Add to ORKGA class of reproducing kernel spaces with reproducing kernels of the form Kω(λ) = {J − Θ(λ)JΘ(ω)*}/ρω(λ) with pω(λ) = a(λ)a(ω)* is characterized in terms of invariance under a pair of generalized shift operators and a structural identity. This incorporates a characterization of de Branges for the line case and a later analogue due to Ball for the circle case, as well as many other possibilities, by specializing the choice of ρ. These results also permit the extension of some earlier characterizations by the authors of finite dimensional spaces with reproducing kernels of the form given above to the infinite dimensional case. The non-Hermitian case is also considered
We solve Gleason\u27s problem in the reproducing kernel Hilbert spaces with reproducing kernels 1/(1...
We use methods from the Fock space and Segal–Bargmann theories to prove several results on the Gauss...
Finite dimensional indefinite inner product spaces of vector valued rational functions which are (1)...
A new class of finite dimensional reproducing kernel spaces of m × 1 vector valued analytic function...
We illustrate a relationship between reproducing kernel spaces and orthogonal polynomials via a gene...
The one-to-one correspondence between positive functions and reproducing kernel Hilbert spaces was e...
We use reproducing kernel methods to study various rigidity problems. The methods and setting allow ...
By a result of L. Schwartz, a symmetric function is the reproducing kernel of a reproducing kernel K...
Letsbe a Schur function, that is a function analytic and contractive in the unit disk D. Then the fu...
We consider bounded linear operators acting on the ℓ2 space indexed by the nodes of a homogeneous tr...
AbstractA class of reproducing kernel spaces with reproducing kernels of the form Kω(λ) = {J − Θ(λ)J...
A new set of realization formulas is derived for a class of matrix-valued functions W(λ). These incl...
We study a reproducing kernel Hilbert space of functions defined on the positive integers and associ...
We solve a boundary interpolation problem in the reproducing kernel Hilbert space of functions analy...
Using reproducing kernel Hilbert spaces methods we develop a Schur-type algorithm for a subclass of ...
We solve Gleason\u27s problem in the reproducing kernel Hilbert spaces with reproducing kernels 1/(1...
We use methods from the Fock space and Segal–Bargmann theories to prove several results on the Gauss...
Finite dimensional indefinite inner product spaces of vector valued rational functions which are (1)...
A new class of finite dimensional reproducing kernel spaces of m × 1 vector valued analytic function...
We illustrate a relationship between reproducing kernel spaces and orthogonal polynomials via a gene...
The one-to-one correspondence between positive functions and reproducing kernel Hilbert spaces was e...
We use reproducing kernel methods to study various rigidity problems. The methods and setting allow ...
By a result of L. Schwartz, a symmetric function is the reproducing kernel of a reproducing kernel K...
Letsbe a Schur function, that is a function analytic and contractive in the unit disk D. Then the fu...
We consider bounded linear operators acting on the ℓ2 space indexed by the nodes of a homogeneous tr...
AbstractA class of reproducing kernel spaces with reproducing kernels of the form Kω(λ) = {J − Θ(λ)J...
A new set of realization formulas is derived for a class of matrix-valued functions W(λ). These incl...
We study a reproducing kernel Hilbert space of functions defined on the positive integers and associ...
We solve a boundary interpolation problem in the reproducing kernel Hilbert space of functions analy...
Using reproducing kernel Hilbert spaces methods we develop a Schur-type algorithm for a subclass of ...
We solve Gleason\u27s problem in the reproducing kernel Hilbert spaces with reproducing kernels 1/(1...
We use methods from the Fock space and Segal–Bargmann theories to prove several results on the Gauss...
Finite dimensional indefinite inner product spaces of vector valued rational functions which are (1)...