Spectral surfaces for operator pairs and Hadamard matrices of F type

Abstract

It is well-known that, in general, an appearance of an algebraic hypersurface of finite multiplicity in the projective joint spectrum of an operator tuple does not imply the existence of a finite-dimensional common invariant subspace.We prove that if for a pair of operators A,B the project time joint spectrum of A, B and AB contains the surface \[x,y,z,t]∈ C P3: xn+yn+(-1)n-1zn-tn=0\, the under some mild conditions this implies the existence of a subspace of dimension n invariant for both A and B. Itbis shown that the appearance of this surface has a relation to complex Hadamard matrices. We give a sufficient condition for a Hadamard matrix of F type to generate such pair A,B. For dimensions n=3,4,5 where there is a complete description of comp[lex Hadamard matrices, this condition proved to be necessary as well. Finally, we prove that a pair A,B such that the projective joint spectrum of A,B,AB and BA contains \ [x,y,z1,z2,t]∈ mathbb C P4: xn+yn+(-1)n-1(e2π I/nz1+z2)n-tn=0\, is generated by the Fourier matrix Fn.