O-minimal structures are structures with a dense linear order such that as few subsets of the line are definable as possible. This condition forces definable sets in all dimensions to behave in a topologically tame fashion. But while many properties from semialgebraic geometry carry over to the o-minimal setting, the question whether one has a theory of integration in any o-minimal structure is still open. We shall discuss some partial answers and suggest a possible future direction.
Measures and o-minimal structures
07.11.2019 15:00 - 16:30
Organiser:
KGRC
Location:
SR D5.48, 5. St., Augasse 2-6