The Convolution Sum Σm&lt;n/16σ(m)σ(n – 16m)

Ayşe Alaca; Şaban Alaca; Kenneth S. Williams

doi:10.4153/CMB-2008-001-1

Abstract

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The convolution sum $\sum{_{m<n/16}\,\sigma (m)\sigma (n\,}-16m)$ is evaluated for all $n\,\in \,\mathbb{N}$. This evaluation is used to determine the number of representations of $n$ by the quadratic form $x_{1}^{2}\,+\,x_{2}^{2}\,+\,x_{3}^{2}\,+\,x_{4}^{2}\,+\,4x_{5}^{2}\,+\,4x_{6}^{2}\,+\,4x_{7}^{2}\,+\,4x_{8}^{2}$.

References

[1] Berndt, B. C., Ramanujan's Notebooks. Part II. Springer-Verlag, New York, 1989.Google Scholar

[2] Berndt, B. C., Ramanujan's Notebooks. Part III. Springer-Verlag, New York, 1991.Google Scholar

[3] Besge, M., Extrait d’une lettre de M. Besge à M. Liouville. J. Math. Pures Appl. 7(1862), 256.Google Scholar

[4] Copson, E. T., An Introduction to the Theory of Functions of a Complex Variable. Clarendon Press, Oxford, 1955.Google Scholar

[5] Glaisher, J. W. L., On the square of the series in which the coefficients are the sums of the divisors of the exponents. Mess. Math. 14 (1885), 156–163.Google Scholar

[6] Glaisher, J. W. L., Mathematical Papers. 1883–1885, Cambridge, 1885.Google Scholar

[7] Huard, J. G., Ou, Z. M., Spearman, B. K., and Williams, K. S., Elementary evaluation of certain convolution sums involving divisor functions. In: Number Theory for the Millennium, II. A K Peters, Natick, MA, 2002, pp. 229–274.Google Scholar

[8] Rainville, E. D., Special Functions. Chelsea Publishing, New York, 1971.Google Scholar

[9] Spearman, B. K. and Williams, K. S., The simplest arithmetic proof of Jacobi's four squares theorem. Far East J. Math. Sci. 2(2000), 433–439.Google Scholar

[10] Williams, K. S., The convolution sum Σ _m<n/8 σ(m)σ(n–8m). Pacific J. Math. 228(2006), no. 2, 387–396.Google Scholar

Crossref Citations

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Alaca, Şaban and Williams, Kenneth S. 2010. The number of representations of a positive integer by certain octonary quadratic forms. Functiones et Approximatio Commentarii Mathematici, Vol. 43, Issue. 1,

Kim, Dae-Yeoul Kim, Ae-Ran and Park, Hwa-Sin 2012. ONVOLUTION SUM Σm<n/8σ1(2m)σ1(n-8m). Honam Mathematical Journal, Vol. 34, Issue. 1, p. 63.

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Kim, Daeyeoul 2013. CONVOLUTION SUMS OF ODD AND EVEN DIVISOR FUNCTIONS. Honam Mathematical Journal, Vol. 35, Issue. 3, p. 445.

Kim, Aeran Kim, Daeyeoul and Yan, Li 2013. CONVOLUTION SUMS ARISING FROM DIVISOR FUNCTIONS. Journal of the Korean Mathematical Society, Vol. 50, Issue. 2, p. 331.

RAMAKRISHNAN, B. and SAHU, BRUNDABAN 2013. EVALUATION OF THE CONVOLUTION SUMS ∑l+15m=nσ(l)σ(m) AND ∑3l+5m=nσ(l)σ(m) AND AN APPLICATION. International Journal of Number Theory, Vol. 09, Issue. 03, p. 799.

Xia, Ernest X. W. Tian, X. L. and Yao, Olivia X. M. 2014. Evaluation of the convolution sum ∑i+25j=n σ(i)σ(j). International Journal of Number Theory, Vol. 10, Issue. 06, p. 1421.

Kim, Aeran Kim, Daeyeoul and Sankaranarayanan, Ayyadurai 2014. ARITHMETIC SUMS SUBJECT TO LINEAR AND CONGRUENT CONDITIONS AND SOME APPLICATIONS. Honam Mathematical Journal, Vol. 36, Issue. 2, p. 305.

Ramakrishnan, B. and Sahu, Brundaban 2014. On the number of representations of an integer by certain quadratic forms in sixteen variables. International Journal of Number Theory, Vol. 10, Issue. 08, p. 1929.

Cooper, Shaun and Ye, Dongxi 2014. Evaluation of the convolution sums ∑l+20m=n σ(l)σ(m), ∑4l+5m=n σ(l)σ(m) and ∑2l+5m=n σ(l)σ(m). International Journal of Number Theory, Vol. 10, Issue. 06, p. 1385.

Lee, Kwangchul Kim, Daeyeoul and Seo, Gyeong-Sig 2014. A REMARK OF ODD DIVISOR FUNCTIONS AND WEIERSTRASS ℘-FUNCTIONS. Honam Mathematical Journal, Vol. 36, Issue. 1, p. 55.

Ye, Dongxi 2015. Evaluation of the convolution sums ∑l+36m=n σ(l)σ(m) and ∑4l+9m=n σ(l)σ(m). International Journal of Number Theory, Vol. 11, Issue. 01, p. 171.

Alaca, Şaban and Kesicioğlu, Yavuz 2016. Evaluation of the convolution sums ∑l+27m=nσ(l)σ(m) and ∑l+32m=nσ(l)σ(m). International Journal of Number Theory, Vol. 12, Issue. 01, p. 1.

Park, Yoon Kyung 2016. Evaluation of the convolution sums ∑++=σ(k)σ(l)σ(m) with lcm(a,b,c)≤6. Journal of Number Theory, Vol. 168, Issue. , p. 257.

Lee, Kwangchul Kim, Daeyeoul and Seo, Gyeong-Sig 2016. A PRODUCT FORMULA FOR COMBINATORIC CONVOLUTION SUMS OF ODD DIVISOR FUNCTIONS. Honam Mathematical Journal, Vol. 38, Issue. 2, p. 243.

Park, Yoon Kyung 2017. Evaluation of the convolution sums ∑al+bm=n lσ(l) σ(m) with ab ≤ 9. Open Mathematics, Vol. 15, Issue. 1, p. 1389.

Lee, Joohee and Park, Yoon Kyung 2017. Evaluation of the convolution sums ∑a1m1+a2m2+a3m3+a4m4=nσ(m1)σ(m2)σ(m3)σ(m4) with lcm(a1,a2,a3,a4) ≤ 4. International Journal of Number Theory, Vol. 13, Issue. 08, p. 2155.

Ye, Dongxi 2017. Representations of integers by certain 2k-ary quadratic forms. Journal of Number Theory, Vol. 179, Issue. , p. 50.

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The Convolution Sum Σm<n/16σ(m)σ(n – 16m)

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This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Article contents

The Convolution Sum Σm<n/16σ(m)σ(n – 16m)

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