Ap-frames and stationary random processes
Abstract. It is known that, in general, an AP-frame is an L 2 (R)-frame and conversely. Here, in part as a consequence of the Ergodic Theorem, we prove a necessary and su cient condition for a Gabor system {g(t − k)e il(t−k) , l ∈ L = ω0Z, k ∈ K = t0Z} to be an L 2 (R)- Frame in terms of Ga...
Guardado en:
| Autores principales: | , |
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| Formato: | Artículo |
| Lenguaje: | Inglés |
| Publicado: |
Elsevier
2022
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| Materias: | |
| Acceso en línea: | https://repositorio.uca.edu.ar/handle/123456789/15166 |
| Aporte de: |
| Sumario: | Abstract. It is known that, in general, an AP-frame is an L
2
(R)-frame and conversely.
Here, in part as a consequence of the Ergodic Theorem, we prove a necessary and su cient
condition for a Gabor system {g(t − k)e
il(t−k)
, l ∈ L = ω0Z, k ∈ K = t0Z} to be an L
2
(R)-
Frame in terms of Gaussian stationary random processes. In addition, if X = (X(t))t∈R
is a wide sense stationary random process, we study density conditions for the associated
stationary sequences {hX, gk,li, l ∈ L, k ∈ K}. |
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