Title :
A New Polynomial Algorithm for Total Tardiness Minimization of the Sequencing Optimal Problem of Parallel Activities
Author :
Li Xingmei ; Zhang Zhaoqing ; Qi Jianxun
Author_Institution :
Sch. of Bus. Manage., North China Electr. Power Univ., Beijing, China
Abstract :
The problem of M activities of N > M parallel activities being adjusted to a procedure chain is one type of the project scheduling. In allusion to M = 3 , a new polynomial algorithm is proposed to minimize the total tardiness criterion. In order to present this algorithm, and search the optimal procedure chain, we propose a Normal Chain Theory by virtue of the relationships of activities´ time parameters, together with the properties that the optimal chain contains the activities with the minimum of earliest finish time. By the analysis of this algorithm, we get the time complexity is O(N log N).
Keywords :
computational complexity; minimisation; polynomial approximation; scheduling; normal chain theory; parallel activities; polynomial algorithm; project scheduling; sequencing optimal problem; time complexity; total tardiness minimization; Algorithm design and analysis; Energy management; Heuristic algorithms; Linear programming; Minimization methods; Parallel programming; Polynomials; Project management; Scheduling algorithm; Traveling salesman problems;
Conference_Titel :
Management and Service Science, 2009. MASS '09. International Conference on
Conference_Location :
Wuhan
Print_ISBN :
978-1-4244-4638-4
Electronic_ISBN :
978-1-4244-4639-1
DOI :
10.1109/ICMSS.2009.5303881
