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arxiv: 2108.00157 · v2 · pith:E4XY67WSnew · submitted 2021-07-31 · 🧮 math.CV

Adaptive Fourier decomposition of slice regular functions

classification 🧮 math.CV
keywords slicedecompositionadaptivefouriermathcalprocessabovebackward
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In the slice Hardy space over the unit ball of quaternions, we introduce the slice hyperbolic backward shift operator $\mathcal S_a$ with the decomposition process $$f=e_a\langle f, e_a\rangle+B_{a}*\mathcal S_a f,$$ where $e_a$ denotes the slice normalized Szeg\"o kernel and $ B_a $ the slice Blaschke factor. Iterating the above decomposition process, a corresponding maximal selection principle gives rise to the slice adaptive Fourier decomposition. This leads to a adaptive slice Takenaka-Malmquist orthonormal system.

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