The Spectral Problem and Algebras Associated with Extended Dynkin Graphs

Abstract

The Spectral Problem is to describe possible spectra σ (Aj) for an irreducible n-tuple of Hermitian operators s.t. A1+...+An is a scalar operator. In case when mj= | σ (Aj)| are finite and a rooted tree Tm1,..., mn with n branches of lengths m1, ..., mn is a Dynkin graph the explicit answer to the Spectral Problem was given recently by S. A. Kruglyak, S. V. Popovych, and Yu. S. Samolenko. In present work the solution of the Spectral Problem for all star-shaped simply laced extended Dynkin graphs, i.e. when (m1, ..., mn) ∈ \(2,2,2,2), (3,3,3), (4,4,2), (6,3,2)\ is presented.