Integral curvature and similarity of Cowen-Douglas operators (Q2220164)

Let \(\Omega\) be a domain in the complex plane, \(\mathcal{H}\) be a Hilbert space. Let \(B_n(\Omega)\) be the Cowen-Douglas class of index \(n\in\mathbb N\) which is by definition the set bounded linear operators \(T\) on \(\mathcal{H}\) such that for \(\omega\in \Omega\), \(T-\omega\) is an onto map and the dimension of \(\ker(T-\omega)\) is equal to \(n\), besides \(\operatorname{span}\{\ker(T-\omega),\,\omega\in\Omega\}=\mathcal{H}\). Then, the purpose of the authors is to provide a similarity classification for \(B_1(\Omega)\) through the integral curvature which is defined by the integral on \(B_\delta\) (a ball of radius \(\delta\)) of the product of the coefficient of a suitable \((1,1)\)-form by a Green function on \(B_\delta\). For the entire collection see [Zbl 1455.47001].