Divisibility properties of coefficients of modular functions in genus zero levels
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Publication:5383257
zbMath1448.11082arXiv1711.06239MaRDI QIDQ5383257
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Publication date: 21 June 2019
Full work available at URL: https://arxiv.org/abs/1711.06239
divisibilityFourier coefficients of canonical basis elementsspaces of weakly holomorphic modular forms
Forms of half-integer weight; nonholomorphic modular forms (11F37) Modular and automorphic functions (11F03) Fourier coefficients of automorphic forms (11F30)
Related Items (4)
The arithmetic of modular grids ⋮ Ramanujan's function \(k(\tau)=r(\tau)r^2(2\tau)\) and its modularity ⋮ Divisibility properties of the Fourier coefficients of (mock) modular functions and Ramanujan ⋮ Zagier duality for level \(p\) weakly holomorphic modular forms
Cites Work
- Congruences for coefficients of modular functions
- On the zeros and coefficients of certain weakly holomorphic modular forms
- Zeros of weakly holomorphic modular forms of levels 2 and 3
- FOURIER EXPANSIONS WITH MODULAR FORM COEFFICIENTS
- Congruences for the Coefficients of the Modular Invariant $j(\tau)$.
- Divisibility properties of coefficients of level $p$ modular functions for genus zero primes
- DIVISIBILITY PROPERTIES OF COEFFICIENTS OF WEIGHT 0 WEAKLY HOLOMORPHIC MODULAR FORMS
- Weakly holomorphic modular forms in prime power levels of genus zero
- ZEROS OF WEAKLY HOLOMORPHIC MODULAR FORMS OF LEVEL 4
- Congruences for the Coefficients of the Modular Invariant $j(\tau)$.
- Divisibility Properties of the Fourier Coefficients of the Modular Invariant j(τ)
- Further Congruence Properties of the Fourier Coefficients of the Modular Invariant j(τ)
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