Left θ-derivations on weighted convolution algebras
Abstract
Let θ be a homomorphism on L0∞( R+, ω)*. In this paper, we study left θ-derivations on L0∞( R+, ω)*. We show that every left θ-derivation on L0∞( R+, ω)* is always a θ-derivation, and if θ is isomorphism, then L0∞( R+, ω)* has no non-zero left θ-derivation. We also investigate automatic continuity, Singer-Wermer's conjecture and Posner's first theorem for left θ-derivations on L0∞( R+, ω)*.
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