Moritz Kerz and Alexander Schmidt: On different notions of tameness in arithmetic geometry theory

Moritz Kerz and Alexander Schmidt: On different notions of tameness in arithmetic geometry

       Authors: Moritz Kerz and Alexander Schmidt
       Title: On different notions of tameness in arithmetic geometry
       Pages: 28
       In: Math. Ann. 346 (2010) 641-668

Preprint pdf-file: zahm-alles.pdf

Abstract: The notion of a tamely ramified covering is canonical only for curves. Several notions of tameness for coverings of higher dimensional schemes have been used in the literature. We show that all these definitions are essentially equivalent. Furthermore, we prove finiteness theorems for the tame fundamental groups of arithmetic schemes.

	Abstract: The notion of a tamely ramified covering is canonical only for curves. Several notions of tameness for coverings of higher dimensional schemes have been used in the literature. We show that all these definitions are essentially equivalent. Furthermore, we prove finiteness theorems for the tame fundamental groups of arithmetic schemes.

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