Denjoy–Carleman Differentiable Perturbation of Polynomials and Unbounded Operators

## Abstract We study the regularity of the roots of complex monic polynomials __P__ (__t__) of fixed degree depending smoothly on a real parameter __t__. We prove that each continuous parameterization of the roots of a generic __C__^∞^ curve __P__ (__t__) (which always exists) is locally absolutely

This paper deals with one-parameter linear perturbations of a family of polynomials {Pn(x)}~0 with deg[P.(x)] = n of the form P~'(x) = Pn(x) +/~Q.(x), where p is a real parameter and {Qn(x)}~ 0 are polynomials with deg[Qn(x)] ~< n. Let the polynomials {Pn(x)}~0 be eigenfunctions of a linear differen

## Abstract A criterion for the Fredholmness of singular integral operators with Carleman shift in __L~P~(Γ__) is obtained, where Γ is either the unit circle or the real line. The approach allows to consider unbounded coefficients in a class related to that of quasicontinuous functions. Application

In this paper we consider the polynomials {P~'V(x)}~0, orthogonal with respect to a certain symmetric bilinear form of Sobolev type. These polynomials are the result of two linear perturbations to the orthogonal polynomials {Pn(x)}~0, eigenfunctions of a linear differential or difference operator L.