K\"ahler complexity one Hamiltonian $T$-manifolds have trivial paintings
Isabelle Charton, Liat Kessler, Susan Tolman
TL;DR
This paper demonstrates that all compact, connected K"ahler complexity one Hamiltonian $T$-manifolds have a trivial painting, and classifies them up to symplectomorphism using genus, measure, and skeleton.
Contribution
It proves that K"ahler complexity one Hamiltonian $T$-manifolds have trivial paintings and provides a classification criterion based on geometric invariants.
Findings
K"ahler complexity one Hamiltonian $T$-manifolds have trivial paintings.
Two tall compact, connected K"ahler complexity one Hamiltonian $T$-manifolds are symplectomorphic if they share genus, measure, and skeleton.
Abstract
Let a torus act on a symplectic manifold with moment map . We say that the Hamiltonian -manifold has complexity one if , and that it is K\"ahler if it admits an invariant compatible complex structure. In this paper, we show how the class of K\"ahler complexity one Hamiltonian -manifolds sits inside the class of complexity one Hamiltonian -manifolds by proving that every compact, connected K\"ahler complexity one Hamiltonian -manifold has a trivial painting. As a corollary, we show that two tall compact, connected K\"ahler complexity one Hamiltonian -manifolds are symplectomorphic exactly if they have the same genus, Duistermaat-Heckman measure, and skeleton. Here, is tall exactly if every non-empty fiber contains more than one orbit.
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Taxonomy
TopicsGeometry and complex manifolds · Geometric and Algebraic Topology · Geometric Analysis and Curvature Flows