Events

In the complex field, the only numbers which are pointwise definable
(fixed under all field automorphisms) are the rational numbers. If we
add the exponential function, we can ask which algebraic numbers become
definable. We can distinguish the two square roots of 2, but what about
cube roots, or other algebraic numbers? We introduce the notion of real
abelian numbers, and show that they are all pointwise definable. Under a
strong conjecture, we can show these are the only definable complex
algebraic numbers. This is joint work with Macintyre and Onshuus.

The canonical base property (CBP) is a certain stability-theoretic property whose formulation was
influenced by an "algebraicity" theorem of Campana for compact complex manifolds, and by an analogous
theorem for differential (and difference) algebraic varieties in char. 0 by myself and Ziegler (yielding a fast
account of function field Mordell-Lang in char. 0).
I will discuss this background, describe the CBP, and then prove some positive and negative results:
(i) The CBP holds for aleph-1 categorical theories under a "rigidity" assumption on definable automorphism

Any smooth, closed oriented 4-manifold M has a surface diagram, which is a closed, orientable surface,
decorated with simple closed curves, that specifies M up to diffeomorphism. I will discuss various
properties of surface diagrams.