Some differential complexes within and beyond parabolic geometry
Abstract
For smooth manifolds equipped with various geometric structures, we construct
complexes that replace the de Rham complex in providing an alternative fine
resolution of the sheaf of locally constant functions. In case that the
geometric structure is that of a parabolic geometry, our complexes coincide
with the Bernstein-Gelfand-Gelfand complex associated with the trivial
representation. However, at least in the cases we discuss, our constructions
are relatively simple and avoid most of the machinery of parabolic geometry.
Moreover, our method extends to certain geometries beyond the parabolic realm.
Type
Journal articlePermalink
https://hdl.handle.net/10161/17610Collections
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Show full item recordScholars@Duke
Robert Bryant
Phillip Griffiths Professor of Mathematics
My research concerns problems in the geometric theory of partial differential equations.
More specifically, I work on conservation laws for PDE, Finsler geometry, projective
geometry, and Riemannian geometry, including calibrations and the theory of holonomy.
Much of my work involves or develops techniques for studying systems of partial differential
equations that arise in geometric problems. Because of their built-in invariance
properties, these systems often have specia
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