Generalized idempotents on the space of analytic functions with bounded derivatives

Abstract

Let X be a complex normed space. A map P: X → X is called idempotent if P2 = P. A collection C = \P1, P2\ of nonzero distinct orthogonal (P1P2 = P2P1 = 0) idempotent maps on X is said to be a family of generalized bi-circular idempotents if there exist distinct unit modulus complex numbers λ1, λ2 such that P1 + P2 = I (identity operator on X) and λ1P1 + λ2P2 is a surjective isometry on X. This generalizes the notion of generalized bi-circular projections on Banach spaces introduced by Fošner, Ilišević and Li MDC to nonlinear maps. In this paper, we describe the structure of generalized bi-circular idempotents over the space of analytic functions on the open unit disk with bounded derivatives.

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