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Abstract:We study the angle between the null space and the range of elementary operators of length one or two acting on $\mathcal{B}(\mathscr{X})$, the Banach algebra of all bounded linear operators on a complex Banach space $\mathscr{X}$. For the multiplication operator $\mu_{A,B}(X) = AXB$, we characterize positivity of this angle in terms of the corresponding angles for $A$ and $B^*$. For elementary operators of length two $\Delta_{\boldsymbol{A},\boldsymbol{B}} = \mu_{A_1,B_1} - \mu_{A_2,B_2}$, we establish conditions under which the angle is positive, and the ascent of $\Delta_{\boldsymbol{A},\boldsymbol{B}}$ equals one. Finally, for a generalized derivation $\delta_{A,B}$ and an injective holomorphic function $f$ on a neighborhood of $\sigma(A)\cup\sigma(B)$, we show that the angle between the null space and the range of $\delta_{f(A),f(B)}$ is positive whenever the angle between the null space and the range of $\delta_{A,B}$ is positive.

Submission history

From: Hranislav Stanković [view email]
[v1] Wed, 17 Jun 2026 11:05:24 UTC (15 KB)