Add to ORKGThe vanishing properties of Fourier coefficients of integral powers of the Dedekind eta function correspond to the existence of integral roots of integer-valued polynomials Pn(x) introduced by M. Newman. In this paper we study the derivatives of these polynomials. We obtain non-vanishing results at integral points. As an application we prove that integral roots are simple if the index n of the polynomial is equal to a prime power pm or to pm + 1. We obtain a formula for the derivative of Pn(x) involving the polynomials of lower degree
AbstractLet f(x1, x2,…, xn) be a polynomial with rational integral coefficients. Let d(f) be the gre...
Let $D$ be a domain with fraction field $K$, and let $M_n(D)$ be the ring of $n imes n$ matrices wi...
AbstractMotivated by the discovery that the eighth root of the theta series of the E8 lattice and th...
In this article, complex powers of the Dedekind eta function are studied. The vanishing of the nth F...
The Fourier coefficients of powers of the Dedekind eta function can be studied simultaneously. The v...
In this talk, we study the vanishing properties of Fourier coefficients of powers of the Dedekind et...
AbstractAn integral for [Pn(α + μ,β)(x)][Pn(α + μ,β)(1)] in terms of [Pn(α,β)(y)][Pn(α,β)(1)] with a...
In their famous paper on partitions, Hardy and Ramanujan also raised the question of the behaviour o...
In this paper we define the $n$th polygonal polynomial $P_n(z) = (z-1)(z^2-1)\cdots(z^n-1)$ and we i...
We investigate the power and polynomial values of the polynomials Pn(X) = ∏nk=0 (X2 · 3k - X3k - 1 )...
We define ψ‾ to be the multiplicative arithmetic function that satisfies for all primes p...
For each positive integer N, let SN be the set of all polynomials P(x)∈Z[x] with degree less than N ...
Let A be a Dedekind domain, K the fraction field of A, and f∈. A[. x] a monic irreducible separable ...
AbstractLet a⩾b⩾c⩾d⩾e⩾1 be real numbers and P5 be the number of positive integral solutions of xa+yb...
AbstractThe degenerate Stirling numbers and degenerate Eulerian polynomials are intimately connected...
AbstractLet f(x1, x2,…, xn) be a polynomial with rational integral coefficients. Let d(f) be the gre...
Let $D$ be a domain with fraction field $K$, and let $M_n(D)$ be the ring of $n imes n$ matrices wi...
AbstractMotivated by the discovery that the eighth root of the theta series of the E8 lattice and th...
In this article, complex powers of the Dedekind eta function are studied. The vanishing of the nth F...
The Fourier coefficients of powers of the Dedekind eta function can be studied simultaneously. The v...
In this talk, we study the vanishing properties of Fourier coefficients of powers of the Dedekind et...
AbstractAn integral for [Pn(α + μ,β)(x)][Pn(α + μ,β)(1)] in terms of [Pn(α,β)(y)][Pn(α,β)(1)] with a...
In their famous paper on partitions, Hardy and Ramanujan also raised the question of the behaviour o...
In this paper we define the $n$th polygonal polynomial $P_n(z) = (z-1)(z^2-1)\cdots(z^n-1)$ and we i...
We investigate the power and polynomial values of the polynomials Pn(X) = ∏nk=0 (X2 · 3k - X3k - 1 )...
We define ψ‾ to be the multiplicative arithmetic function that satisfies for all primes p...
For each positive integer N, let SN be the set of all polynomials P(x)∈Z[x] with degree less than N ...
Let A be a Dedekind domain, K the fraction field of A, and f∈. A[. x] a monic irreducible separable ...
AbstractLet a⩾b⩾c⩾d⩾e⩾1 be real numbers and P5 be the number of positive integral solutions of xa+yb...
AbstractThe degenerate Stirling numbers and degenerate Eulerian polynomials are intimately connected...
AbstractLet f(x1, x2,…, xn) be a polynomial with rational integral coefficients. Let d(f) be the gre...
Let $D$ be a domain with fraction field $K$, and let $M_n(D)$ be the ring of $n imes n$ matrices wi...
AbstractMotivated by the discovery that the eighth root of the theta series of the E8 lattice and th...