Add to ORKGIf k is a positive integer, let Sk(N) denote the space of cusp forms of weight k on Γ1(N), and let Scmk (N) denote the subspace of Sk(N) spanned by those forms having complex multiplication (see [Ri]). For a non-negative integer k and any positive integer N ≡ 0 (mod 4), let Mk+ 12 (N) (resp. Sk+ 12 (N)) denote the space of modular form
Resnikoff [12] proved that weights of a non trivial singular modular form should be integral multipl...
AbstractA formula for the dimension of the space of cuspidal modular forms on Γ0(N) of weight k (k⩾2...
6 4 using Erokhin’s work on Niemeier lattices and geometric methods involving the hyperelliptic locu...
Let M be the space of even integer weight meromorphic modular forms on SL2(Z) with integer coefficie...
The aim of this research is to construct a basis for the space of mod-ular forms with weight 3 2. Bu...
AbstractIn this paper we decompose the space Sk + 12(N, χ) (N is a squarefree natural number and χ a...
In this note we determine explicity the dimension of Kohnen\u27s integral weight with odd square fre...
Siegel modular form 2 lifting $M_{k}^{(n)}=$ $M_{k}(\mathrm{s}_{\mathrm{P}_{n}}(\mathbb{Z})) $ degre...
We determine explicitly the trace of the representation of SL(2,Z/NZ) in the space of modular forms ...
In this survey paper, we explain how weight 2 modular forms on Γ0(N) are related to modular symbols,...
Let N be a positive integer (the “level”), let k ≥ 2 be an integer (the “weight”), and let Sk(N,C) d...
AbstractIn this paper we will study the theory of newforms in Sk + 12(Γ0(4M),χ1), for M an odd squar...
It is known that if the Fourier coefficients a(n) (n >= 1) of an elliptic modular form of even integ...
In this note, we show that the algebraicity of the Fourier coefficients of half-integral weight modu...
International audienceThis text is the result of a course given at the Centre international de renco...
Resnikoff [12] proved that weights of a non trivial singular modular form should be integral multipl...
AbstractA formula for the dimension of the space of cuspidal modular forms on Γ0(N) of weight k (k⩾2...
6 4 using Erokhin’s work on Niemeier lattices and geometric methods involving the hyperelliptic locu...
Let M be the space of even integer weight meromorphic modular forms on SL2(Z) with integer coefficie...
The aim of this research is to construct a basis for the space of mod-ular forms with weight 3 2. Bu...
AbstractIn this paper we decompose the space Sk + 12(N, χ) (N is a squarefree natural number and χ a...
In this note we determine explicity the dimension of Kohnen\u27s integral weight with odd square fre...
Siegel modular form 2 lifting $M_{k}^{(n)}=$ $M_{k}(\mathrm{s}_{\mathrm{P}_{n}}(\mathbb{Z})) $ degre...
We determine explicitly the trace of the representation of SL(2,Z/NZ) in the space of modular forms ...
In this survey paper, we explain how weight 2 modular forms on Γ0(N) are related to modular symbols,...
Let N be a positive integer (the “level”), let k ≥ 2 be an integer (the “weight”), and let Sk(N,C) d...
AbstractIn this paper we will study the theory of newforms in Sk + 12(Γ0(4M),χ1), for M an odd squar...
It is known that if the Fourier coefficients a(n) (n >= 1) of an elliptic modular form of even integ...
In this note, we show that the algebraicity of the Fourier coefficients of half-integral weight modu...
International audienceThis text is the result of a course given at the Centre international de renco...
Resnikoff [12] proved that weights of a non trivial singular modular form should be integral multipl...
AbstractA formula for the dimension of the space of cuspidal modular forms on Γ0(N) of weight k (k⩾2...
6 4 using Erokhin’s work on Niemeier lattices and geometric methods involving the hyperelliptic locu...