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Description
Abelian varieties are projective and connected group varieties. They are of fundamental importance to the study of all projective smooth varieties over fields. In the late 1960s, Serre and Tate developed a deformation theory of abelian varieties over fields of positive characteristic, and introduced several ways to identify the generic ones, which are called ordinary abelian varieties.
This monograph provides a comprehensive generalization of the Serre and Tate theory of ordinary abelian varieties and their deformation spaces. This generalization deals with abelian varieties equipped with additional structures. The additional structures can be not only a classical action of a semisimple algebra and a polarization, but can also be, more generally, the data given by some “crystalline Hodge cycles” (i.e., a crystalline version of a Hodge cycle in the sense of motives). Compared to Serre–Tate ordinary theory, new phenomena appear in the generalized setting. The generalized theory is presented both in abstract contexts of Fcrystals endowed with reductive groups and minuscule Hodge cocharacters, and in geometric contexts provided by good moduli spaces of abelian varieties endowed with additional strictures, which are called integral canonical models of Shimura varieties of Hodge type. This monograph studies the generalized notions of ordinariness from multiple points of view, such as Newton polygons, canonical lifts, formal Lie groups, complex multiplications, etc.
Researchers and graduate students working in related areas, such as arithmetic algebraic geometry and number theory, will find this monograph truly valuable due to its comprehensive nature and general setting, which provide key new tools for tackling numerous other problems pertaining to all integral canonical models of Shimura varieties of Hodge type.
Publications
Pub. Date 
ISBN13 
ISBN10 
Medium 
Binding 
Size, Etc. 
Status 
List Price 
2013 Oct 
9781571462770 
1571462775 

paperback 
7” x 10” 
In Print 
US$39.00 