Generalized complex symmetric composition operators with applications
Abstract
We characterize the weighted composition-differentiation operators D,, acting on Hγ(Dd) over the polydisk Dd which are complex symmetric with respect to the conjugation J. We obtain necessary and sufficient conditions for D,, to be self-adjoint. We also investigate complex symmetry of generalized weighted composition differentiation operators Mn, , =Σj=1najDj,j, , (where aj∈ C for j=1, 2, …, n) on the reproducing kernel Hilbert space Hγ(D) of analytic functions on the unit disk D with respect to a weighted composition conjugation Cμ, . Further, we discuss the structure of self-adjoint linear composition differentiation operators. Finally, the convexity of the Berezin range of composition operator on Hγ(D) are investigated. Additionally, geometrical interpretations have also been employed.
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