TY - ELEC
AU - Kael Dixon
PY - 2019
TI - Toric $G_2$ and nearly Kaehler geometry
LA - eng
M3 - Moving Image
AB - We will discuss analogues of toric geometry in the $G_2$ and nearly Kaehler settings using a multisymplectic generalization of the moment map called the multi-moment map. We will then present recent work on complete toric nearly Kaehler manifolds, demonstrating some information about their global structure and giving evidence to the conjecture that the homogeneous nearly Kaehler structure on the product of two three spheres is the only example.
N2 - We will discuss analogues of toric geometry in the $G_2$ and nearly Kaehler settings using a multisymplectic generalization of the moment map called the multi-moment map. We will then present recent work on complete toric nearly Kaehler manifolds, demonstrating some information about their global structure and giving evidence to the conjecture that the homogeneous nearly Kaehler structure on the product of two three spheres is the only example.
UR - https://open.library.ubc.ca/collections/48630/items/1.0385104
ER - End of Reference