TUESDAY,JANUARY 19, 2021
Presentation by Karl Oeljeklaus at FRUMAM – 2nd floor room from 11am to 12pm
Two classes of non-kählerian varieties
According to a theorem by Andrei Teleman, a compact complex surface with $b_1=1$, $b_2=0$ and no complex curve as subspace is isomorphic to either a surface $S_M$, or a surface $S_N$ whose discovery is due to Inoue.
In this paper, we explain the constructions of two classes of varieties in higher dimension that generalize the said surfaces and we study some analytical-complex properties.