Some remarks on osculating self-dual varieties

Abstract

Let us say that a curve C⊂ P3 is osculating self-dual if it is projectively equivalent to the curve in the dual space ( P3)* whose points are osculating planes to~C. Similarly, we say that a k-dimensional subvariety X⊂ P2k+1 is osculating self-dual if its second osculating space at the general point is a hyperplane and X is projectively equivalent to the variety in ( P2k+1)* whose points are second osculating spaces to X. In this note we show that for each k 1 there exist many osculating self-dual k-dimensional subvarieties in P2k+1.