On the number of representations of certain quadratic forms and a formula for the Ramanujan tau function
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Publication:1664117
DOI10.7169/facm/1695zbMath1418.11057arXiv1702.01249OpenAlexW2962707925MaRDI QIDQ1664117
Anup Kumar Singh, B. Ramakrishnan, Brundaban Sahu
Publication date: 24 August 2018
Published in: Functiones et Approximatio. Commentarii Mathematici (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1702.01249
Sums of squares and representations by other particular quadratic forms (11E25) General ternary and quaternary quadratic forms; forms of more than two variables (11E20) Fourier coefficients of automorphic forms (11F30) Holomorphic modular forms of integral weight (11F11)
Cites Work
- The 1-2-3 of modular forms. Lectures at a summer school in Nordfjordeid, Norway, June 2004
- Newforms and functional equations
- On the number of representations of certain quadratic forms in 20 and 24 variables
- Hecke operators on \(\Gamma_0(m)\)
- On the number of representations of an integer by certain quadratic forms in sixteen variables
- О представлении чисел суммами квадратичных форм $x_{1}^{2} + x_{1}x_{2} + x_{2}^{2}$
- EVALUATION OF THE CONVOLUTION SUMS ∑i+3j=nσ(i)σ3(j) AND ∑3i+j=nσ(i)σ3(j)
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