Resolvent formalism - Alchetron, The Free Social Encyclopedia

In mathematics, the resolvent formalism is a technique for applying concepts from complex analysis to the study of the spectrum of operators on Banach spaces and more general spaces.

The resolvent of A can be used to directly obtain information about the spectral decomposition of A. For example, suppose λ is an isolated eigenvalue in the spectrum of A. That is, suppose there exists a simple closed curve C λ in the complex plane that separates λ from the rest of the spectrum of A. Then the residue

− 1 2 π i ∮ C λ ( A − z I ) − 1 d z

defines a projection operator onto the λ eigenspace of A.

The Hille-Yosida theorem relates the resolvent through a Laplace transform to an integral over the one-parameter group of transformations generated by A. Thus, for example, if A is Hermitian, then U(t) = exp(itA) is a one-parameter group of unitary operators. The resolvent of iA can be expressed as their Laplace transform integral

R ( z ; i A ) = ∫ 0 ∞ e − z t U ( t ) d t .

History

The first major use of the resolvent operator as a series in A (cf. Liouville-Neumann series) was by Ivar Fredholm, in a landmark 1903 paper in Acta Mathematica that helped establish modern operator theory.

The name resolvent was given by David Hilbert.

Resolvent identity

For all z, w in ρ(A), the resolvent set of an operator A, we have that the first resolvent identity (also called Hilbert's identity) holds:

R ( z ; A ) − R ( w ; A ) = ( z − w ) R ( z ; A ) R ( w ; A ) .

(Note that Dunford and Schwartz, cited, define the resolvent as (zI −A)⁻¹, instead, so that the formula above differs in sign from theirs.)

The second resolvent identity is a generalization of the first resolvent identity, above, useful for comparing the resolvents of two distinct operators. Given operators A and B, both defined on the same linear space, and z in ρ(A)∩ρ(B) the following identity holds,

R ( z ; A ) − R ( z ; B ) = R ( z ; A ) ( B − A ) R ( z ; B ) .

Compact resolvent

When studying an unbounded operator A: H → H on a Hilbert space H, if there exists z ∈ ρ ( A ) such that R ( z ; A ) is a compact operator, we say that A has compact resolvent. The spectrum σ ( A ) of such A is a discrete subset of C . If furthermore A is self-adjoint, then σ ( A ) ⊂ R and there exists an orthonormal basis { v i } i ∈ N of eigenvectors of A with eigenvalues { λ i } i ∈ N respectively. Also, { λ i } has no finite accumulation point.

References

Resolvent formalism Wikipedia

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Contents

History

Resolvent identity

Compact resolvent

References