The Structure and Degrees of Polynomials Computing Square Roots p
Abstract
For an odd prime p, we say a polynomial f∈ Fp[X] computes square roots if f(a)2=a for all nonzero, perfect squares a∈ Fp. When p 3 4, it is easy to see that f(X)=Xp+14 is the smallest such polynomial. For p 1 4, the situation is less clear. Tonelli-Shanks offers an algorithm for constructing polynomials that compute square roots, but the question of whether their degree is minimal remains. In this paper, we study the various degrees and structures of polynomials computing square roots.
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