2013
DOI: 10.1137/110854680
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Counting Reducible, Powerful, and Relatively Irreducible Multivariate Polynomials over Finite Fields

Abstract: We present counting methods for some special classes of multivariate polynomials over a finite field, namely, the reducible ones, the s-powerful ones (divisible by the sth power of a nonconstant polynomial), and the relatively irreducible ones (irreducible but reducible over an extension field). One approach employs generating functions, and another one uses a combinatorial method. They yield exact formulas and approximations with relative errors that essentially decrease exponentially in the input size.

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Cited by 7 publications
(6 citation statements)
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“…For r ≥ 3 and d ≥ 4r − 8, the following upper bound holds: Proof. Let c k,r = (2ek) r(r+1)(k 2 +1)+4rg k,r for k ∈ N. According to (9) and Theorem 13, we have the inequality…”
Section: The Number Of F Q -Reducible Curvesmentioning
confidence: 99%
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“…For r ≥ 3 and d ≥ 4r − 8, the following upper bound holds: Proof. Let c k,r = (2ek) r(r+1)(k 2 +1)+4rg k,r for k ∈ N. According to (9) and Theorem 13, we have the inequality…”
Section: The Number Of F Q -Reducible Curvesmentioning
confidence: 99%
“…The inequality (9) shows that an upper bound on the number of F q -reducible cycles in P r of dimension 1 and degree d can be deduced from an upper bound on the degree of the Chow variety C d,r of curves over F q of degree d in P r . In order to obtain an upper bound on the latter, we consider a suitable variant of the approach of Kollár [18, Exercise I.…”
Section: An Upper Bound On the Degree Of The Restricted Chow Variety mentioning
confidence: 99%
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“…In the bivariate case, von zur Gathen (2008) proves precise approximations with an exponentially decreasing relative error. Von zur Gathen, Viola & Ziegler (2013) extend those results to multivariate polynomials and give further information such as exact formulas and generating functions. Bodin (2008) gives a recursive formula for the number of irreducible bivariate polynomials and remarks on a generalization for more than two variables; he follows up with Bodin (2010).…”
Section: Introductionmentioning
confidence: 79%
“…This work was subsequently refined and extended in [1,7,8,15,16]. Our Theorem 1.1 may be interpreted as a determination of the q-adic asymptotics of M d,n (q) as n → ∞.…”
Section: 2mentioning
confidence: 91%