We introduce notions of absolutely continuous functionals and representations
on the non-commutative disk algebra An. Absolutely continuous functionals
are used to help identify the type L part of the free semigroup algebra
associated to a ∗-extendible representation σ. A ∗-extendible
representation of An is ``regular'' if the absolutely continuous part
coincides with the type L part. All known examples are regular. Absolutely
continuous functionals are intimately related to maps which intertwine a given
∗-extendible representation with the left regular representation. A simple
application of these ideas extends reflexivity and hyper-reflexivity results.
Moreover the use of absolute continuity is a crucial device for establishing a
density theorem which states that the unit ball of σ(An) is weak-∗
dense in the unit ball of the associated free semigroup algebra if and only if
σ is regular. We provide some explicit constructions related to the
density theorem for specific representations. A notion of singular functionals
is also defined, and every functional decomposes in a canonical way into the
sum of its absolutely continuous and singular parts.Comment: 26 pages, prepared with LATeX2e, submitted to Journal of Functional
Analysi