On the number of representations of integers by sums of mixed numbers
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Publication:2805963
DOI10.1142/S1793042116500585zbMath1339.11052OpenAlexW2215440847WikidataQ114072015 ScholiaQ114072015MaRDI QIDQ2805963
Ernest X. W. Xia, Lixin Tian, Yin-hua Ma
Publication date: 13 May 2016
Published in: International Journal of Number Theory (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1142/s1793042116500585
Sums of squares and representations by other particular quadratic forms (11E25) General ternary and quaternary quadratic forms; forms of more than two variables (11E20) Theta series; Weil representation; theta correspondences (11F27)
Cites Work
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- Evaluation of the convolution sums \(\sum _{l+6m=n}\sigma (l)\sigma (m)\) and \(\sum _{2l+3m=n}\sigma (l)\sigma (m)\)
- The number of representations of a positive integer by certain octonary quadratic forms
- THE REPRESENTATION NUMBERS OF CERTAIN OCTONARY QUADRATIC FORMS
- REPRESENTATION NUMBERS OF TWO OCTONARY QUADRATIC FORMS
- Seven octonary quadratic forms
- THETA FUNCTION IDENTITIES AND REPRESENTATIONS BY CERTAIN QUATERNARY QUADRATIC FORMS
- ON THE REPRESENTATIONS OF INTEGERS BY CERTAIN QUADRATIC FORMS
- THE REPRESENTATION NUMBERS OF THREE OCTONARY QUADRATIC FORMS
- A Cubic Counterpart of Jacobi's Identity and the AGM
- FOURTEEN OCTONARY QUADRATIC FORMS
- Representation numbers of five sextenary quadratic forms
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