Michel Van den Bergh
Published 2008-07-09, updated 2008-07-11Version 2
These are notes on de Jong's proof of the period=index theorem over fields of transcendence degree two. They are actually about the simplified proof sketched by de Jong in the last section of his paper. These notes were meant as support for my lectures at the summer school "Central Simple Algebras over Function Fields" at the Universitat Konstanz between August, 26 and September, 1 2007 (other lectures on this subject were given by Philippe Gille, Andrew Kresch, Max Lieblich, Tamas Szamuely and Jan Van Geel). No originality is intended (except perhaps a little in the proof of the Artin splitting theorem). Various sources on which the material is based are indicated in the notes. The reader should be warned that these notes have not been updated to reflect developments in the subject which occurred after the end of the summerschool.
Comments: Mistake corrected in the spelling of Jason Starr's name
On $\mathsf{G}$-isoshtukas over function fields
The Pythagoras number of fields of transcendence degree $1$ over $\mathbb{Q}$
The period-index problem for fields of transcendence degree 2
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