Time indexed formulation of scheduling problems
In this thesis, we study various approaches that could be used in finding a lower bound for single and parallel machine scheduling problems. These approaches are based on integer programming formulations involving binary variables indexed by (i,t), where i denotes a job and t is a time period. F...
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2009
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ndltd-UBC-oai-circle.library.ubc.ca-2429-58502018-01-05T17:32:46Z Time indexed formulation of scheduling problems Williams, David Niranian In this thesis, we study various approaches that could be used in finding a lower bound for single and parallel machine scheduling problems. These approaches are based on integer programming formulations involving binary variables indexed by (i,t), where i denotes a job and t is a time period. For the single machine case, we provide an approximation scheme and a Lagrangian relaxation procedure both of which produce good lower bounds. We also present a new column generation algorithm which solves the LP-relaxation of time-indexed formulation using fewer columns than the standard column generation procedure. In chapter 3 we present a new integer programming formulation for the movie scheduling problem, based on time indexed variables. This formulation led us to investigate the general parallel machine scheduling problem, for which we present a column generation procedure, which is an extension of the work done by van den Akker for the single machine case. Business, Sauder School of Graduate 2009-03-10T19:09:23Z 2009-03-10T19:09:23Z 1997 1997-05 Text Thesis/Dissertation http://hdl.handle.net/2429/5850 eng For non-commercial purposes only, such as research, private study and education. Additional conditions apply, see Terms of Use https://open.library.ubc.ca/terms_of_use. 1530610 bytes application/pdf |
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NDLTD |
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English |
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Others
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NDLTD |
| description |
In this thesis, we study various approaches that could be used in finding
a lower bound for single and parallel machine scheduling problems. These
approaches are based on integer programming formulations involving binary
variables indexed by (i,t), where i denotes a job and t is a time period.
For the single machine case, we provide an approximation scheme and a Lagrangian
relaxation procedure both of which produce good lower bounds.
We also present a new column generation algorithm which solves the LP-relaxation
of time-indexed formulation using fewer columns than the standard
column generation procedure.
In chapter 3 we present a new integer programming formulation for the
movie scheduling problem, based on time indexed variables. This formulation
led us to investigate the general parallel machine scheduling problem, for
which we present a column generation procedure, which is an extension of
the work done by van den Akker for the single machine case. === Business, Sauder School of === Graduate |
| author |
Williams, David Niranian |
| spellingShingle |
Williams, David Niranian Time indexed formulation of scheduling problems |
| author_facet |
Williams, David Niranian |
| author_sort |
Williams, David Niranian |
| title |
Time indexed formulation of scheduling problems |
| title_short |
Time indexed formulation of scheduling problems |
| title_full |
Time indexed formulation of scheduling problems |
| title_fullStr |
Time indexed formulation of scheduling problems |
| title_full_unstemmed |
Time indexed formulation of scheduling problems |
| title_sort |
time indexed formulation of scheduling problems |
| publishDate |
2009 |
| url |
http://hdl.handle.net/2429/5850 |
| work_keys_str_mv |
AT williamsdavidniranian timeindexedformulationofschedulingproblems |
| _version_ |
1718587209999712256 |