Slanted Vector Fields for Jet Spaces

Abstract

Low pole order frames of slanted vector fields are constructed on the space of vertical k-jets of the universal family of complete intersections in Pn and, adapting the arguments, low pole order frames of slanted vector fields are also constructed on the space of vertical logarithmic k-jets along the universal family of projective hypersurfaces in Pn with several irreducible smooth components. Both the pole order (here =5k-2) and the determination of the locus where the global generation statement fails are improved compared to the literature (previously =k2+2k), thanks to three new ingredients; we reformulate the problem in terms of some adjoint action, we introduce a new formalism of geometric jet coordinates, and then we construct what we call building-block vector fields, making the problem for arbitrary jet order k≥slant1 into a very analog of the much easier case where k=0, i.e. where no jet coordinates are needed.