Almost Coquaternion Structure

Abstract

Our aim is to define and study a structure for some (4n+3)-dimensional manifolds which is named almost coquaternion structure. This structure is composed of three almost cocomplex structures (φa, a, ηa), a = 1,2,3, which satisfy some relations and may be considered as analogous to the almost quaternion structure for (4n+4)-dimensional manifolds. The sphere S4n+3 is a typical example of differentiable manifold which admits an almost coquaternion structure (φa, a, ηa), a = 1,2,3. Using the 1-forms ηa of the almost coquaternion structure of the sphere S4n+3, C. Teleman defined and studied on S4n+3 a nonholonomic manifold V4n4n+3 whose Riemannian metric is the one of a symmetric space of E. Cartan. Keeping in mind Teleman's idea, we observed that on an almost coquaternion manifold a nonholonomic (holonomic) manifold of codimension three can be defined and studied by nonintegrable (completely integrable) Pfaff's system η1 = 0, η2 = 0, η3 = 0.