genetic algorithm - not running - reg

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Kallam Haranadha Reddy
Kallam Haranadha Reddy am 16 Nov. 2017
I converted a GAMS model (mip) file into cplexmps format using PAVER web server. I read this file into MATLAB R2015b using mpsread command.
Then i got the following output.
problem = mpsread('cplex(1).mps')
problem =
f: [1925x1 double]
Aineq: [216x1925 double]
bineq: [216x1 double]
Aeq: [773x1925 double]
beq: [773x1 double]
lb: [1925x1 double]
ub: [1925x1 double]
intcon: [0x1 double]
solver: 'linprog'
options: [1x1 optim.options.Linprog]
Then i made slight modifications as follows to use the problem with genetic algorithm solver.
c =(problem.f)';
A=problem.Aineq;
b=problem.bineq;
Aeq=problem.Aeq;
beq=problem.beq;
lb=problem.lb;
ub=problem.ub;
A = full(A);
Aeq=full(Aeq);
fun = @(x) sum(c.*x);
A=[A;Aeq;-Aeq];
b=[b;beq;-beq];
options = gaoptimset('PlotFcn',@gaplotbestf)
when i wanted to run ga with the following commands, it is showing 'busy' symbol for an abnormal time. how can i get the output.
[x,fval]=ga(fun,1925,A,b,[],[],lb,ub,[],options)
  2 Kommentare
KSSV
KSSV am 16 Nov. 2017
May be the data is huge......for your computer spec. YOu first try with a down sampled/ less data.
Kallam Haranadha Reddy
Kallam Haranadha Reddy am 16 Nov. 2017
sir,
if the data is huge can i reduce the data using principal component analysis. i.e., can i reduce the size of Aineq, Aeq of my above problem using principal component analysis.

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Antworten (1)

Walter Roberson
Walter Roberson am 16 Nov. 2017
ga() uses random searching that wanders around local minima hoping to find a good location, with no certainty at all that it will ever find the best conformation. The number of combinations to try rises exponentially.
linprog() uses linear programming techniques that know how to split the problem domain according to constraints and then run a minimizer on each subdomain that is certain to find the minima over that subdomain; it goes through all of the subdomains and picks the one that does the best. It can take a while to create all of the subdomains implied by the constraints, but because each sub-problem is linear, it is certain to be able to optimize it -- the optimum is always at one of the corners of each linear sub-domain.
  1 Kommentar
Kallam Haranadha Reddy
Kallam Haranadha Reddy am 16 Nov. 2017
sir,
if the data is huge can i reduce the size of the data using principal component analysis. i.e., can i reduce the size of Aineq, Aeq of my above problem using principal component analysis.

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