ISOMETRIES ON SOME GENERAL FAMILY FUNCTION SPACES AMONG COMPOSITION OPERATORS

In this paper, we discuss the isometries of composition operators on the holomorphic general family function spaces F(p, q, s). First, we classify the isometric composition operators acting on a general Banach spaces. For 1 < p < 2, we display that an isometry of C-phi is caused only by a rotation of the disk. We scrutinize the previous work on the case for p >= 2. Also, we characterize many of the foregoing results about all alpha-Besov-type spaces F(p, alpha p-2, s), alpha > 0. We exhibit that in every classes F(p, alpha p-2, s) except for the Dirichlet space D = F(2, 0, 0), rotations are the only that produce isometries.