The linear space of all proper rational functions with prescribed poles is considered. Given a set of points in the complex plane and the weights, we define the discrete inner product. In this paper we derive a method to compute the coefficients of a recurrence relation generating a set of orthonormal rational basis functions with respect to the discrete inner product. We will show that these coefficients can be computed by solving an inverse eigenvalue problem for a matrix having a specific structure. In the case where all the points lie on the real line or on the unit circle, the computational complexity is reduced by an order of magnitude.
Orthogonal rational functions and structured matrices
Nicola Mastronardi
2005
Abstract
The linear space of all proper rational functions with prescribed poles is considered. Given a set of points in the complex plane and the weights, we define the discrete inner product. In this paper we derive a method to compute the coefficients of a recurrence relation generating a set of orthonormal rational basis functions with respect to the discrete inner product. We will show that these coefficients can be computed by solving an inverse eigenvalue problem for a matrix having a specific structure. In the case where all the points lie on the real line or on the unit circle, the computational complexity is reduced by an order of magnitude.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
