Mathematics – Differential Geometry
Scientific paper
2003-09-05
Mathematics
Differential Geometry
57 pages. Many adjustments to the introduction. Typos corrected elsewhere
Scientific paper
On conformal manifolds of even dimension $n\geq 4$ we construct a family of new conformally invariant differential complexes. Each bundle in each of these complexes appears either in the de Rham complex or in its dual. Each of the new complexes is elliptic if the signature is Riemannian. We also construct gauge companion operators which complete the exterior derivative to a conformally invariant and (in the case of Riemannian signature) elliptically coercive system. These (operator,gauge) pairs are used to define finite dimensional conformally stable form subspaces which are are candidates for spaces of conformal harmonics. These constructions are based on a family of operators on closed forms which generalise in a natural way the Q-curvature. We give a universal construction of these new operators and show that they yield new conformally invariant global pairings between differential form bundles. Finally we give a geometric construction of a family of conformally invariant differential operators between density-valued differential form bundles and develop their properties (including their ellipticity type in the case of definite conformal signature). The construction is based on the ambient metric of Fefferman and Graham, and its relationship to tractor bundles. For each form order, our derivation yields an operator of every even order in odd dimensions, and even order operators up to order $n$ in even dimension $n$. In the case of unweighted forms as domain, these operators are the natural form analogues of the critical order conformal Laplacian of Graham et al., and are key ingredients in the new differential complexes mentioned above.
Branson Thomas
Gover Rod A.
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