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In this paper we complete the determination of the maximal subgroups of positive dimension in simple algebraic groups of exceptional type over algebraically closed fields. This follows work of Dynkin, who solved the problem in characteristic zero, and Seitz who did likewise over fields whose characteristic is not too small. A number of consequences are obtained. It follows from the main theorem that a simple algebraic group over an algebraically closed field has only finitely many conjugacy classes of maximal subgroups of positive dimension. It also follows that the maximal subgroups of sufficiently large order in finite exceptional groups of Lie type are known.
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This item is in your CollectionThe Maximal Subgroups of Positive Dimension in Exceptional Algebraic Groups (Memoirs of the American Mathematical Society Series #802), Vol. 169
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Add The Maximal Subgroups of Positive Dimension in Exceptional Algebraic Groups (Memoirs of the American Mathematical Society Series #802), Vol. 169, In this paper we complete the determination of the maximal subgroups of positive dimension in simple algebraic groups of exceptional type over algebraically closed fields. This follows work of Dynkin, who solved the problem in characteristic zero, and Sei, The Maximal Subgroups of Positive Dimension in Exceptional Algebraic Groups (Memoirs of the American Mathematical Society Series #802), Vol. 169 to the inventory that you are selling on WonderClubX
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Add The Maximal Subgroups of Positive Dimension in Exceptional Algebraic Groups (Memoirs of the American Mathematical Society Series #802), Vol. 169, In this paper we complete the determination of the maximal subgroups of positive dimension in simple algebraic groups of exceptional type over algebraically closed fields. This follows work of Dynkin, who solved the problem in characteristic zero, and Sei, The Maximal Subgroups of Positive Dimension in Exceptional Algebraic Groups (Memoirs of the American Mathematical Society Series #802), Vol. 169 to your collection on WonderClub |