Multipliers, self-induced and dual Banach algebras

Matthew Daws. Multipliers, self-induced and dual Banach algebras. 2010. <http://eudml.org/doc/286010>.

@book{MatthewDaws2010,
abstract = {In the first part of the paper, we present a short survey of the theory of multipliers, or double centralisers, of Banach algebras and completely contractive Banach algebras. Our approach is very algebraic: this is a deliberate attempt to separate essentially algebraic arguments from topological arguments. We concentrate upon the problem of how to extend module actions, and homomorphisms, from algebras to multiplier algebras. We then consider the special cases when we have a bounded approximate identity, and when our algebra is self-induced. In the second part of the paper, we mainly concentrate upon dual Banach algebras. We provide a simple criterion for when a multiplier algebra is a dual Banach algebra. This is applied to show that the multiplier algebra of the convolution algebra of a locally compact quantum group is always a dual Banach algebra. We also study this problem within the framework of abstract Pontryagin duality, and show that we construct the same weak* topology. We explore the notion of a Hopf convolution algebra, and show that in many cases, the use of the extended Haagerup tensor product can be replaced by a multiplier algebra.},
author = {Matthew Daws},
keywords = {Multiplier; double centralizer; Fourier algebra; locally compact quantum group; dual Banach algebra; Hopf convolution algebra},
language = {eng},
title = {Multipliers, self-induced and dual Banach algebras},
url = {http://eudml.org/doc/286010},
year = {2010},
}

TY - BOOK
AU - Matthew Daws
TI - Multipliers, self-induced and dual Banach algebras
PY - 2010
AB - In the first part of the paper, we present a short survey of the theory of multipliers, or double centralisers, of Banach algebras and completely contractive Banach algebras. Our approach is very algebraic: this is a deliberate attempt to separate essentially algebraic arguments from topological arguments. We concentrate upon the problem of how to extend module actions, and homomorphisms, from algebras to multiplier algebras. We then consider the special cases when we have a bounded approximate identity, and when our algebra is self-induced. In the second part of the paper, we mainly concentrate upon dual Banach algebras. We provide a simple criterion for when a multiplier algebra is a dual Banach algebra. This is applied to show that the multiplier algebra of the convolution algebra of a locally compact quantum group is always a dual Banach algebra. We also study this problem within the framework of abstract Pontryagin duality, and show that we construct the same weak* topology. We explore the notion of a Hopf convolution algebra, and show that in many cases, the use of the extended Haagerup tensor product can be replaced by a multiplier algebra.
LA - eng
KW - Multiplier; double centralizer; Fourier algebra; locally compact quantum group; dual Banach algebra; Hopf convolution algebra
UR - http://eudml.org/doc/286010
ER -