-

 

 

 




Optimization Online





 

Job-Shop Scheduling in a Body Shop

Joachim Schauer (joachim.schauer***at***uni-graz.at)
Cornelius Schwarz (cornelius.schwarz***at***uni-bayreuth.de)

Abstract: We study a generalized job-shop problem called the body shop scheduling problem (bssp). This problem arises from the industrial application of welding in a car body production line, where possible collisions between industrial robots have to be taken into account. bssp corresponds to a job-shop problem where the operations of a job have to follow alternating routes on the machines, certain operations of different jobs are not allowed to be processed at the same time and after processing an operation of a certain job a machine might be unavailable for a given time for operations of other jobs. As main results we will show that for three jobs and four machines the special case where only one machine is used by more than one job is already NP-hard. This also implies that the single machine scheduling problem that asks for a makespan minimal schedule of three chains of operations with delays between the operations of a chain is NP-hard. On the positive side, we present a polynomial algorithm for the two job case and a pseudo-polynomial algorithm together with an FPTAS for an arbitrary but constant number of jobs. Hence for a constant number of jobs we fully settle the complexity status of the problem.

Keywords: job-shop, FPTAS, complexity, transversal graph

Category 1: Applications -- OR and Management Sciences (Scheduling )

Category 2: Combinatorial Optimization (Approximation Algorithms )

Citation: "The final publication is available at springerlink.com": http://link.springer.com/article/10.1007%2Fs10951-012-0300-2 DOI: 10.1007/s10951-012-0300-2

Download: [PDF]

Entry Submitted: 03/24/2011
Entry Accepted: 03/24/2011
Entry Last Modified: 12/03/2012

Modify/Update this entry


  Visitors Authors More about us Links
  Subscribe, Unsubscribe
Digest Archive
Search, Browse the Repository

 

Submit
Update
Policies
Coordinator's Board
Classification Scheme
Credits
Give us feedback
Optimization Journals, Sites, Societies
Mathematical Optimization Society