Affine synthesis and coefficient norms for Lebesgue, Hardy and Sobolev spaces

Abstract

The affine synthesis operator is shown to map the mixed-norm sequence space 1(p) surjectively onto Lp(), 1 ≤ p < ∞, assuming the Fourier transform of the synthesizer does not vanish at the origin and the synthesizer has some decay near infinity. Hence the standard norm on f ∈ Lp() is equivalent to the minimal coefficient norm of realizations of f in terms of the affine system. We further show the synthesis operator maps a discrete Hardy space onto H1(), which yields a norm equivalence for Hardy space involving convolution with a discrete Riesz kernel sequence. Coefficient norm equivalences are established also for Sobolev spaces, by applying difference operators to the coefficient sequences.

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