On the s-meromorphic OD operators

Abstract

We consider linear spectral-meromorphic (s-meromorphic) OD operators at the real axis such that all local solutions to the eigenvalue problems are meromorphic for all λ. By definition, rank one algebro-geometrical operator L admit an OD operator A such that [L,A]=0 and rank of this commuting pair is equal to one. All of them are s-meromorphic. In particular, second order ``singular soliton'' operators satisfy to this condition. Operator L+ formally adjoint to s-meromorphic operator L is also s-meromorphic. For singular eigenfunctions of operators L,L+ following scalar product <f,g>=∫R fgdx is well-defined such that <Lf,g>=<f,L+g> avoiding isolated singular points. For the case L=L+ this formula defines indefinite inner product on the spaces of singular functions f,g∈ FL associated with operator L. They are C∞ outside of singularities and have isolated singularities of the same type as eigenfunctions Lf=λ f. Every s-meromorphic operator can be approximated by algebro-geometric rank one operators in any finite interval