Fields of finite Morley rank

Journal of Symbolic Logic 66 (2):703-706 (2001)
If K is a field of finite Morley rank, then for any parameter set $A \subseteq K^{eq}$ the prime model over A is equal to the model-theoretic algebraic closure of A. A field of finite Morley rank eliminates imaginaries. Simlar results hold for minimal groups of finite Morley rank with infinite acl( $\emptyset$ )
Keywords Field   Finite Morley Rank   Prime Model   Elimination of Imaginaries
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