Differential p-forms and q-vector fields with constant coefficients

Abstract

Differential p-forms and q-vector fields with constant coefficients are studied. Differential p-forms of degrees p=1,2,n-1,n with constant coefficients on a smooth n-dimensional manifold M are characterized. In the contravariant case, the obstruction for a q-vector field Vq to have constant coefficients is proved to be the Schouten-Nijenhuis bracket of Vq with itself. The q-vector fields with constant coefficients of degrees q=1,2,n-1,n are also characterized. The notions of differential p-forms and q-vector fields with conformal constant coefficients are introduced. For arbitrary degrees p and q, such differential p-forms and q-vector fields are seen to be the solutions to two second-order partial differential systems on J2(M,Rn), which are reducible to two first-order partial differential systems by adding variables. Computational aspects in solving these systems are discussed and examples and applications are also given.

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