Lie groups and o-minimality

24.10.2024 15:00 - 15:50

A. Onshuus (U de los Andes, Bogotá, CO)

It has been known for some time that any group definable in an o-minimal expansion of the real field can be endowed definably with the structure of a Lie group, and that any definable homomorphisms between definable groups is a Lie homomorphism (under the above mentioned Lie structure). In this talk we explore the converse: We will characterize when a Lie group has a Lie isomorphic group which is definable in an o-minimal expansion of the real field, when Lie isomorphisms between such definable groups is definable, and whether one can achieve a definable Lie analytic structure in any such definable group.

Organiser:

KGRC

Location:

HS 11, 2. OG, OMP 1