The Argentinian Ignacio Zalduendo had a particularly simple
example [1991]
(though it relies on that fragment of the Axiom of Choice given by the Hahn-Banach Theorem):
start with the convolution algebra
A =
l1(
Z),
multiplication being given by (
a •
b)
n
=
p, q:Σp+q=n
(
ap·
bq ).
The dual space
A* is just
l∞(
Z), and here we define σ as follows:
| σn = |
{ |
–1 (n < 0)
0 (n = 0) .
+1 (n > 0) | |
Now the subspace of
l∞(
Z) consisting of those bounded sequences
a
for which both lim
n→–∞ an and
lim
n→+∞ an exist is closed,
and the functionals
L– and
L+
assigning those limits are continuous, so use H.-B. to extend them to all of
l∞(
Z).
Of course,
L–(σ) = –1
and
L+(σ) = +1.
F.E.J. Linton • Wesleyan Univ. Math/CS Emeritus