Exotic Holonomy on Moduli Spaces of Rational Curves
Abstract
Bryant Br proved the existence of torsion free connections with exotic holonomy, i.e. with holonomy that does not occur on the classical list of Berger Ber. These connections occur on moduli spaces of rational contact curves in a contact threefold . Therefore, they are naturally contained in the moduli space of all rational curves in . We construct a connection on whose restriction to is torsion free. However, the connection on has torsion unless both and are flat. We also show the existence of a new exotic holonomy which is a certain sixdimensional representation of × . We show that every regular H3-connection (cf. Br) is the restriction of a unique connection with this holonomy.
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