Results 41 to 50 of about 66 (65)
On amenability and co-amenability of algebraic quantum groups and their corepresentations.
We introduce and study several amenability properties for unitary corepresentations and *-representations of algebraic quantum groups, which may be used to characterize amenability or co-amenability of such groups. As a background for this study, we also
Bedos, Erik Christopher +2 more
core
Generalized Solenoids and C*-Algebras
We present the continuous graph approach for some generalizations of the CuntzKrieger algebras. These algebras are simple, nuclear, and purely infinite, with rich Ktheory. They are tied with the dynamics of a shift on an infinite path space.
Valentin Deaconu
core
Linear maps between C*-algebras that are *-homomorphisms at a fixed point
Let A and B be C*-algebras. A linear map T : A → B is said to be a*-homomorphism at an element z ∈ A if ab*= z in A implies T(ab*) = T(a) T(b)*= T(z), and c*d = z in A gives T(c * d) = T(c) * T(d) = T(z): Assuming that A is unital, we prove that every ...
Burgos, María J. +2 more
core
In this paper, the author proves an asymptotic version of the double commutant theorem, in a particular set-up of commutative C∗ -algebras. More precisely, he considers the relative approximate double commutant of a C ∗-algebra with unit, and, using a
Francesco Tschinke
core
Stable outer conjugacy and strong Morita equivalence of group actions on pro-C *-algebras
Joiţa Maria
doaj +1 more source
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A schwarz inequality for positive linear maps on $C^{\ast}$-algebras
Illinois Journal of Mathematics, 1974Man-Duen Choi
exaly
Injective envelopes of C*-algebras
Journal of the Mathematical Society of Japan, 1979Masamichi Hamana
exaly
Complications of semicontinuity in C∗-algebra theory
Duke Mathematical Journal, 1973Gert K Pedersen
exaly

