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Left $θ$-derivations on weighted convolution algebras

Published 24 Mar 2024 in math.FA | (2403.16036v1)

Abstract: Let $\theta$ be a homomorphism on $L_0\infty({\Bbb R}+, \omega)*$. In this paper, we study left $\theta$-derivations on $L_0\infty({\Bbb R}+, \omega)*$. We show that every left $\theta$-derivation on $L_0\infty({\Bbb R}+, \omega)*$ is always a $\theta$-derivation, and if $\theta$ is isomorphism, then $L_0\infty({\Bbb R}+, \omega)*$ has no non-zero left $\theta$-derivation. We also investigate automatic continuity, Singer-Wermer's conjecture and Posner's first theorem for left $\theta-$derivations on $L_0\infty({\Bbb R}+, \omega)*$.

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