Spectral analysis near regular point of reducibility and representations of Coxeter groups (Q2148584)

For operators \(A_1, \dots , A_n\) acting on a Hilbert space \(H\), their projective spectrum is defined as the set \([x_1 : \dots : x_n] \in \mathbb{CP}^{n-1}\) such that \(x_1A_1 + \dots +x_nA_n\) is not invertible in \(H\). The following problem is studied in the present paper: given that an algebraic hypersurface in \(\mathbb{CP}^{n}\) has a determinantal representation, what does the geometry of the surface tell us about relations between operators? A~rigidity type theorem for representations of Coxeter groups is obtained as an application.