2017
DOI: 10.1177/1081286517716733
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Substantial condition for the fourth first integral of the rigid body problem

Abstract: The aim of this article is to study the possibility of obtaining the fourth integral for the motion of a rigid body about a fixed point in the presence of a gyrostatic moment vector. This problem is governed by a system consisting of six nonlinear differential equations from first order, as well as three first integrals. A most important condition for a function F, depending on all the body variables, to be that integral is presented. This work can be considered a mainstreaming of previous works. The importanc… Show more

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Cited by 20 publications
(10 citation statements)
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“…These formulas depend on four arbitrary constants θ 0 , ψ 0 , ϕ 0 , and r 0 , where r 0 is sufficiently small. The obtained analytical periodic solutions are considered a generalization of the ones obtained in [13,14].…”
Section: Geometric Interpretation Of the Motionmentioning
confidence: 99%
“…These formulas depend on four arbitrary constants θ 0 , ψ 0 , ϕ 0 , and r 0 , where r 0 is sufficiently small. The obtained analytical periodic solutions are considered a generalization of the ones obtained in [13,14].…”
Section: Geometric Interpretation Of the Motionmentioning
confidence: 99%
“…The exact solutions of these equations demand another adoption fourth first integral. With the exception of a few particular circumstances including Euler–Poinsot, Lagrange–Poisson, and Kovalevskaya, numerous trials have been carried out to find this integral in its entire generality 2 . A large number of integrable cases for the RB’s motion were obtained in 3 5 .…”
Section: Introductionmentioning
confidence: 99%
“…In 2 , the classical Kovalevskaya top is generalized to a heavy motion of a gyrostat when the gyrostatic moment (GM) is applied and a generalization of Burn’s problem is found. Whereas, the possibility of obtaining the fourth-first integral for the RB motion through a simple procedure is investigated in 3 . The novel integrable case for the dynamics of the RB problem, which generalizes the prior cases, is discussed in 4 .…”
Section: Introductionmentioning
confidence: 99%