Twistor Geometry of Null Foliations in Complex Euclidean Space

Abstract

We give a detailed account of the geometric correspondence between a smooth complex projective quadric hypersurface Qn of dimension n ≥ 3, and its twistor space PT, defined to be the space of all linear subspaces of maximal dimension of Qn. Viewing complex Euclidean space CEn as a dense open subset of Qn, we show how local foliations tangent to certain integrable holomorphic totally null distributions of maximal rank on CEn can be constructed in terms of complex submanifolds of PT. The construction is illustrated by means of two examples, one involving conformal Killing spinors, the other, conformal Killing-Yano 2-forms. We focus on the odd-dimensional case, and we treat the even-dimensional case only tangentially for comparison.