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Inductive Sequences of Toeplitz Algebras and Limit Automorphisms. The inductive limits of such sequences are the reduced semigroup C*-algebras generated by representations
On Inductive Limits for Systems of C*-Algebras that each such an inductive limit is isomorphic to a reduced semigroup C*-algebra defined by a semigroup
On a Topology and Limits for Inductive Systems of C ∗ -Algebras over Partially Ordered Sets properties are given. An inductive system of C ∗ -algebras and its inductive limit arise naturally over each
Limit Automorphisms of the C*-Algebras Generated by Isometric Representations for Semigroups of Rationals connecting homomorphisms are defined by collections of primes. The inductive limits of these sequences are C
Inductive Systems of C*-Algebras over Posets: A Survey semigroup C*-algebras and local quantum field theory. We study the inductive limits for the inductive
Inductive Limits for Systems of Toeplitz Algebras defined by sequences of numbers and the limit automorphisms for the inductive limits of such sequences. We
Inductive and projective limits of Banach spaces of measurable functions with order unities with respect to power parameter unities fα (α approaches to infinity) as a direct sum of one inductive and one projective limits. We also
Measure on the inductive limit of projection lattices algebras is extended to a probability on the inductive limit of the lattices. © 1993 Plenum Publishing
Inductive and projective limits of Banach spaces of measurable functions with order unities with respect to power parameter unities fα (α approaches to infinity) as a direct sum of one inductive and one projective limits. We also
Locally Convex Limit Spaces of Measurable Functions with Order Units and Its Duals and predual, and we propose a method for constructing a limit spaces of these functional spaces taken by power
Страница 1 из 1976
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