INTEGRAL EQUATION FOR THE NUMBER OF INTEGER POINTS IN A CIRCLE

Magomed A. Chakhkiev; Gagik S. Sulyan; Manya A. Ziroyan; Nikolay P. Tretyakov; Saif A. Mouhammad

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Journal article

INTEGRAL EQUATION FOR THE NUMBER OF INTEGER POINTS IN A CIRCLE

Magomed A. Chakhkiev, Gagik S. Sulyan, Manya A. Ziroyan, Nikolay P. Tretyakov and Saif A. Mouhammad

Italian journal of pure and applied mathematics, (41), pp.522-525

01/02/2019

Abstract

Mathematics

Physical Sciences

Science & Technology

The problem is to obtain the most accurate upper estimate for the absolute value of the difference between the number of integer points in a circle and its area (when the radius tends to infinity). In this paper we obtain an integral equation for the function expressing the dependence of the number of integer points in a circle on its radius. The kernel of the equation contains the Bessel functions of the first kind, and the equation itself is a kind of the Hankel transform.

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Title: INTEGRAL EQUATION FOR THE NUMBER OF INTEGER POINTS IN A CIRCLE
Creators - without role: Magomed A. Chakhkiev - Social State Univ Russia, Dept Appl Math, Wilhelm Pieck St 4, Moscow, Russia
Gagik S. Sulyan - Social State Univ Russia, Dept Appl Math, Wilhelm Pieck St 4, Moscow, Russia
Manya A. Ziroyan - Social State Univ Russia, Dept Appl Math, Wilhelm Pieck St 4, Moscow, Russia
Nikolay P. Tretyakov - Social State Univ Russia, Dept Appl Math, Wilhelm Pieck St 4, Moscow, Russia
Saif A. Mouhammad - Taif University
Publication Details: Italian journal of pure and applied mathematics, (41), pp.522-525
Publisher: Forum Editrice Univ Udinese
Number of pages: 4
Identifiers: 9911069108331
Academic Unit: Taif University
Language: English
Resource Type: Journal article