Series "Computer Technologies, Automatic Control, Radioelectronics"

The problem of bulkiness of mathematical models of manipulative systems of industrial robots is solved. Here we consider formulas for calculating static reactions in joints and formulas for active forces that balance the forces of gravity acting on the manipulator's bodies in its stationary state.
The manipulator can be in such a state when it is before capturing the object of manipulation and releasing it, or when it is performing some assembly operations, or it is during spot welding and
in slow (quasi-static) arc-welding and painting processes. Aim. The aim is to derive general recurrence and finite formulas for calculating the reaction forces in joints and their projections to the axes of the coordinate system rigidly connected with the selected body. Express the formulas of force projections in terms of guiding cosines and justify their optimality in terms of the minimum of arithmetic operations. Derive general inverse recurrence formulas for writing out the guide cosines of
the axes associated with the moving bodies of the coordinate system with respect to the stationary coordinate system. Research methods. The methods of research relate to vector mechanics and systems analysis, and the algorithmization of calculations by reducing them to the use of recurrent formulas. Results. A systematic analysis of general formulas, in which all possible regular expressions are highlighted which are corresponding unambiguously to the kinematic parameters of manipulators, is performed. These regular expressions are used in software for analytical modeling of manipulator, in particular, for the analytical solution of problems of statics of a manipulator. The method of analytical verification of the prescribed formulas is described. The tasks of writing out optimal formulas for calculating the projections of static reaction forces in joints have been solved. And the tasks of writing out optimal formulas for calculating active forces in progressive joints of universal manipulators with six degrees of freedom, operating in Cartesian, cylindrical, spherical and angular
coordinate systems, have been solved also. Analytical verification of the derived equations of statics is performed. Examples of the reuse of the derived formulas for manipulators with the same kinematic schemes of their subsystems. Conclusion. Expressions of the equations of statics of manipulators through the guide cosines of the axes of the associated coordinate systems of their bodies allow us to write these equations through the known parameters of body orientation. The recurrent formulas for calculating directional cosines allows to use recursive functions in their software implementation, i.e. to increase the computational efficiency of the software.

driving forces, forces of reaction, static problems, direction cosines, verification of formulas, regular expressions, optimization of calculations

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