Add to ORKGWe revisit the geometry of involutions in groups of finite Morley rank. The focus is on specific configurations where, as in PGL2(K), the group has a subgroup whose conjugates generically cover the group and intersect trivially. Our main result is the subtle yet strong statement that in such configurations the conjugates of the subgroup may not cover all strongly real elements. As an application, we unify and generalise numerous results, both old and recent, which have exploited a similar method; though in fact we prove much more. We also conjecture that this path leads to a new identification theorem for PGL2(K), possibly beyond the finite Morley rank context
The main theorem of my paper mentioned in the title [J. Algebra 370, 171-175 (2012; Zbl 06162674)] c...
AbstractThis is the first of two papers whose goal is the proof of the following result: THEOREM. Le...
The paper contains a final identification theorem for the ‘generic’ $K^*$-groups of finite Morley ra...
We revisit the geometry of involutions in groups of finite Morley rank. The focus is on specific con...
In a connected group of finite Morley rank, if the Sylow 2-subgroups are finite then they are trivia...
This paper gives a partial answer to the Cherlin-Zil'ber Conjecture, which states that every infinit...
AbstractThis paper gives a partial answer to the Cherlin–Zil'ber Conjecture, which states that every...
AbstractIn Theorem 1 we classify all finite-dimensional indecomposable representations of the infini...
International audienceBy analogy with Thompson's classification of nonsolvable finite N-groups, we c...
The paper deals with locally finite groups G having an involution phi such that C-G(phi) is of finit...
International audienceWe prove a general dichotomy theorem for groups of finite Morley rank with sol...
If G is a finite group and X a conjugacy class of elements of G, then we define rank(G:X) to be the ...
We investigate faithful representations of Alt(n) as automorphisms of a connected group G of finite ...
We are interested in a class of groups, quasi- Frobenius groups (with involutions), whose internal ...
We are interested in a class of groups, quasi- Frobenius groups (with involutions), whose internal ...
The main theorem of my paper mentioned in the title [J. Algebra 370, 171-175 (2012; Zbl 06162674)] c...
AbstractThis is the first of two papers whose goal is the proof of the following result: THEOREM. Le...
The paper contains a final identification theorem for the ‘generic’ $K^*$-groups of finite Morley ra...
We revisit the geometry of involutions in groups of finite Morley rank. The focus is on specific con...
In a connected group of finite Morley rank, if the Sylow 2-subgroups are finite then they are trivia...
This paper gives a partial answer to the Cherlin-Zil'ber Conjecture, which states that every infinit...
AbstractThis paper gives a partial answer to the Cherlin–Zil'ber Conjecture, which states that every...
AbstractIn Theorem 1 we classify all finite-dimensional indecomposable representations of the infini...
International audienceBy analogy with Thompson's classification of nonsolvable finite N-groups, we c...
The paper deals with locally finite groups G having an involution phi such that C-G(phi) is of finit...
International audienceWe prove a general dichotomy theorem for groups of finite Morley rank with sol...
If G is a finite group and X a conjugacy class of elements of G, then we define rank(G:X) to be the ...
We investigate faithful representations of Alt(n) as automorphisms of a connected group G of finite ...
We are interested in a class of groups, quasi- Frobenius groups (with involutions), whose internal ...
We are interested in a class of groups, quasi- Frobenius groups (with involutions), whose internal ...
The main theorem of my paper mentioned in the title [J. Algebra 370, 171-175 (2012; Zbl 06162674)] c...
AbstractThis is the first of two papers whose goal is the proof of the following result: THEOREM. Le...
The paper contains a final identification theorem for the ‘generic’ $K^*$-groups of finite Morley ra...