The small parameter method was applied for solving many rotational motions of heavy solids, rigid bodies, and gyroscopes for different problems which classify them according to certain initial conditions on moments of inertia and initial angular velocity components. For achieving the small parameter method, the authors have assumed that the initial angular velocity is sufficiently large. In this work, it is assumed that the initial angular velocity is sufficiently small to achieve the large parameter instead of the small one. In this manner, a lot of energy used for making the motion initially is saved. The obtained analytical periodic solutions are represented graphically using a computer program to show the geometric periodicity of the ob...
This paper examines the rotational motion of a nearly axisymmetric rocket type system with uniform b...
In this paper we find a general solution for the action function in the case of a heavy point moving...
One of the main complexities in the simulation of the nonlinear dynamics of rigid bodies consists in...
In this paper, the motion of a disk about a fixed point under the influence of a Newtonian force fie...
In this paper, we present new modifications for some perturbation procedures used in mathematics, ph...
In this paper, the stability conditions for the rotary motion of a heavy solid about its fixed point...
In this paper, the motion of a rigid body in a singular case of the natural frequency (ω=1/3) is con...
AbstractPoincaré's small parameter method and Krylov–Bogoliubov asymptotic method are among the numb...
In this paper, we consider the problem of the rotational motion of a rigid body with an irrational v...
In this paper, the problem of the slow spinning motion of a rigid body about a point O, being fixed ...
This paper attempts to explore the general rotatory 3D motion of a magnetic heavy solid body around ...
The development of analytic solutions for the forced attitude motion of a rigid body is a formidable...
Abstract--For p oblems involving rotating rigid bodies (e.g. spin-stabilized satellites inspace) one...
Abstract. Linearizations of the Saint Venant-Kirchoff model for elastic bodies are often considered ...
A theoretical study was conducted to determine the motion of nonstabilized rolling and spinning bodi...
This paper examines the rotational motion of a nearly axisymmetric rocket type system with uniform b...
In this paper we find a general solution for the action function in the case of a heavy point moving...
One of the main complexities in the simulation of the nonlinear dynamics of rigid bodies consists in...
In this paper, the motion of a disk about a fixed point under the influence of a Newtonian force fie...
In this paper, we present new modifications for some perturbation procedures used in mathematics, ph...
In this paper, the stability conditions for the rotary motion of a heavy solid about its fixed point...
In this paper, the motion of a rigid body in a singular case of the natural frequency (ω=1/3) is con...
AbstractPoincaré's small parameter method and Krylov–Bogoliubov asymptotic method are among the numb...
In this paper, we consider the problem of the rotational motion of a rigid body with an irrational v...
In this paper, the problem of the slow spinning motion of a rigid body about a point O, being fixed ...
This paper attempts to explore the general rotatory 3D motion of a magnetic heavy solid body around ...
The development of analytic solutions for the forced attitude motion of a rigid body is a formidable...
Abstract--For p oblems involving rotating rigid bodies (e.g. spin-stabilized satellites inspace) one...
Abstract. Linearizations of the Saint Venant-Kirchoff model for elastic bodies are often considered ...
A theoretical study was conducted to determine the motion of nonstabilized rolling and spinning bodi...
This paper examines the rotational motion of a nearly axisymmetric rocket type system with uniform b...
In this paper we find a general solution for the action function in the case of a heavy point moving...
One of the main complexities in the simulation of the nonlinear dynamics of rigid bodies consists in...