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In this paper, we discuss the decomposability of weighted composition operator $uC_\phi$ on $L^p(X)(1\leq p<\infty)$ of a $\sigma$-finite atomic measure space $(X,\mathcal{S},\mu)$ with the assumption that $u\in L^\infty(X)$ and $|u|$ has positive ess inf. We prove that if the analytic core of $uC_\phi$ is zero and $uC_\phi$ is not quasinilpotent, then it is not decomposable. We also show that if $\phi$ is either injective almost everywhere or surjective almost everywhere but not both, then $uC_\phi$ is not decomposable. Finally, we give a necessary condition for decomposability of $uC_\phi$. |
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