Lotay, JD;
Pacini, T;
(2019)
Complexified diffeomorphism groups, totally real submanifolds and KÄhler–Einstein geometry.
Transactions of the American Mathematical Society
, 371
(4)
pp. 2665-2701.
10.1090/tran/7421.
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Abstract
Let (M, J) be an almost complex manifold. We show that the infinitedimensional space T of totally real submanifolds in M carries a natural connection. This induces a canonical notion of geodesics in T and a corresponding definition of when a functional f : T → R is convex. Geodesics in T can be expressed in terms of families of J-holomorphic curves in M; we prove a uniqueness result and study their existence. When M is K¨ahler we define a canonical functional on T ; it is convex if M has non-positive Ricci curvature. Our construction is formally analogous to the notion of geodesics and the Mabuchi functional on the space of K¨ahler potentials, as studied by Donaldson, Fujiki and Semmes. Motivated by this analogy, we discuss possible applications of our theory to the study of minimal Lagrangians in negative K¨ahler–Einstein manifolds.
| Type: | Article |
|---|---|
| Title: | Complexified diffeomorphism groups, totally real submanifolds and KÄhler–Einstein geometry |
| Open access status: | An open access version is available from UCL Discovery |
| DOI: | 10.1090/tran/7421 |
| Publisher version: | https://doi.org/10.1090/tran/7421 |
| Language: | English |
| Additional information: | This version is the author accepted manuscript. For information on re-use, please refer to the publisher’s terms and conditions. |
| UCL classification: | UCL UCL > Provost and Vice Provost Offices UCL > Provost and Vice Provost Offices > UCL BEAMS UCL > Provost and Vice Provost Offices > UCL BEAMS > Faculty of Maths and Physical Sciences UCL > Provost and Vice Provost Offices > UCL BEAMS > Faculty of Maths and Physical Sciences > Dept of Mathematics |
| URI: | https://discovery.ucl.ac.uk/id/eprint/1550205 |
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