AIMS Mathematics (Mar 2024)

Abelian and Tauberian results for the fractional Fourier cosine (sine) transform

  • Snježana Maksimović,
  • Sanja Atanasova,
  • Zoran D. Mitrović,
  • Salma Haque,
  • Nabil Mlaiki

DOI
https://doi.org/10.3934/math.2024597
Journal volume & issue
Vol. 9, no. 5
pp. 12225 – 12238

Abstract

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In this paper, we presented Tauberian type results that intricately link the quasi-asymptotic behavior of both even and odd distributions to the corresponding asymptotic properties of their fractional Fourier cosine and sine transforms. We also obtained a structural theorem of Abelian type for the quasi-asymptotic boundedness of even (resp. odd) distributions with respect to their fractional Fourier cosine transform (FrFCT) (resp. fractional Fourier sine transform (FrFST)). In both cases, we quantified the scaling asymptotic properties of distributions by asymptotic comparisons with Karamata regularly varying functions.

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