Optimize fair teams when team size is can vary.

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Levi Shelton
Levi Shelton el 21 de Nov. de 2022
Editada: Matt J el 21 de Nov. de 2022
I am writing a script to pick teams as fairly as possible from a list of names and associated player values. The teams must have 4 or 5 members per team. I have a good method of optimizing teams when the list is divisible by 4 or 5 directly so that each team has the same number of players. My hang up is the list quanity is unpredictable and may end up being something like 17, where I would want to optimize each team's total value with the option of some teams having 4 members and others 5, i.e. 3 teams of 4 and 1 team of 5. I'm open to modifications to my current picking method, or if it's not possible, having a seperate optimizing loop for just this scenario that could be selected when needed. Thanks!
Current code is:
minstd = 5;
%teamsz = 4;
teamsz = 5;
I = height(playerval)/teamsz;
for i = 1:100000
idx = kron(eye(I),ones(teamsz,1));
idx = idx(randperm(end),randperm(end));
teamtry = playerval.*idx;
teamsums = sum(teamtry);
stdev = std(teamsums);
if stdev < minstd
minstd = stdev;
finalstd = stdev;
finalteams = idx;
finalteamscore = teamsums;
end
end
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Matt J
Matt J el 21 de Nov. de 2022
Editada: Matt J el 21 de Nov. de 2022
@Levi Shelton Rather than optimizing standard deviation of teamsums, you should consider instead optimizing the mean absolute deviation about the mean. This can be posed as a binary linear program and would probably be more reliable than random trial and error.
Levi Shelton
Levi Shelton el 21 de Nov. de 2022
@Matt J Thanks for the advice, I'll look into this method. I would certainly prefer a discrete solution as opposed to hammering randperm and hoping for the best.

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Matt J
Matt J el 21 de Nov. de 2022
Editada: Matt J el 21 de Nov. de 2022
Ran in:
Instead of using kron to set up your initial matrix idx, use blkdiag:
nPlayers=17;
minTeams=floor(nPlayers/5); %minimum number of teams
maxTeams=ceil(nPlayers/4); %minimum number of teams
nTeams=minTeams:maxTeams;
M=numel(nTeams);
for i=1:M
N=nTeams(i);
c=diophantine(ones(1,N),nPlayers,[4,5]);
if ~isempty(c);
memberships=unique(sort(c,2,'descend'),'rows'); break;
end
end
memberships %number of people on each team
memberships = 1×4
5 4 4 4
args=arrayfun(@(z) ones(z,1), memberships,'uni',0);
idx=blkdiag(args{:})
idx = 17×4
1 0 0 0 1 0 0 0 1 0 0 0 1 0 0 0 1 0 0 0 0 1 0 0 0 1 0 0 0 1 0 0 0 1 0 0 0 0 1 0
  1 comentario
Matt J
Matt J el 21 de Nov. de 2022
Editada: Matt J el 21 de Nov. de 2022
Thanks for the advice, I'll look into this method. I would certainly prefer a discrete solution as opposed to hammering randperm and hoping for the best.
After membership is computed as above, we can continue as below, using the FEX download minl1intlin,
https://www.mathworks.com/matlabcentral/fileexchange/52795-constrained-minimum-l1-norm-solutions-of-linear-equations
to compute the mean absolute deviation from mean solution:
M=sum(membership); Im=speye(M); em=ones(1,M); %number of players
N=numel(membership); In=speye(N); en=ones(1,N); %number of teams
V=kron(In,playerval(:)');
C=full(V-mean(V,1))/N; %difference-from-mean operator
Aeq_row=kron(en,Im); beq_row=em(:); %each player belongs to 1 team
Aeq_col=kron(In,em); beq_col=membership(:); %total players per team = membership
Aeq=[Aeq_row;Aeq_col]; %total equality constraints
beq=[beq_row;beq_col];
lb=zeros(M*N,1); ub=lb+1; intcon=1:M*N; %Force solution to be binary
X=minL1intlin(C,zeros(N,1),intcon, [],[],Aeq,beq,lb,ub); %solve
X=reshape(round(X),M,N) %X(i,j) assigns i-th player to j-th team

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