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Affine AP-frames and Stationary Random Processes

Published 20 Jul 2025 in math.PR and math.FA | (2507.15090v1)

Abstract: It is known that, in general, an affine or Gabor AP-frame is an $L2(\mathbb{R})$-frame and conversely. In part as a consequence of the Ergodic Theorem, we prove a necessary and sufficient condition for an affine (wavelet) system $\mathcal{A}={a{j/2} \psi_{j,k}(t):=a{-j/2} \psi (a{-j} t -k) :j\in\mathbb{Z}, k\in\mathbb{K}:=b\mathbb{Z}}$ to be an affine AP-Frame in terms of Gaussian stationary random processes expanding in this way what we have done recently for Gabor systems. Likewise, we study a connection between the decay of the associated stationary sequences ${\langle{X,\psi_{j,k}}\rangle : k\in\mathbb{K}}$ for each $j\in\mathbb{Z}$, and a smoothness condition on a Gaussian stationary random process $X=(X(t))_{t\in\mathbb{R}}$.

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