How to compute the sum term ?
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Hi, I hope you can help me in this problem :
Compute the sum term solution : which .
I don't need
% I have two solution U1 and U2
alpha = 0.6;
p = 0;
S = 0;
for n=2:50
p = p+1;
qnp=(n-p+1)^(1-alpha)-(n-p)^(1-alpha);
S = S+qnp*(U1-U2);
% Compute the new solution
U = 0.5*(U2+S);
% Overwrite the two solution
U1 = U2;
U2 = U;
end
% Resultat
U
The problem is
- when n=2 then p=1, qnp=, and S = S+qnp*(U1-U2)=0+()*(U1-U2)= ()*(U1-U2)
It's Correct , then overwrite U1=U2 (i write it u2) and U2=U ( i write it u3)
- When n=3 then p=2, qnp=, and S = S+qnp*(U1-U2) = ()*(U1-U2) + ()*(u2-u3).
It's not Correct because S = ()*(U1-U2) +()*(u2-u3) .
- When n=4, then p=3 and the sum term is exactly : S = S+qnp*(U1-U2) = +qnp*(u3-u4)
which u3 and u4 has overwrited.
So, How can i compute the sum correctly ?
Thanks.
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Accepted Answer
David Hill
on 22 Jan 2021
alpha = 0.6;
U(1)=1;%you need to specify U(1) and U(2)
U(2)=.5;
S=2^(1-alpha)*(U(1)-U(2));
U(3)=(U(2)+S)/2;
for n=3:50
S=S+sum(((n-[1:n-1]+1).^(1-alpha)-(n-[2:n]).^(1-alpha)).*(U(1:n-1)-U(2:n)));
U(n+1) = (U(n)+S)/2;
end
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