Plotting the intersection of a composition function

30 Mai 2021
1 Réponse
Mise à jour 30 Mai 2021
2 Vues (30 jours)

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My function is S:[0,1] ---> [0,1] I devide [0,1] into two parts [0,1/2), [1/2,1] and for each part I defined this:
For x in [0,1/2) , S(x)= x+1/4 (mod 1) and for x in [1/2 , 1), S(x)=x + 3/4 (mod 1).
I did this.
What I want is that how I can plot the intersection of S^k([0,1]) for k=1 till infinity ?

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Réponses (1)

Alan Stevens
Alan Stevens le 30 Mai 2021
Ran in:

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Ran in:
Do you mean something like this?
Sfn = @(x) (x+1/4).*(x<=1/2) + (x+3/4).*(x>1/2);
x = linspace(0,1,100);
n=10;
S = zeros(n,numel(x));
for k = 1:n
S(k,:) = Sfn(x).^k;
end
subplot(1,2,1)
plot(x(1:50),S(:,1:50)),grid
axis([0 0.5 0 1])
subplot(1,2,2)
plot(x(51:end),S(:,51:end)),grid
axis([0.5 1 0 300])

5 commentaires
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Torsten
Torsten le 30 Mai 2021
You forgot the "mod 1" in the equation for S.
Reza Yaghmaeian
Reza Yaghmaeian le 30 Mai 2021
I mean the INTERSECTION of S^k[0,1] for k=1 till infinity
Torsten
Torsten le 30 Mai 2021
What is the "intersection of S^k[0,1] for k =1 to infinity" ?
The points that all S^k curves have in common ?
Reza Yaghmaeian
Reza Yaghmaeian le 30 Mai 2021
Yes exactly, but in mod 1
Reza Yaghmaeian
Reza Yaghmaeian le 30 Mai 2021
It's not a piecewise function too. You put sum between them

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