The arithmetic sum and Gaussian multiplication theorem. (Russian. English summary) Zbl 1437.11033
Summary: The paper presents the fundamentals of the theory of arithmetic sums and oscillatory integrals of polynomials Bernoulli, an argument that is the real function of a certain differential properties.
Drawing an analogy with the method of trigonometric sums I. M. Vinogradov.
The introduction listed problems in number theory and mathematical analysis, which deal the study of the above mentioned sums and integrals.
Research arithmetic sums essentially uses a functional equation type Gauss theorem for multiplication of the Euler gamma function.
Estimations of the individual arithmetic the amounts found indicators of convergence of their averages. In particular, the problems are solved analogues Hua Loo-Keng for one-dimensional integrals and sums.
Drawing an analogy with the method of trigonometric sums I. M. Vinogradov.
The introduction listed problems in number theory and mathematical analysis, which deal the study of the above mentioned sums and integrals.
Research arithmetic sums essentially uses a functional equation type Gauss theorem for multiplication of the Euler gamma function.
Estimations of the individual arithmetic the amounts found indicators of convergence of their averages. In particular, the problems are solved analogues Hua Loo-Keng for one-dimensional integrals and sums.
MSC:
| 11B68 | Bernoulli and Euler numbers and polynomials |
| 11L03 | Trigonometric and exponential sums (general theory) |
| 33B15 | Gamma, beta and polygamma functions |
| 11E41 | Class numbers of quadratic and Hermitian forms |
| 42B20 | Singular and oscillatory integrals (Calderón-Zygmund, etc.) |
Keywords:
arithmetic sum oscillatory integrals; polynomials Bernoulli; Gauss theorem for multiplication of Euler gamma function; functional equation; average values of convergence exponent arithmetic sums and oscillatory integrals; Vinogradov’s method of trigonometric sums; problems Hua Loo-KengReferences:
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