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The definition of arithmetic progression is viewed as a generalization of the concept of symmetry sets on the real axis. We use the positive whole numbers. Each finite arithmetic progression we call generalized symmetrical multitude We can write a sequence, the elements of which are multitudes- arithmetic progressions. For these multitudes we define KINEMATICS AND DYNAMICS That interpretation is used to prove the theorem of Goldbach In the second part we consider the Riemann hypothesis by analyzing some helix lines. In third part we have a problem by vector optimization in euclidean metric.

Produktbeschreibung
The definition of arithmetic progression is viewed as a generalization of the concept of symmetry sets on the real axis. We use the positive whole numbers. Each finite arithmetic progression we call generalized symmetrical multitude We can write a sequence, the elements of which are multitudes- arithmetic progressions. For these multitudes we define KINEMATICS AND DYNAMICS That interpretation is used to prove the theorem of Goldbach In the second part we consider the Riemann hypothesis by analyzing some helix lines. In third part we have a problem by vector optimization in euclidean metric.
Autorenporträt
The author of this book is the bulgarian Tanya Kirilova Mintcheva. She has studied mathematics at Sofia University "St.Kliment Ohridski". She was a longtime University lecturer at the University of Economics. Her scientific interests are in Number theory, Mathematical modeling of economic processes and problems in Operation research.