Florian Pop: Research

E-mail: pop AT math.upenn.edu

Papers | Some talks

Research interests

In my research work I am using/combining methods belonging to algebraic geometry, arithmetic geometry, Galois theory, model theory. I am working in: Galois theory of schemes over finitely generated fields (anabelian geometry), fundamental groups of curves, higher Hasse local-global principles and universal local-global principles, quadratic forms (over finitely generated fields), curves over valuations rings and the Skolem property, inverse Galois theory, model theory of valued fields and applications in geometry and arithmetics, model theory of function fields and effectivity in birational arithmetic algebraic geometry.

Dissertation: Galoissche Kennzeichnung p-adisch abgeschlossener Koerper, Heidelberg 1987.

Habilitation: Isomorphisms of stratified absolute Galois groups, Heidelberg 1990.

List of Penn Math Faculty and Fields of Interest.

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