Inverse of Infinite Hankel Moment Matrices
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Inverse of Infinite Hankel Moment Matrices. / Berg, Christian; Szwarc, Ryszard.
I: Symmetry, Integrability and Geometry: Methods and Applications, Bind 14, 109, 2018.Publikation: Bidrag til tidsskrift › Tidsskriftartikel › Forskning › fagfællebedømt
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TY - JOUR
T1 - Inverse of Infinite Hankel Moment Matrices
AU - Berg, Christian
AU - Szwarc, Ryszard
PY - 2018
Y1 - 2018
N2 - Let (S-n)(n >= 0) denote an indeterminate Hamburger moment sequence and let H = {s(m+n)} be the corresponding positive definite Hankel matrix. We consider the question if there exists an infinite symmetric matrix A = {a(j, k)} which is an inverse of H in the sense that the matrix product AN is defined by absolutely convergent series and AN equals the identity matrix I, a property called ( aci). A candidate for A is the coefficient matrix of the reproducing kernel of the moment problem, considered as an entire function of two complex variables. We say that the moment problem has property (aci), if (aci) holds for this matrix A. We show that this is true for many classical indeterminate moment problems but not for the symmetrized version of a cubic birth-and-death process studied by Valent and co-authors. We consider mainly symmetric indeterminate moment problems and give a number of sufficient conditions for (aci) to hold in terms of the recurrence coefficients for the orthonormal polynomials. A sufficient condition is a rapid increase of the recurrence coefficients in the sense that the quotient between consecutive terms is uniformly bounded by a constant strictly smaller than one. We also give a simple example, where (aci) holds, but an inverse matrix of H is highly non-unique.
AB - Let (S-n)(n >= 0) denote an indeterminate Hamburger moment sequence and let H = {s(m+n)} be the corresponding positive definite Hankel matrix. We consider the question if there exists an infinite symmetric matrix A = {a(j, k)} which is an inverse of H in the sense that the matrix product AN is defined by absolutely convergent series and AN equals the identity matrix I, a property called ( aci). A candidate for A is the coefficient matrix of the reproducing kernel of the moment problem, considered as an entire function of two complex variables. We say that the moment problem has property (aci), if (aci) holds for this matrix A. We show that this is true for many classical indeterminate moment problems but not for the symmetrized version of a cubic birth-and-death process studied by Valent and co-authors. We consider mainly symmetric indeterminate moment problems and give a number of sufficient conditions for (aci) to hold in terms of the recurrence coefficients for the orthonormal polynomials. A sufficient condition is a rapid increase of the recurrence coefficients in the sense that the quotient between consecutive terms is uniformly bounded by a constant strictly smaller than one. We also give a simple example, where (aci) holds, but an inverse matrix of H is highly non-unique.
KW - indeterminate moment problems
KW - Jacobi matrices
KW - Hankel matrices
KW - orthogonal polynomials
U2 - 10.3842/SIGMA.2018.109
DO - 10.3842/SIGMA.2018.109
M3 - Journal article
VL - 14
JO - Symmetry, Integrability and Geometry: Methods and Applications (SIGMA)
JF - Symmetry, Integrability and Geometry: Methods and Applications (SIGMA)
SN - 1815-0659
M1 - 109
ER -
ID: 209169960