Plotting the intersection of a composition function
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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 ?
Answers (1)
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 Comments
Torsten
on 30 May 2021
You forgot the "mod 1" in the equation for S.
Reza Yaghmaeian
on 30 May 2021
Torsten
on 30 May 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
on 30 May 2021
Reza Yaghmaeian
on 30 May 2021
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on 30 May 2021
on 30 May 2021
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