Interference of non-Hermiticity with Hermiticity at exceptional points

Abstract

A family of non-Hermitian but PT-symmetric 2J by 2J toy-model tridiagonal-matrix Hamiltonians H(2J)=H(2J)(t) with J=K+M=1,2,… and t<J2 is studied, for which a real but non-Hermitian 2K by 2K tridiagonal-submatrix component C(t) of the Hamiltonian is assumed coupled to its other two complex but Hermitian M by M tridiagonal-submatrix components A(t) and B(t). By construction, (i) all of the submatrices get decoupled at t=tM=M\,(2J-M) with M=1,2,…,J; (ii) at all of the parameters t=tM with M=J-K=0,1,…,J-1 the Hamiltonian ceases to be diagonalizable exhibiting the Kato's exceptional-point degeneracy of order 2K; (iv) the system's PT-symmetry gets spontaneously broken when t≤ tJ-1=J2-1.