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The Étale Homotopy Type and Obstructions to the Local-Global Principle

In 1969 Artin and Mazur defined the étale homotopy type of an algebraic variety \cite{AMa69}. In this paper we define various obstructions to the local-global principle on a variety $X$ over a global field using the étale homotopy type of $X$ and the concept of homotopy fixed points. We investigate relations between those "homotopy obstructions" and connect them to various known obstructions such as the Brauer -Manin obstruction, the étale-Brauer obstruction and finite descent obstructions. This gives a reinterpretation of known arithmetic obstructions in terms of homotopy theory.

preprint2011arXivOpen access
Yonatan HarpazTomer M. Schlank
math.ATmath.AG
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Yonatan HarpazTomer M. Schlank

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