The inverse stability of Artin-Schreier polynomials over finite fields
Abstract
Let p be a prime number and q a power of p. Let Fq be the finite field with q elements. For a positive integer n and a polynomial (X)∈Fq[X], let dn,(X) denote the denominator of the nth iterate of 1(X). The polynomial (X) is said to be inversely stable over Fq if all polynomials dn,(X) are irreducible polynomial over Fq and distinct. In this paper, we characterize a class of inversely stable polynomials over Fq. More precisely, for (X)=Xpt+aX+b∈Fq[X] with t being a positive integer, we provide a sufficient and necessary condition for (X) to be inversely stable over Fq.
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