A categorical approach to imprimitivity theorems for C*-dynamical systems.0821838571 A categorical That which is unqualified or unconditional. A categorical imperative is a rule, command, or moral obligation that is absolutely and universally binding. Categorical is also used to describe programs limited to or designed for certain classes of people. approach to imprimitivity theorems This is a list of theorems, by Wikipedia page. See also
Ed. by Siegfried Echterhoff et al. Amer. Mathematical Society 2006 169 pages $65.00 Paperback Memoirs of the American Mathematical Society The American Mathematical Society (AMS) is an association of professional mathematicians dedicated to the interests of mathematical research and scholarship, which it does with various publications and conferences as well as annual monetary awards to mathematicians. ; no.850 QA3 It has become apparent that studying the representation theory and structure of crossed-product C*-algebras requires imprimitivity theorems. This monograph shows that the imprimitivity theorem theorem, in mathematics and logic, statement in words or symbols that can be established by means of deductive logic; it differs from an axiom in that a proof is required for its acceptance. for reduced algebras, Green's imprimitivity theorem for actions of groups, and Mansfield's imprimitivity theorem for coactions of groups can all be understood as natural equivalences between carious car·i·ous adj. Having caries; decayed. carious (ker´ēus), adj pertaining to caries or decay. crossed-product functors among certain equivariant categories. It covers Right-Hilbert bimodules, categories, functors, the natural equivalences, and applications, including relationships between the Green and Mansfield bimodules, and between restriction and induction of representations. The authors include appendices on crossed products by actions an coactions, the imprimitivity theorems of Green and Mansfield, and function spaces. The authors include a bibliography. ([c]20072005 Book News, Inc., Portland, OR) |
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