Add to ORKGGeoff Mason announced in about 1980 the classifcication of quasithin groups of characteristic 2; but never published this step in the classification of the finite simple groups. In January 1996, the authors began work toward a new and more general classification of quasithin groups; the paper gives an exposition of the approach and considerable progress to date
Abstract. In this note we give the quasi-isometry classification for a class of right angled Artin g...
A finite group G is called a quasi-NC group if for any abelian subgroup A, either AG or CG(A)=NG(A)....
We give an overview of the classification results obtained so far for finite quasi-quantum groups ov...
The treatment of quasithin groups of characteristic 2 was one of the last steps in the Classificatio...
The book provides an outline and modern overview of the classification of the finite simple groups. ...
First published in Bulletin of the American Mathematical Society in volume 38, issue 3, published by...
First published in Bulletin of the American Mathematical Society in volume 38, issue 3, published by...
The classification of the finite simple groups was completed sometime during the summer of 1980. To ...
Collecting results scattered throughout the literature into one source, An Introduction to Quasigrou...
The 2012 Leroy P. Steele Prize for Mathematical Exposition is awarded to Michael Aschbacher, Richa...
This book completes a trilogy (Numbers 5, 7, and 8) of the series The Classification of the Finite S...
The material in this article corresponds roughly to the contents of six lectures given at the Intern...
Quasinormal subgroups have been studied for nearly 80 years. In finite groups, questions concerning ...
Abstract. In this note we give the quasi-isometry classification for a class of right angled Artin g...
We give an overview of the classification results obtained so far for finite quasi-quantum groups ov...
Abstract. In this note we give the quasi-isometry classification for a class of right angled Artin g...
A finite group G is called a quasi-NC group if for any abelian subgroup A, either AG or CG(A)=NG(A)....
We give an overview of the classification results obtained so far for finite quasi-quantum groups ov...
The treatment of quasithin groups of characteristic 2 was one of the last steps in the Classificatio...
The book provides an outline and modern overview of the classification of the finite simple groups. ...
First published in Bulletin of the American Mathematical Society in volume 38, issue 3, published by...
First published in Bulletin of the American Mathematical Society in volume 38, issue 3, published by...
The classification of the finite simple groups was completed sometime during the summer of 1980. To ...
Collecting results scattered throughout the literature into one source, An Introduction to Quasigrou...
The 2012 Leroy P. Steele Prize for Mathematical Exposition is awarded to Michael Aschbacher, Richa...
This book completes a trilogy (Numbers 5, 7, and 8) of the series The Classification of the Finite S...
The material in this article corresponds roughly to the contents of six lectures given at the Intern...
Quasinormal subgroups have been studied for nearly 80 years. In finite groups, questions concerning ...
Abstract. In this note we give the quasi-isometry classification for a class of right angled Artin g...
We give an overview of the classification results obtained so far for finite quasi-quantum groups ov...
Abstract. In this note we give the quasi-isometry classification for a class of right angled Artin g...
A finite group G is called a quasi-NC group if for any abelian subgroup A, either AG or CG(A)=NG(A)....
We give an overview of the classification results obtained so far for finite quasi-quantum groups ov...