AbstractWe consider tame minimal simple groups of finite Morley rank and of odd type. We show that the Prüfer 2-rank of such a group is bounded by 2. We also find all potential nonalgebraic configurations; there are essentially four of them, and we delineate them with some precision
AbstractThis paper provides a method for identifying “sufficiently rich” simple groups of finite Mor...
AbstractThis paper gives a partial answer to the Cherlin–Zil'ber Conjecture, which states that every...
We construct fields of finite Morley rank with a predicate O foran infinite non-algebraic subgroup o...
AbstractWe consider tame minimal simple groups of finite Morley rank and of odd type. We show that t...
AbstractLet G be a simple K∗-group of finite Morley rank of odd type which is not algebraic. Then G ...
AbstractThere is a longstanding conjecture, due to Gregory Cherlin and Boris Zilber, that all simple...
The algebraicity conjecture for simple groups of finite Morley rank, also known as the Cherlin-Zilbe...
AbstractLet G be a simple K∗-group of finite Morley rank of odd type which is not algebraic. Then G ...
Chapitre invité dans un ouvrage à paraître. N'a pas encore été relu par nos pairs.The present survey...
Abstract. IfG is a minimal connected simple group of finite Morley rank with a nontrivial Weyl group...
The algebraicity conjecture for simple groups of finite Morley rank, also known as the Cherlin–Zil'b...
Abstract. IfG is a minimal connected simple group of finite Morley rank with a nontrivial Weyl group...
The paper bounds the Morley rank of a definably primitive permutation group of finite Morley rank in...
This PhD aims at studying some "small" groups of finite Morley rank. The Cherlin-Zilber conjecture a...
Moufang sets are split doubly transitive permutation groups, or equivalently, groups with a split BN...
AbstractThis paper provides a method for identifying “sufficiently rich” simple groups of finite Mor...
AbstractThis paper gives a partial answer to the Cherlin–Zil'ber Conjecture, which states that every...
We construct fields of finite Morley rank with a predicate O foran infinite non-algebraic subgroup o...
AbstractWe consider tame minimal simple groups of finite Morley rank and of odd type. We show that t...
AbstractLet G be a simple K∗-group of finite Morley rank of odd type which is not algebraic. Then G ...
AbstractThere is a longstanding conjecture, due to Gregory Cherlin and Boris Zilber, that all simple...
The algebraicity conjecture for simple groups of finite Morley rank, also known as the Cherlin-Zilbe...
AbstractLet G be a simple K∗-group of finite Morley rank of odd type which is not algebraic. Then G ...
Chapitre invité dans un ouvrage à paraître. N'a pas encore été relu par nos pairs.The present survey...
Abstract. IfG is a minimal connected simple group of finite Morley rank with a nontrivial Weyl group...
The algebraicity conjecture for simple groups of finite Morley rank, also known as the Cherlin–Zil'b...
Abstract. IfG is a minimal connected simple group of finite Morley rank with a nontrivial Weyl group...
The paper bounds the Morley rank of a definably primitive permutation group of finite Morley rank in...
This PhD aims at studying some "small" groups of finite Morley rank. The Cherlin-Zilber conjecture a...
Moufang sets are split doubly transitive permutation groups, or equivalently, groups with a split BN...
AbstractThis paper provides a method for identifying “sufficiently rich” simple groups of finite Mor...
AbstractThis paper gives a partial answer to the Cherlin–Zil'ber Conjecture, which states that every...
We construct fields of finite Morley rank with a predicate O foran infinite non-algebraic subgroup o...
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