Locally quasi-nilpotent elementary operators
Abstract
Let A be a unital dense algebra of linear mappings on a complex vector space X. Let φ=Σi=1n Mai,bi be a locally quasi-nilpotent elementary operator of length n on A. We show that, if \a1,…,an\ is locally linearly independent, then the local dimension of V(φ)=\biaj: 1 ≤ i,j ≤ n\ is at most n(n-1)2. If V(φ)=n(n-1)2 , then there exists a representation of φ as φ=Σi=1n Mui,vi with viuj=0 for i≥ j. Moreover, we give a complete characterization of locally quasi-nilpotent elementary operators of length 3.
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