Operator-differential expressions: regularization and completeness of the root functions

Abstract

We consider an operator-differential expression of the form y=dmdxm(By(n)+Cy), 0<x<1, where B is a linear bounded invertible operator, while C is some finite-dimensional linear operator relatively bounded to the operator of n-fold differentiation. To such a form, we can reduce, in particular, various singular differential expressions with the coefficients in negative Sobolev spaces, which creates an alternative to their regularization. In the case when B is an integral Volterra operator of the second kind with a continuous kernel vanishing at the diagonal, we establish completeness of the root functions of an operator generated by the expression y and irregular semi-separated boundary conditions.