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Formulation of Equations of Motion for Complex Spacecraft - MaRDI portal

Formulation of Equations of Motion for Complex Spacecraft

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DOI10.2514/3.55956zbMath0435.70027OpenAlexW2099077424MaRDI QIDQ3875409

Thomas R. Kane, David A. Levinson

Publication date: 1980

Published in: Journal of Guidance and Control (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.2514/3.55956

zbMATH Keywords

equations of motion numerical solutions Lagrange's equations D'Alembert's principle Hamilton's canonical equations Boltzmann-Hamel equations design and control complex spacecraft Gibbs equations momentum principles

Mathematics Subject Classification ID

Orbital mechanics (70M20)

Related Items (22)

Another form of equations of motion for constrained multibody systems ⋮ First-order form, Lagrange's form, and Gibbs-Appell's form of Kane's equations ⋮ Variational approaches for dynamics and time-finite-elements: Numerical studies ⋮ Equivalence of Kane's and Maggi's equations ⋮ Hamel's formalism for classical field theories ⋮ The d'Alembert-Lagrange equation exploited on a Riemannian manifold ⋮ A Kane's based algorithm for closed-form dynamic analysis of a new design of a 3RSS-S spherical parallel manipulator ⋮ Formulation of the Governing Equations of Motion of Dynamic Systems on a Principal Bundle ⋮ Recursive dynamic algorithm of open-chain multibody system ⋮ Математическая модель спутника с произвольным числом нежестких элементов ⋮ Bond graph modelling of multibody dynamics and its symbolic scheme ⋮ Multibody Dynamics and Nonlinear Control of Flexible Space Structures ⋮ A tensor method for the derivation of the equations of rigid body dynamics ⋮ Relative kinematics exploited in Kane's approach to describe multibody systems in relative motion ⋮ Hamiltonian structures and stability for rigid bodies with flexible attachments ⋮ Dynamics of general flexible multibody systems ⋮ Stabilization of Ziegler's pendulum by means of the method of vibrational control ⋮ Stability analysis of constrained multibody systems ⋮ A state-space dynamical representation for multibody mechanical systems. I: Systems with tree configuration ⋮ On Hamel’s equations ⋮ Modeling Loose Joints in Elastic Structures-Variable Structure Motion Model Development ⋮ Unnamed Item

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