On the growth and zeros of polynomials attached to arithmetic functions

Heim, Bernhard; Neuhäuser, Markus

doi:10.1007/s12188-021-00241-3

Abh. Math. Semin. Univ. Hambg.

2021

DOI: 10.1007/s12188-021-00241-3

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On the growth and zeros of polynomials attached to arithmetic functions

Bernhard Heim

Markus Neuhäuser

Abstract: In this paper we investigate growth properties and the zero distribution of polynomials attached to arithmetic functions g and h, where g is normalized, of moderate growth, and $$0<h(n) \le h(n+1)$$ 0 < h ( n ) ≤ h ( n + 1 ) . … Show more

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2023

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Cited by 2 publications

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Estimate for the largest zeros of the D’Arcais polynomials

Heim,

Neuhauser

2023

Res Math Sci

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The zeros of the nth D’Arcais polynomial, also known in combinatorics as the Nekrasov–Okounkov polynomial, dictate the vanishing properties of the nth Fourier coefficients of all complex powers x of the Dedekind $$\eta $$ η -function. In this paper, we prove that these coefficients are non-vanishing for $$\vert x \vert > \kappa \, (n-1)$$ | x | > κ ( n - 1 ) and $$\kappa \approx 9.7225$$ κ ≈ 9.7225 . Numerical computations imply that 9.72245 is a lower bound for $$\kappa $$ κ . This significantly improves previous results by Kostant, Han, and Heim–Neuhauser. The polynomials studied in this paper include Chebyshev polynomials of the second kind, 1-associated Laguerre polynomials, Hermite polynomials, and polynomials associated with overpartitions and plane partitions.

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Estimate for the largest zeros of the D’Arcais polynomials

Heim,

Neuhauser

2023

Res Math Sci

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Zeros transfer for recursively defined polynomials

Heim,

Neuhauser,

Tröger

2023

Res. number theory

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The zeros of D’Arcais polynomials, also known as Nekrasov–Okounkov polynomials, dictate the vanishing of the Fourier coefficients of powers of the Dedekind eta functions. These polynomials satisfy difference equations of hereditary type with non-constant coefficients. We relate the D’Arcais polynomials to polynomials satisfying a Volterra difference equation of convolution type. We obtain results on the transfer of the location of the zeros. As an application, we obtain an identity between Chebyshev polynomials of the second kind and 1-associated Laguerre polynomials. We obtain a new version of the Lehmer conjecture and bounds for the zeros of the Hermite polynomials.

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On the growth and zeros of polynomials attached to arithmetic functions

Abstract: In this paper we investigate growth properties and the zero distribution of polynomials attached to arithmetic functions g and h, where g is normalized, of moderate growth, and $$0<h(n) \le h(n+1)$$ 0 < h ( n ) ≤ h ( n + 1 ) . … Show more

Cited by 2 publications

References 25 publications

Estimate for the largest zeros of the D’Arcais polynomials

Estimate for the largest zeros of the D’Arcais polynomials

Zeros transfer for recursively defined polynomials

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