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- Mumford–Tate_group abstract "In algebraic geometry, the Mumford–Tate group (or Hodge group) MT(F) constructed from a Hodge structure F is a certain algebraic group G. When F is given by a rational representation of an algebraic torus, the definition of G is as the Zariski closure of the image in the representation of the circle group, over the rational numbers. Mumford (1966) introduced Mumford–Tate groups over the complex numbers under the name of Hodge groups. Serre (1967) introduced the p-adic analogue of Mumford's construction for Hodge–Tate modules, using the work of Tate (1967) on p-divisible groups, and named them Mumford–Tate groups.".
- Mumford–Tate_group wikiPageID "27137708".
- Mumford–Tate_group wikiPageRevisionID "573268634".
- Mumford–Tate_group subject Category:Algebraic_groups.
- Mumford–Tate_group subject Category:Hodge_theory.
- Mumford–Tate_group comment "In algebraic geometry, the Mumford–Tate group (or Hodge group) MT(F) constructed from a Hodge structure F is a certain algebraic group G. When F is given by a rational representation of an algebraic torus, the definition of G is as the Zariski closure of the image in the representation of the circle group, over the rational numbers. Mumford (1966) introduced Mumford–Tate groups over the complex numbers under the name of Hodge groups.".
- Mumford–Tate_group label "Mumford–Tate group".
- Mumford–Tate_group sameAs Mumford%E2%80%93Tate_group.
- Mumford–Tate_group sameAs Q6935407.
- Mumford–Tate_group sameAs Q6935407.
- Mumford–Tate_group wasDerivedFrom Mumford–Tate_group?oldid=573268634.