There are m machines and n jobs. Each job contains exactly m operations. The i-th operation of the job must be executed on the i-th machine. No machine can perform more than one operation simultaneously. For each operation of each job, execution time is specified.

Operations within one job must be performed in the specified order. The first operation gets executed on the first machine, then (as the first operation is finished) the second operation on the second machine, and so on until the m-th operation. Jobs can be executed in any order, however. Problem definition implies that this job order is exactly the same for each machine. The problem is to determine the optimal such arrangement, i.e. the one with the shortest possible total job execution makespan.

The sequencing problem can be stated as determining a sequence S such that one or several sequencing objectives are optimized.

1. (Average) Flow time, ${\displaystyle \sum (w_{i})F_{i}}$ 
2. Makespan, C_max
3. (Average) Tardiness, ${\displaystyle \sum (w_{i})T_{i}}$ 
4. ....

detailed discussion of performance measurement can be found in Malakooti(2013).^[1]

As presented by Garey et al. (1976),^[2] most of extensions of the flow-shop-scheduling problems are NP-hard and few of them can be solved optimally in O(nlogn); for example, F2|prmu|C_max can be solved optimally by using Johnson's Rule.^[3]

Taillard provides substantial benchmark problems for scheduling flow shops, open shops, and job shops.^[4]

The proposed methods to solve flow-shop-scheduling problems can be classified as exact algorithm such as branch and bound and heuristic algorithm such as genetic algorithm.

Minimizing makespan, C_max edit

F2|prmu|C_max and F3|prmu|C_max can be solved optimally by using Johnson's Rule^[3] but for general case there is no algorithm that guarantee the optimality of the solution.

The flow shop contains n jobs simultaneously available at time zero and to be processed by two machines arranged in series with unlimited storage in between them. The processing time of all jobs are known with certainty. It is required to schedule n jobs on machines so as to minimize makespan. The Johnson's rule for scheduling jobs in two-machine flow shop is given below.

In an optimal schedule, job i precedes job j if min{p_1i,p_2j} < min{p_1j,p_2i}. Where as, p_1i is the processing time of job i on machine 1 and p_2i is the processing time of job i on machine 2. Similarly, p_1j and p_2j are processing times of job j on machine 1 and machine 2 respectively.

For Johnson's algorithm:

Let p_1j be the processing time of job j on machine 1

and p_2j the processing time of job j on machine 2

Johnson's algorithm:

1. Form set1 containing all the jobs with p_1j < p_2j
2. Form set2 containing all the jobs with p_1j > p_2j, the jobs with p_1j = p_2j may be put in either set.
3. Form the sequence as follows:

   (i) The job in set1 go first in the sequence and they go in increasing order of p_1j (SPT)

   (ii) The jobs in set2 follow in decreasing order of p_2j (LPT). Ties are broken arbitrarily.

This type schedule is referred as SPT(1)–LPT(2) schedule.

A detailed discussion of the available solution methods are provided by Malakooti (2013).^[1]

• Open-shop scheduling
• Job-shop scheduling