Linear Pentapods with a Simple Singularity Variety

Abstract

There exists a bijection between the configuration space of a linear pentapod and all points (u,v,w,px,py,pz)∈R6 located on the singular quadric : u2+v2+w2=1, where (u,v,w) determines the orientation of the linear platform and (px,py,pz) its position. Then the set of all singular robot configurations is obtained by intersecting with a cubic hypersurface in R6, which is only quadratic in the orientation variables and position variables, respectively. This article investigates the restrictions to be imposed on the design of this mechanism in order to obtain a reduction in degree. In detail we study the cases where is (1) linear in position variables, (2) linear in orientation variables and (3) quadratic in total. The resulting designs of linear pentapods have the advantage of considerably simplified computation of singularity-free spheres in the configuration space. Finally we propose three kinematically redundant designs of linear pentapods with a simple singularity surface.