Boundary structure of bounded symmetric domains
For bounded symmetric domains D in a complex
Banach space we study the problem when a sequence of
biholomorphic automorphisms of D converges to a
boundary map and of what type these limits are.
Here we always take the realization of D as the open
unit ball in a JB*-triple (= positive hermitian Banach Jordan
triple system) and exploit the Jordan theoretic
characterization of their biholomorphic automorphisms.
(This paper has appeared in manuscr. math. 101 (2000), 351 - 360)
W. Kaup
<kaup@uni-tuebingen.de>