Liminal reciprocity and factorization statistics

Hyde, Trevor

doi:10.5802/alco.34

Cited by 4 publications

(4 citation statements)

References 15 publications

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“…We first prove some preliminary results that will be used later in the paper. The results we collect here can be viewed as topological analogs of Lemma 2.1 in [6].…”

Section: Preliminary Lemmasmentioning

confidence: 95%

“…In 2018, Hyde (Theorem 1.1 in [6]) proved that |Irr d,n (F q )| is always a polynomial in q which converges coefficient-wise to a formal power series P d (q) as n → ∞. In other words, in the formal power series ring Q[[q]] equipped with the q-adic topology (under which higher powers of q are considered smaller), |Irr d,n (F q )| −→ P d (q) as n → ∞.…”

Section: Introductionmentioning

confidence: 99%

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Stability of the Cohomology of the Space of Complex Irreducible Polynomials in Several Variables

Chen

2019

International Mathematics Research Notices

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“…We first prove some preliminary results that will be used later in the paper. The results we collect here can be viewed as topological analogs of Lemma 2.1 in [6].…”

Section: Preliminary Lemmasmentioning

confidence: 95%

Section: Introductionmentioning

confidence: 99%

Stability of the Cohomology of the Space of Complex Irreducible Polynomials in Several Variables

Chen

2019

International Mathematics Research Notices

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“…In this section we prove the higher cyclotomic identity. First we recall the definitions of the sets Poly d,n (K), Irr d,n (K) and their associated polynomials P d,n (x), M d,n (x) from [6]. Let d, n ≥ 1 be integers and let K be an arbitrary field.…”

Section: Higher Necklace Polynomialsmentioning

confidence: 99%

“…In [6] the author introduced the higher necklace polynomials M d,n (x) ∈ Q[x] which interpolate the point counts of Irr d,n (F q ) for finite fields F q where q is a prime power,…”

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confidence: 99%

Euler characteristic of the space of real multivariate irreducible polynomials

Hyde¹

2020

Preprint

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Given a field K and integers d, n ≥ 1, let Poly d,n (K) denote the set of all monic total degree d polynomials in n variables with coefficients in K (see Definition 2.1.) Let Irr d,n (K) ⊆ Poly d,n (K) denote the subset of all polynomials which are irreducible over K. Our main result expresses the compactly supported Euler characteristic of Irr d,n (R) in terms of the so-called balanced binary expansion of the number of variables n. The balanced binary expansion of an integer n ≥ 1 is the unique expressionwhere 0 ≤ k 0 < k 1 < . . . < k 2m is a strictly increasing sequence of natural numbers of even length and the signs on the right hand side alternate. Theorem 1.1. Let n ≥ 1 be an integer with balanced binary expansion n = ℓ k=0 b k 2 k and let χ c denote the compactly supported Euler characteristic. Then χ c (Irr d,n (R)) = b k if d = 2 k , 0 otherwise. Example 1.2. The balanced binary expansion of n = 13 is 13 = 2 4 − 2 2 + 2 1 − 1. Thus Theorem 1.1 implies that χ c (Irr d,13 (R)) =      1 if d = 2 or 16, −1 if d = 1 or 4, 0 otherwise.

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Euler characteristic of the space of real multivariate irreducible polynomials

Hyde

2022

Proc. Amer. Math. Soc.

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Liminal reciprocity and factorization statistics

Cited by 4 publications

References 15 publications

Stability of the Cohomology of the Space of Complex Irreducible Polynomials in Several Variables

Stability of the Cohomology of the Space of Complex Irreducible Polynomials in Several Variables

Euler characteristic of the space of real multivariate irreducible polynomials

Euler characteristic of the space of real multivariate irreducible polynomials

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