On the X-rank with respect to linear projections of projective varieties

Abstract

In this paper we improve the known bound for the X-rank RX(P) of an element P∈ PN in the case in which X⊂ Pn is a projective variety obtained as a linear projection from a general v-dimensional subspace V⊂ Pn+v. Then, if X⊂ Pn is a curve obtained from a projection of a rational normal curve C⊂ Pn+1 from a point O⊂ Pn+1, we are able to describe the precise value of the X-rank for those points P∈ Pn such that RX(P)≤ RC(O)-1 and to improve the general result. Moreover we give a stratification, via the X-rank, of the osculating spaces to projective cuspidal projective curves X. Finally we give a description and a new bound of the X-rank of subspaces both in the general case and with respect to integral non-degenerate projective curves.