All even (unitary) perfect polynomials over $\F_2$ with only Mersenne primes as odd divisors
Abstract: We address an arithmetic problem in the ring $\F_2[x]$ related to the fixed points of the sum of divisors function. We study some binary polynomials $A$ such that $\sigma(A)/A $ is still a binary polynomial. Technically, we prove that the only (unitary) perfect polynomials over $\F_2$ that are products of $x$, $x+1$ and of Mersenne primes are precisely the nine (resp. nine "classes") known ones. This follows from a new result about the factorization of $M{2h+1} +1$, for a Mersenne prime $M$ and for a positive integer $h$.
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