Add to ORKGLet j(z) be the usual modular function for SL2(Z) j(z) = q−1 + 744 + 196884q + 21493760q2 + · · ·, where q = e2piiz. The values of modular functions such as j(z) at imaginary quadratic arguments in H, the upper half of the complex plane, are known as singular moduli
The absolute invariant J(z), of the modular group M arises in the theory of elliptic functions, (Whe...
Kaneko gave a closed formula for the Fourier coefficients of the elliptic modularfunction j (τ) expr...
We gave an algorithm to compute the modular equation <pn(X,j) of j(z) in [4]. Using the data accu...
Let j(z) be the usual modular function for SL2(Z) j(z) = q−1 + 744 + 196884q+ 21493760q2+ · · ·, ...
Let j(z) = q−1 + 744 + 196884q + · · · denote the usual elliptic modular function on SL2(Z) (q: =...
Classically, the theory of complex multiplication asserts that the value of the usualelliptic modula...
We shall give a closed formula for the Fourier coefficients of the elliptic modular function j(τ ) e...
We give a closed formula for the Fourier coefficients of the elliptic modular function $j(\tau) $ ex...
We give a closed formula for the Fourier coeefficients of the elliptic modular function j(τ ) expres...
Introduction. “Singular moduli ” is the classical name for the values assumed by the modular invaria...
As usual, let q: = e2piiz and let j(z) be the classical modular function j(z) = n=−
The singular moduli of \bbfQ (\sqrt d), dlt;0, are j(τ), where the τ are the roots of the h correspo...
Abstract. The minimal polynomials of the singular values of the classical Weber modular functions gi...
Here we study the integrality properties of singular moduli of a special non-holomorphic function γ(...
In a recent paper [Br-K-O], the author, Bruinier, and Kohnen investigated the values of a certain se...
The absolute invariant J(z), of the modular group M arises in the theory of elliptic functions, (Whe...
Kaneko gave a closed formula for the Fourier coefficients of the elliptic modularfunction j (τ) expr...
We gave an algorithm to compute the modular equation <pn(X,j) of j(z) in [4]. Using the data accu...
Let j(z) be the usual modular function for SL2(Z) j(z) = q−1 + 744 + 196884q+ 21493760q2+ · · ·, ...
Let j(z) = q−1 + 744 + 196884q + · · · denote the usual elliptic modular function on SL2(Z) (q: =...
Classically, the theory of complex multiplication asserts that the value of the usualelliptic modula...
We shall give a closed formula for the Fourier coefficients of the elliptic modular function j(τ ) e...
We give a closed formula for the Fourier coefficients of the elliptic modular function $j(\tau) $ ex...
We give a closed formula for the Fourier coeefficients of the elliptic modular function j(τ ) expres...
Introduction. “Singular moduli ” is the classical name for the values assumed by the modular invaria...
As usual, let q: = e2piiz and let j(z) be the classical modular function j(z) = n=−
The singular moduli of \bbfQ (\sqrt d), dlt;0, are j(τ), where the τ are the roots of the h correspo...
Abstract. The minimal polynomials of the singular values of the classical Weber modular functions gi...
Here we study the integrality properties of singular moduli of a special non-holomorphic function γ(...
In a recent paper [Br-K-O], the author, Bruinier, and Kohnen investigated the values of a certain se...
The absolute invariant J(z), of the modular group M arises in the theory of elliptic functions, (Whe...
Kaneko gave a closed formula for the Fourier coefficients of the elliptic modularfunction j (τ) expr...
We gave an algorithm to compute the modular equation <pn(X,j) of j(z) in [4]. Using the data accu...