H. N. Mhaskar
Published 2016-08-05Version 1
We develop a wavelet like representation of functions in $L^p(\mathbb{R})$ based on their Fourier--Hermite coefficients; i.e., we describe an expansion of such functions where the local behavior of the terms characterize completely the local smoothness of the target function. In the case of continuous functions, a similar expansion is given based on the values of the functions at arbitrary points on the real line. In the process, we give new proofs for the localization of certain kernels, as well as some very classical estimates such as the Markov--Bernstein inequality.
Comments: To appear in "Progress in Approximation Theory and Applicable Complex Analysis -- In the Memory of Q.I. Rahman", Editors: Narendra K. Govil, Mohammed A. Qazi, Ram Mohapatra and Gerhard Schmeisser, Springer Verlag, Berlin
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