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37
Voted
JSYML
2007
2007
Groups definable in ordered vector spaces over ordered division rings
Let M = M, +, <, 0, {λ}λ∈D be an ordered vector space over an ordered division ring D, and G = G, ⊕, eG an n-dimensional group definable in M. We show that if G is definably compact and definably connected with respect to t-topology, then it is definably isomorphic to a ‘definable quotient group’ U/L, for some convex -definable subgroup U of Mn, + and a lattice L of rank n. As two consequences, we derive Pillay’s conjecture for M as above and we show that the o-minimal fundamental group of G is isomorphic to L.
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| Added | 16 Dec 2010 |
| Updated | 16 Dec 2010 |
| Type | Journal |
| Year | 2007 |
| Where | JSYML |
| Authors | Pantelis E. Eleftheriou, Sergei Starchenko |
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