You may have to Search all our reviewed books and magazines, click the sign up button below to create a free account.
The Gerhard P. Hochschild papers (1941-2004) consist of correspondence with students and mathematicians, several seminar notes and talks, corrected reprints of his publications from throughout his career and course notes for classes at the University of California, Berkeley. Also included are Hochschild's manuscript notes and correspondence relating to his publication Introduction to Affine Algebraic Groups.
The theory of algebraic groups results from the interaction of various basic techniques from field theory, multilinear algebra, commutative ring theory, algebraic geometry and general algebraic representation theory of groups and Lie algebras. It is thus an ideally suitable framework for exhibiting basic algebra in action. To do that is the principal concern of this text. Accordingly, its emphasis is on developing the major general mathematical tools used for gaining control over algebraic groups, rather than on securing the final definitive results, such as the classification of the simple groups and their irreducible representations. In the same spirit, this exposition has been made entire...
A mathematical discussion of the algebras of differential forms is treated as a special combination of linear algebra and homological alegbra. There is specific identification of this particular exterior algebra as applied to canical graded algebra based on the Tor functor and obtained by the cohomology of differential forms from the ext functor to a universal algebra i. e. Lie algebra. Attention is directed chiefly to a regular affine algebra, K-algebra, which is Noetherian with a finite Krull dimension, i. e. the largest non-negative integer.
Let G be a Lie group with a finite number of connected components and let R(b) denote the ring of complex-valued continuous functions no G whose translates are finite dimensional. We investigate 1) the algebraic structure of R(b), 2) the group A of automorphisms of R(b) regarded as G-module, 3) the relation between G and A. A case of central interest is the one in which R(b) is a finitely generated ring. Under this hypothesis, A turns out to be the "universal complexification" of G. This result can be regarded as a direct generalization of Tannaka's duality theorem for compact Lie groups and Harish-Chandra's analogue for connected semi-simple groups. The hypothesis that R(b) be finitely generated is equivalent to the condition that G modulo the topological closure of the commutator subgroup of the connected component of the identity be compact. Conversely, if A is the universal complexification of G, then R(b) is finitely generated. Thus the class of Lie groups with R(b) finitely generated is the precise class for which Tannaka's duality holds.
None