New Spectral Properties of Imaginary part of Gribov-Intissar Operator

Abstract

In 1998, we have given in ([14] Intissar, A., Analyse de Scattering d'un op\'erateur cubique de Heun dans l'espace de Bargmann, Comm.Math.Phys.199 (1998) 243-256) the boundary conditions at infinity for a description of all maximal dissipative extensions in Bargmann space of the minimal Heun's operator HI = z(ddz + z)ddz; z ∈ C. The characteristic functions of the dissipative extensions have computed and some completeness theorems have obtained for the system of generalized eigenvectors. In ([18] Intissar, A, Le Bellac, M. and Zerner, M., Properties of the Hamiltonian of Reggeon field theory, Phys. Lett. B 113 (1982) 487-489) the non self-adjoint operator λ HI where λ ∈ R is imaginary part of the Hamiltonian of Reggeon field theory: Hμ, λ = μ zddz + i λ z( ddz + z)ddz \,\, where \,\, (μ, λ) ∈ R2 \,\, and \,\, i2 = -1 The main purpose of the present work is to present some new spectral properties of right inverse K0, λ of Hλ = iλ HI (HλK0, λ = I) on negative imaginary axis and to study the deficiency numbers of the generalized Heun's operator Hp,m = zp( dmdzm + zm)dpdzp p, m = 1, 2, ..... In particular, here we find some conditions on the parameters p and m for that HIp,m to be completely indeterminate.It follows from these conditions that Hp,m is entire of the type minimal.

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