A period mapping in universal Teichmüller space
arXiv:math/9204237
Abstract
In previous work it had been shown that the remarkable homogeneous space $M= \operatorname{Diff}(S^1)/\operatorname{PSL} (2,\Bbb{R})$ sits as a complex analytic and Kähler submanifold of the Universal Teichmüller Space. There is a natural immersion $Π$ of $M$ into the infinite-dimensional version (due to Segal) of the Siegel space of period matrices. That map $Π$ is proved to be injective, equivariant, holomorphic, and Kähler-isometric (with respect to the canonical metrics). Regarding a period mapping as a map describing the variation of complex structure, we explain why $Π$ is an infinite-dimensional period mapping.
8 pages