I asked this question on MSE [here][1].

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Define $f_1(z) = \cos(z)$, $f_{n+1}= \cos(f_n (z)) $, The question is: Does $\lim\limits_{n \to \infty}f_n(z)$ exist for  certain $z \in \mathbb{C}$? And what is the limit for such $z$?


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We know that for real numbers $z\in \mathbb{R}$, the limit exists and is the solution to the equation $x=\cos(x)$, this result is elementary. However, the complex case seems more intricate due to the unbounded nature of the cosine function on $\mathbb{C}$ and the existence of infinitely many solutions to $\cos(z)=z$. 



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This is the graph of $f_{200}(z)$:



[![sequence of cosines , cos(cos(...z...))][2]][2]


It seems that if the limit exists then the limit is the real solution for $\cos(z)=z$, For some reason it seems that the other fixed points of $\cos(z)$ don't "attract" the sequence of points, only the real solution do.


 


  [1]: https://math.stackexchange.com/questions/4950152/does-the-sequence-of-cosines-converge-for-all-complex-numbers
  [2]: https://i.sstatic.net/v868SDCo.png