A complex for the Dirac operator in several variables in dimension $4$
- Resource Type
- Working Paper
- Authors
- Krump, Lukáš; Souček, Vladimír
- Source
- Subject
- Mathematics - Differential Geometry
Mathematics - Representation Theory
- Language
The Penrose transform was used to construct a complex starting with the Dirac operator in $k$ Clifford variables in dimension $2n$ in the stable range $n\geq k.$ In the paper, we consider the same Penrose transform in the special case of dimension $4$ and for any number of variables (i.e., in the nonstable range). In this case, we describe explicitely the corresponding relative BGG complex and its direct image for cohomology with values in a suitable line bundle (in singular infinitesimal character). We show that how to construct then a complex starting with the Dirac operator in any number of variables.