Iteration Sums of The Euler Totient Function Regarding Powers of Fermat Primes

Abstract: Euler Totient function, a cornerstone of number theory, has been extensively studied and applied across disciplines. Exhibiting amazing patterns, the iterations of the Totient function is the major exploration of this paper. This paper first covers the foundational definitions and well established theorems regarding the Totient function, then builds upon those results to investigate applying the Totient function multiple times, such as $\phi(\phi(\phi(n)))$, which are referred to as iterations. Theorems regarding the end behavior of such iterations is presented. Then, an innovative approach of summation is applied to the iterations of the Totient function, which is in the form of $\phi(n)+\phi(\phi(n))+\phi(\phi(\phi(n)))+\cdots$ that could also be expressed as $\sum \phi^i(n)$. Novel theorems regarding the sum are proved for all powers of Fermat Primes, as well as an elegant result for powers of three. This paper provides an initiation to the investigations on the sum of iterated Totient function values.