Proceedings of the 39th International Symposium on Symbolic and Algebraic Computation 2014
DOI: 10.1145/2608628.2608653
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Tame decompositions and collisions

Abstract: A univariate polynomial f over a field is decomposable if f = g • h = g(h) for nonlinear polynomials g and h. It is intuitively clear that the decomposable polynomials form a small minority among all polynomials over a finite field. The tame case, where the characteristic p of F q does not divide n = deg f , is fairly well-understood, and we have reasonable bounds on the number of decomposables of degree n. Nevertheless, no exact formula is known if n has more than two prime factors. In order to count the deco… Show more

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“…They come with satisfactory (rapidly decreasing) relative error bounds except when p divides n = deg f exactly twice. Ziegler (2014) provides an exact count of tame univariate polynomials. In Section 3.4, we determine exactly the number of decomposable polynomials in one of the difficult wild cases, namely when n = p 2 .…”
Section: Counting Univariate Decomposable Polynomialsmentioning
confidence: 99%
“…They come with satisfactory (rapidly decreasing) relative error bounds except when p divides n = deg f exactly twice. Ziegler (2014) provides an exact count of tame univariate polynomials. In Section 3.4, we determine exactly the number of decomposable polynomials in one of the difficult wild cases, namely when n = p 2 .…”
Section: Counting Univariate Decomposable Polynomialsmentioning
confidence: 99%