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TSP
2010
2010
Quasi-interpolation by means of filter-banks
We consider the problem of approximating a regular function f(t) from its samples, f(nT), taken in a uniform grid. Quasi-interpolation schemes approximate f(t) with a dilated version of a linear combination of shifted versions of a kernel (t), specifically fT approx(t) = af [n](t/T - n), in a way that the polynomials of degree at most L - 1 are recovered exactly. These approximation schemes give order L, i.e., the error is O(TL ) where T is the sampling period. Recently, quasiinterpolation schemes using a discrete prefiltering of the samples f(nT) to obtain the coefficients af [n], have been proposed. They provide tight approximation with a low computational cost. In this work, we generalize considering rational filter banks to prefilter the samples, instead of a simple filter. This generalization provides a greater flexibility in the design of the approximation scheme. The upsampling and downsampling ratio r of the rational filter bank, plays a significant role. When r = 1 the scheme ...
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| Added | 22 May 2011 |
| Updated | 22 May 2011 |
| Type | Journal |
| Year | 2010 |
| Where | TSP |
| Authors | Gerardo Pérez-Villalón |
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