Rational Periodic Points of xd+c and Fermat-Catalan Equations
Abstract
We study rational periodic points of polynomial fd,c(x)=xd+c over the field of rational numbers, where d is an integer greater than 2. For period 2, we classify all possible periodic points for degrees d=4,6. We also demonstrate the nonexistence of rational periodic points of exact period 2 for d=2k such that 3 2k-1 and k has a prime factor greater than 3. Moreover, assuming the abc-conjecture, we prove that fd,c has no rational periodic point of exact period greater than 1 for sufficiently large integer d and c≠ -1.
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