Invariant spaces and traces of holomorphic functions on the skeletons of classical domains (Q1093773)

In the paper D denotes a classical domain in the space of several complex variables, i.e., an irreducible symmetric domain of one of the four types, clearly specified A(D) is the algebra of the functions, continuous in the closed domain D and holomorphic in D. \(\Gamma\) is the skeleton of D i.e., the Shilov boundary of A(D). A(\(\Gamma)\) is the restriction of the algebra A(D) to \(\Gamma\) and C(\(\Gamma)\) is the space of complex- valued functions on \(\Gamma\) with uniform norm. G denotes the group of bi-holomorphic automorphism of D. The invariant subspace of the space C(\(\Gamma)\) for D is studied here, after invariant spaces are defined clearly. Some interesting results about invariant subspaces are proved.