Rotation Groups

Abstract

A query, about the orbit P W in real 3-space of a point P under an isometry group W generated by edge rotations of a tetrahedron, leads to contrasting notions, W versus S, of "rotation group". The set R =\r A1,r A2\ of rotations r A i about axes Ai generates two manifestations of an isometry group on 3: (1). In the stationary group S:=S(R), all axes B are fixed under a rotation r A about A. (2). In the peripatetic group W:=W(R), each r A transforms every rotational axis B=A. Theorem. \ If the line A1 is skew to A2, if each r Ai is of infinite order, and if P∈3, then both of the orbits P S and P W are dense in 3.