# Substitute Scheduling Program/Algorithm

I am working on the following problem right now for a client that will create the most economic schedule (uses the least substitutes) given that:

• Substitutes should work in place of teacher for as consecutive a time as possible (*Not a huge concern)
• Subs can only work for 6 periods

So far I have a Teacher class (as shown below) and an Organizer class that actually creates the optimal schedule. Right now I am just having the program loop across the grid filling in for each substitute.

Teacher[] t= new Teacher[14];
Organizer o = new Organizer(t);
o.sort();

int[][] g = o.getGrid();

Example input:

t[0] = new Teacher("Teacher 1", "Mr", new int[]{1,0,1,0,0,0,0});
t[1] = new Teacher("Teacher 2","Mr", new int[]{1,1,0,1,1,0,1});
t[2] = new Teacher("Teacher 3","Mr", new int[]{0,1,1,1,1,1,0});
t[3] = new Teacher("Teacher 4","Mr", new int[]{1,1,0,1,1,0,1});
t[4] = new Teacher("Teacher 5","Mr", new int[]{1,1,0,0,1,1,1});
t[5] = new Teacher("Teacher 6", "Mr", new int[]{1,1,1,0,0,1,1});
t[6] = new Teacher("Teacher 7", "Mr", new int[]{0,0,1,0,1,1,1});
t[7] = new Teacher("Teacher 8", "Mr", new int[]{1,1,0,0,1,1,1});
t[8] = new Teacher("Teacher 9", "Mr", new int[]{1,1,1,1,1,0,0});
t[9] = new Teacher("Teacher 10", "Mr", new int[]{0,0,0,1,1,1,0});
t[10] = new Teacher("Teacher 11", "Mr", new int[]{0,0,1,0,0,1,1});
t[11] = new Teacher("Teacher 12", "Mr", new int[]{0,0,1,1,0,1,0});
t[12] = new Teacher("Teacher 13", "Mr", new int[]{1,1,1,1,0,0,0});
t[13] = new Teacher("Teacher 14", "Mr", new int[]{1,1,0,1,1,0,1});

Output for the above (with the algorithm I am using):

P1  P2  P3  P4  P5  P6  P7
Teacher 1           1   -   1   -   -   -   -
Teacher 2           2   1   -   1   1   -   1
Teacher 3           -   2   2   2   2   2   -
Teacher 4           3   3   -   3   3   -   3
Teacher 5           4   4   -   -   4   3   4
Teacher 6           5   5   4   -   -   4   5
Teacher 7           -   -   5   -   5   5   6
Teacher 8           6   6   -   -   6   6   7
Teacher 9           7   7   6   7   7   -   -
Teacher 10          -   -   -   8   8   7   -
Teacher 11          -   -   8   -   -   8   8
Teacher 12          -   -   9   9   -   9   -
Teacher 13          8   9   10  10  -   -   -
Teacher 14          9   10  -   11  9   -   10

As you can see, the program just loops across the valid spaces, filling them in with subs until the sub reaches its max teaching periods, and then begins a new sub. The thing is, I have been able to get the number of subs used down to 10 when doing it by hand, so I have been trying to find a more efficient algorithm, with no avail.

For this input, the minimum number of subs used is 9 (constrained by P2 column), so I would like to see if there is any possible way that I can accomplish that number, or 10 subs at the very least. Thanks in advance!

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