TY  - JOUR
N2  - The classical Kramer sampling theorem, which provides a method for obtaining orthogonal sampling formulas, can be formulated in a more general nonorthogonal setting. In this setting, a challenging problem is to characterize the situations when the obtained nonorthogonal sampling formulas can be expressed as Lagrange-type interpolation series. In this article a necessary and sufficient condition is given in terms of the zero removing property. Roughly speaking, this property concerns the stability of the sampled functions on removing a finite number of their zeros.
PB  - Taylor & Francis, Ltd.
KW  - Analytic Kramer kernels
KW  -  Lagrange-type interpolation series
KW  -  Zero-removing property
A1  - Fernàndez-Moncada, P.E.
A1  - García, A.G.
A1  - Hernández Medina, Miguel Ángel
SN  - 0163-0563
AV  - public
Y1  - 2011///
JF  - Numerical Functional Analysis And Optimization
SP  - 858
EP  - 876
UR  - http://www.tandfonline.com/doi/abs/10.1080/01630563.2011.587076
IS  - 8
VL  - 32
ID  - upm11506
TI  - The Zero-Removing Property and Lagrange-Type Interpolation Series
ER  -