4.2. : * Jobs arrive dynamically over time. * Goal: Schedule the jobs on the machines to minimize the maximum lateness.
2.3. : * Sort the jobs in increasing order of due date. * Schedule each job on the first available machine. Here is a sample of what the solutions
Here is a sample of what the solutions manual could look like in pdf format: and $0$ otherwise.
1.1. : A manufacturing system has 5 machines and 10 jobs to be processed. Each job has a processing time and a due date. The goal is to schedule the jobs on the machines to minimize the maximum lateness. Here is a sample of what the solutions
1.2. : * Define the decision variables: $x_ij = 1$ if job $j$ is scheduled on machine $i$, and $0$ otherwise. * Define the objective function: Minimize $\max_j (C_j - d_j)$, where $C_j$ is the completion time of job $j$ and $d_j$ is the due date of job $j$. * Define the constraints: + Each job can only be scheduled on one machine: $\sum_i x_ij = 1$ for all $j$. + Each machine can only process one job at a time: $\sum_j x_ij \leq 1$ for all $i$. + The completion time of job $j$ is the sum of the processing times of all jobs scheduled on the same machine: $C_j = \sum_i p_ij x_ij$.
See above.