Jan Dobrowolski: Sets, groups, and fields definable in vector spaces with a bilinear form
Thursday, 29.10.2020 10:30 im Raum via Zoom
We study dimension, definable groups, and definable fields in vector
spaces over algebraically closed [respectively, real closed] fields
equipped with a non-degenerate alternating bilinear form or
a non-degenerate [positive-definite] symmetric bilinear form. After
a brief overview of the background, I will discuss a notion of dimension
and some other ingredients of the proof of the main result, which states
that, in the above context, every definable group is
(algebraic-by-abelian)-by-algebraic
[(semialgebraic-by-abelian)-by-semialgebraic]. It follows from this
result that every definable field is definable in the field of scalars,
hence either finite or definably isomorphic to it [finite or
algebraically closed or real closed]
Angelegt am Friday, 02.10.2020 10:22 von Martina Pfeifer
Geändert am Tuesday, 27.10.2020 09:33 von Martina Pfeifer
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