We give examples of generalized modular forms with the property that their divisors are supported at the cusps and the exponents in their q-product expansions take infinitely many values. © 2007 Springer Science+Business Media, LLC
In this dissertation, we introduce the notion of Drinfeld modular forms with A-expansions, where ins...
Recently, Borcherds [B] provided a striking description for the exponents in the naive infinite prod...
AbstractFor an infinite family of modular forms constructed from Klein forms we provide certain expl...
Let ℕ, ℕ0, ℤ, ℚ, and ℂ denote the sets of positive integers, nonnegative integers, integers, rationa...
AbstractThe theory of “generalized modular forms,” initiated here, grows naturally out of questions ...
In [6], Kohnen proves that if $\Gamma=\Gamma_0(N)$ where $N$ is a square-free integer, then any modu...
AbstractLet R(w;q) be Dysonʼs generating function for partition ranks. For roots of unity ζ≠1, it is...
International audienceIn 2005, Kohnen proved that if Γ=Γ0(N) where N is a square-free integer, then ...
This paper is dedicated to Dennis Stanton, a combinatorist who really counts. Abstract. Let R(w; q) ...
Kim was supported by the Korea Research Foundation Grant funded by the Korean Government (MOEHRD) (K...
We prove several multiplicity one theorems for generalized modular functions (GMF), in terms of thei...
We prove two congruences for the coefficients of power series expansions in t of modular forms where...
summary:Suppose that $f$ is a primitive Hecke eigenform or a Mass cusp form for $\Gamma _0(N)$ with ...
International audienceIn this article we study the number fields generated by the Fourier coefficien...
Text: Let f be a generalized modular function (GMF) of weight 0 on Γ0(N) such that its q-exponents c...
In this dissertation, we introduce the notion of Drinfeld modular forms with A-expansions, where ins...
Recently, Borcherds [B] provided a striking description for the exponents in the naive infinite prod...
AbstractFor an infinite family of modular forms constructed from Klein forms we provide certain expl...
Let ℕ, ℕ0, ℤ, ℚ, and ℂ denote the sets of positive integers, nonnegative integers, integers, rationa...
AbstractThe theory of “generalized modular forms,” initiated here, grows naturally out of questions ...
In [6], Kohnen proves that if $\Gamma=\Gamma_0(N)$ where $N$ is a square-free integer, then any modu...
AbstractLet R(w;q) be Dysonʼs generating function for partition ranks. For roots of unity ζ≠1, it is...
International audienceIn 2005, Kohnen proved that if Γ=Γ0(N) where N is a square-free integer, then ...
This paper is dedicated to Dennis Stanton, a combinatorist who really counts. Abstract. Let R(w; q) ...
Kim was supported by the Korea Research Foundation Grant funded by the Korean Government (MOEHRD) (K...
We prove several multiplicity one theorems for generalized modular functions (GMF), in terms of thei...
We prove two congruences for the coefficients of power series expansions in t of modular forms where...
summary:Suppose that $f$ is a primitive Hecke eigenform or a Mass cusp form for $\Gamma _0(N)$ with ...
International audienceIn this article we study the number fields generated by the Fourier coefficien...
Text: Let f be a generalized modular function (GMF) of weight 0 on Γ0(N) such that its q-exponents c...
In this dissertation, we introduce the notion of Drinfeld modular forms with A-expansions, where ins...
Recently, Borcherds [B] provided a striking description for the exponents in the naive infinite prod...
AbstractFor an infinite family of modular forms constructed from Klein forms we provide certain expl...
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