Abstract

Various authors have considered the Zero-rest-mass equation and the contour
integral representation of its solutions. Ferber generalized these equations to
supertwistor spaces with 2N odd components so that with N=O we get the standard
ungraded twistors of Penrose. In this paper we use the Batchelor theorem toconstruct
the natural super Twistor space with coarse topology with underlying standard
twistors. We also introduce a Super zero rest-mass equation (S. Z. R. M) which satifies
the standard non- graded Z. R. M. equation when an augmentation map &is applied. It
has been shown that the contour integral defined by Rogers can be used to represent a
solution for these equations and these solutionsreduce to standard solutions when one
applies the ?-map