S. A. Berestova scite author profile

S. A. Berestova

5Publications

12Citation Statements Received

16Citation Statements Given

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Ural Federal University

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Illustrations of rigid body motion along a separatrix in the case of Euler-Poinsot

Adlaj¹,

Berestova

Misyura

et al. 2018

CTE

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The aim of our paper is to explain a computer animation of the strictly critical rigid body motion, which ought not be confused with any other motion in its "proximity", however close. We demonstrate that the (local) "uniqueness theorem" remarkably fails in the case of critical motion which (time) domain must be compactified via adjoining the point at (complex) infinity. Two (opposite to each other) "flips" correspond to one and the same (initial) rotation, exclusively either clockwise or counterclockwise, (strictly) about the intermediate axis of inertia. These two symmetrical reversals of the direction of the intermediate axis (of inertia), initially matching then opposing the direction of the (fixed) angular momentum, share one and the same (symmetry) axis, which we call "Galois axis". The Galois axis, which is fixed within the body (but coincides with no principal axis of inertia), rotates uniformly in a plane orthogonal to the angular momentum, as our animation demonstrates. The animation also traces the corresponding two (recurrently selfintersecting) herpolhodes, which turn out to be mirror-symmetrical. The "mirror" is exhibited to lie in a plane, orthogonal to Galois axis at the midst of the "flip". The Galois axis itself is reflected across the minor (or the major) axis of inertia if the direction of the angular momentum is reversed. The formula for the "swing" of the intermediate axis in the plane orthogonal to Galois axis (in body's frame), turns out to be "a square root" of Abrarov's critical solution for a simple pendulum, which (imaginary) period is (exactly) calculated.

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Kinematic control of vehicle motion

Berestova¹,

Misyura²,

Mityushov³

2015

Vestn. Udmurt. Univ. Mat. Mekh. Komp’yut. Nauki

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An exact determination of the effective moduli of elasticity of micro-inhomogeneous medial

Berestova¹,

Mityushov²

1999

Journal of Applied Mathematics and Mechanics

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Geometry of Self-Bearing Covering on Rectangular Plan

Berestova

Александровна²,

Misyura

et al. 2017

Struct. Mech. Eng. Const. Build.

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Приведен алгоритм построения неограниченного множества велароидальных поверхностей теоретически пригодных для формирования самонесущих пространственных конструкций на прямоугольном плане. Дается общий вид уравнения велароидальной поверхности с использованием двух четных функций, удовлетворяющих специальным краевым условиям. Доказывается континуальность мощности множества велароидальных поверхностей. КЛЮЧЕВЫЕ СЛОВА: велароидальные поверхности, самонесущие покрытия, пространственные конструкции.

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Effective Elastic Properties of Textured Cubic Polycrystals

Mityushov¹,

Berestova²,

Odintsova³

2002

Texture, Stress, and Microstructure

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S. A. Berestova

Illustrations of rigid body motion along a separatrix in the case of Euler-Poinsot

Kinematic control of vehicle motion

An exact determination of the effective moduli of elasticity of micro-inhomogeneous medial

Geometry of Self-Bearing Covering on Rectangular Plan

Effective Elastic Properties of Textured Cubic Polycrystals

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