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i want to solve some equation, from all initail value i will get the value of x(t) and lembda(t), then for solving the value of c(t), p(t),q(t) and a(t) i want to use genetic algorithm. and i want all value fron time horizon=0 to n and termination criteria is lembda(t)=0, to implement the genetic algorithm p,q,a is repersented by three binary string posses 11,7,10 digit respectively and q vary from 0 to 1 equation is given below.

     M=100;
     r=0.8;
     alpha=0.45;
     beta=0.75;
     gama=0.1;
     d=0.004;
     h=0.4;
     n=100;
     c0=1500;
     delT=1;
     x(1)=2;
     lembda(1)=150;
    x(delT+t)=x(t)+delT*alpha+beta*log10(a(t))+gama*x(t)*(M-x(t))*exp(-                          d*p(t))*exp(h*q(t)); 
    lembda(delT+t)=lembda(t)+delT*(r*lembda(t)-exp(-d*p(t))*exp(h*q(t))*(gama*M-alpha-beta*log10(a(t))-2*gama*x(t))*(p(t)-c(t)+lembda(t))+n*q(t)^(x(t)-1)*log10(q(t))*(alpha+beta*log10(a(t))+gama*x(t))*(M-x(t))*exp(-d*p(t))*exp(h*q(t)));
    c(t)=n*q(t)^(x(t)-1)+c0;
    p(t)=c(t)-lembda(t)+1/d; 
    q(t)=(c(t)-c0)/n)^(x(t)-1)+c0;
    a(t)=(p(t)-c(t)+lembda(t))*beta*(M-x(t))*exp(-d*p(t))*exp(h*q(t)); 

Please any one tell me how i will solve this problem

Thank you.

share|improve this question
    
Your question is not very clear, also you have not shown what you have tried as a genetic algorithm. Perhaps you could clarify your question and tell us what you have tried ? –  NWS Jun 12 '12 at 8:46
    
So you're looking to find c(1), p(1), q(1), and a(1) (=4 values) such that lembda(T)=0 (lambda?) for some T > 1 and T < maxT? Do you want to find just the values so that lembda(T)=0 or do you want to find the values such that T becomes minimal? That doesn't seem too difficult, what are you having problem with exactly? –  Andreas Jun 12 '12 at 13:10

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