Let n(z) (ϵ) denote the Dedekind eta function. We use a recent product- To-sum formula in conjunction with conditions for the non-representability of integers by certain ternary quadratic forms to give explicitly ten eta quotients f (z) := na(m1)(mr z) ... na(mrZ) = ∞ ∑ n=1 c(n)eπ2inz, z eϵ C, Im(z) > 0, n = 1 such that the Fourier coefficients c(n) vanish for all positive integers n in each of infinitely many non-overlapping arithmetic progressions. For example, we show that if f(z) = n4 (z)n9(4z)n-2(8z) we have c(n) = 0 for all n in each of the arithmetic progressions {16k + 14}>0, {64k + 56}k>0, {256k + 224}k>0, {1024k + 896}k>0, ...
In this note we deduce a family of eta-function identities using Ramanujan′s 1ψ1 summation
Recently, Williams [1] and then Yao, Xia and Jin [2] discovered explicit formulas for the coefficien...
In this article, we use the theory of elliptic functions to construct theta function identities whic...
The sum of divisors function σ(m) is defined by σ(m) = {∑d d∈ℕ d|m if m ∈ ℕ, 0 if m ∈ ℚ, m ∉ ℕ. Let ...
Abstract. A new technique is described for explicitly evaluating quotients of the Dedekind eta funct...
This monograph deals with products of Dedekind's eta function, with Hecke theta series on quadratic ...
ABSTRACT. Let η(z) denote the Dedekind eta function. Let ax2+ bxy+ cy2 be a positive-definite, primi...
Let d be the discriminant of an imaginary quadratic field. Let a, b, c be integers such that b2 - 4a...
In this talk, we study the vanishing properties of Fourier coefficients of powers of the Dedekind et...
Abstract. We extend the methods of Van der Poorten and Chapman [7] for explicitly evaluating the Ded...
The values of the partition function, and more generally the Fourier coefficients of many modular fo...
This work characterizes the vanishing of the Fourier coefficients of all CM (Complex Multiplication)...
Dedicated to the memory of Prof. G. Lomadze Abstract. We classify all lacunary modular forms corresp...
The Fourier coefficients of powers of the Dedekind eta function can be studied simultaneously. The v...
A technique is described for explicitly evaluating quotients of the Dedekind eta function at quadrat...
In this note we deduce a family of eta-function identities using Ramanujan′s 1ψ1 summation
Recently, Williams [1] and then Yao, Xia and Jin [2] discovered explicit formulas for the coefficien...
In this article, we use the theory of elliptic functions to construct theta function identities whic...
The sum of divisors function σ(m) is defined by σ(m) = {∑d d∈ℕ d|m if m ∈ ℕ, 0 if m ∈ ℚ, m ∉ ℕ. Let ...
Abstract. A new technique is described for explicitly evaluating quotients of the Dedekind eta funct...
This monograph deals with products of Dedekind's eta function, with Hecke theta series on quadratic ...
ABSTRACT. Let η(z) denote the Dedekind eta function. Let ax2+ bxy+ cy2 be a positive-definite, primi...
Let d be the discriminant of an imaginary quadratic field. Let a, b, c be integers such that b2 - 4a...
In this talk, we study the vanishing properties of Fourier coefficients of powers of the Dedekind et...
Abstract. We extend the methods of Van der Poorten and Chapman [7] for explicitly evaluating the Ded...
The values of the partition function, and more generally the Fourier coefficients of many modular fo...
This work characterizes the vanishing of the Fourier coefficients of all CM (Complex Multiplication)...
Dedicated to the memory of Prof. G. Lomadze Abstract. We classify all lacunary modular forms corresp...
The Fourier coefficients of powers of the Dedekind eta function can be studied simultaneously. The v...
A technique is described for explicitly evaluating quotients of the Dedekind eta function at quadrat...
In this note we deduce a family of eta-function identities using Ramanujan′s 1ψ1 summation
Recently, Williams [1] and then Yao, Xia and Jin [2] discovered explicit formulas for the coefficien...
In this article, we use the theory of elliptic functions to construct theta function identities whic...