Fourier transforms with respect to monomial representations

We present a fast algorithm to compute the partial transformation of a function represented in an adaptive pseudo-spectral multi-wavelet representation to a partial Fourier representation. Such fast transformations are useful in many contexts in physics and engineering, where changes of representati

We prove a Mehler representation for Jacobi functions t with respect to the dual variable . We exploit this representation to define a pair of dual integral transforms and its transposed t . We define two second order difference . operators P and Q such that t is an eigenfunction of P with respect

Fourier series with respect to wavelet orthonormal bases in L 2 ([0, 1] m ) for a wide class of multiresolution analyses are studied. Convergence at Lebesgue and strong Lebesgue points is investigated and sufficient conditions for a.e. convergence are found. In addition, similar conditions for a.e.