Directing functionals, method of

A special method for proving theorems about eigen function expansions of self-adjoint differential operators. In the special case of a second-order singular differential operator on the positive semi-axis, the corresponding theorem was first obtained by H. Weyl [1]. The general theorem for a differential operator of order was first proved by M.G. Krein [2], who used the method now known as the method of directing functionals. The result may be formulated as follows (see [3]). Let be a self-adjoint differential expression of order on an interval , let be the system of solutions of the equation

satisfying the initial conditions

where is a fixed point in and is the -th quasi-derivative of . Then, for any self-adjoint extension of the operator generated by , there exists a matrix-valued distribution function

such that, for any function ,

(1)

(2)

where the integrals in (1) and (2) are assumed to be convergent in the sense of the metrics in and , respectively. Under these assumptions, one has the following analogue of Parseval's equality:

The functionals , defined on functions in with compact support, are called the directing functionals of .

The generalization and further development of the method of directing functionals gave rise to the concept of rigged Hilbert spaces and generalized eigen element expansions (see [4], [5], [6]).

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