On closed-form solutions to the position analysis of Baranov trusses

The exact position analysis of a planar mechanism reduces to compute the roots of its characteristic polynomial. Obtaining this polynomial usually involves, as a first step, obtaining a system of equations derived from the independent kinematic loops of the mechanism. Although conceptually simple, the use of kinematic loops for deriving characteristic polynomials leads to complex variable eliminations and, in most cases, trigonometric substitutions. As an alternative, a method based on bilateration has recently been shown to permit obtaining the characteristic polynomials of the three-loop Baranov trusses without relying on variable eliminations or trigonometric substitutions. This paper shows how this technique can be applied to solve the position analysis of all cataloged Baranov trusses. The characteristic polynomials of them all have been derived and, as a result, the maximum number of their assembly modes has been obtained. A comprehensive literature survey is also included.

► A theory for the position analysis of Baranov trusses in terms of distances. ► Introduction of symmetries in distance-based formulations. ► Closed-form position analyses of all the cataloged Baranov trusses. ► Number of assembly modes for all Baranov trusses with up to four loops. ► Detailed review of all reported previous solutions.