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arxiv: 1209.5072 · v4 · pith:ULGD6UGPnew · submitted 2012-09-23 · 🧮 math.FA · math.CV· math.RT

The Real and Complex Techniques in Harmonic Analysis from the Point of View of Covariant Transform

classification 🧮 math.FA math.CVmath.RT
keywords maximaloperatorfunctionscovariantintegraltransformaffineanalysis
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This note reviews complex and real techniques in harmonic analysis. We describe a common source of both approaches rooted in the covariant transform generated by the affine group. Keywords: wavelet, coherent state, covariant transform, reconstruction formula, the affine group, ax+b-group, square integrable representations, admissible vectors, Hardy space, fiducial operator, approximation of the identity, maximal functions, atom, nucleus, atomic decomposition, Cauchy integral, Poisson integral, Hardy--Littlewood maximal functions, grand maximal function, vertical maximal functions, non-tangential maximal functions, intertwining operator, Cauchy-Riemann operator, Laplace operator, singular integral operator, SIO, boundary behaviour, Carleson measure.

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