job Scheduling Strategies for Parallel Processing, p.295-303, April 25, 1995
	11	A. Mu'alem and D. G. Feitelson, "Bicriteria scheduling for parallel jobs". In Multidisciplinary Int'l Conf. Scheduling: Theory & Apps. (MISTA), pp. 606--619, Aug 2003.
	12	D. L. Palumbo, The Derivation and Experimental Verification of Clock Synchronization Theory, IEEE Transactions on Computers, v.43 n.6, p.676-686, June 1994 [doi>10.1109/12.286301]
	13	Jiri Sgall, On-line Scheduling, Developments from a June 1996 seminar on Online algorithms: the state of the art, p.196-231, January 1998