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We give a geometric interpretation (and we deduce an explicit formula) for two types of exponential sums, one of which is the third moment of Kloosterman sums over $F_{q}$ of type $K (ν^{2}; q)$ . We establish a connection between the sums considered and the number of $F_{q}$ -rational points on explicit smooth projective surfaces, one of which is a $K 3$ surface, whereas the other is a smooth cubic surface. As a consequence, we obtain, applying Grothendieck-Lefschetz theory, a generalized formula for the third moment of Kloosterman...

The greatest prime factor of the integers in an interval

R. Baker (1986)

Acta Arithmetica

The hybrid mean value of Dedekind sums and two-term exponential sums

Chang Leran, Li Xiaoxue (2016)

Open Mathematics

In this paper, we use the mean value theorem of Dirichlet L-functions, the properties of Gauss sums and Dedekind sums to study the hybrid mean value problem involving Dedekind sums and the two-term exponential sums, and give an interesting identity and asymptotic formula for it.

Displaying 1 – 12 of 12

The average distribution of cubic exponential sums.

The Connection between the Zeros of the ...-Function and Sequences (g(p)), p Prime, mod 1.

The constant term of the cubic theta series.

The distribution of Kummer sums at prime arguments.

The Generalized Divisor Problem Over Arithmetic Progressions.

The geometry of the third moment of exponential sums

The greatest prime factor of the integers in an interval

The hybrid mean value of Dedekind sums and two-term exponential sums

The Jacobi Sums of Orders Thirteen and Sixty and Related Quadratic Decompositions.

The moments of infinite series.

The triplication formula for Gauss sums.

Trigonometrische Reihen über multiplikativen Zahlenmengen.

Currently displaying 1 – 12 of 12