Abstract
For an orthonormal basis (ONB) \(\) of \(\) we define classes \(\) of functions according to the order of decay of the Fourier coefficients with respect to the considered ONB \(\). The rate is expressed in the real parameter α. We investigate the following problem: What is the order of decay, if any, when we consider \(\) with respect to another ONB \(\)? If the function is expressable as an absolutely convergent Fourier series with respect to \(\), we give bounds for the new order of decay, which we call \(\). Special attention is given to digital orthonormal bases (dONBs) of which the Walsh and Haar systems are examples treated in the present paper. Bounding intervals and in several cases explicit values for \(\) are given for the case of dONBs. An application to quasi-Monte Carlo numerical integration is mentioned.
Published Version
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