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On random Fourier-Hermite transform associated with stochastic process

Probability 2022-12-21 v4 Classical Analysis and ODEs

Abstract

Liu and Liu in 2007 introduced the Fourier - Hermite transform anλnRψn(t)\sum a_{n}\lambda_{n}^{R}\psi_{n}(t) which is a random Fourier - Hermite series with random variables λnR\lambda_{n}^{R} choosen randomly from the unit circle of C\mathbb{C}, where ψn(t)\psi_{n}(t) are Hermite functions and ana_{n} are Fourier - Hermite coefficients of an L2(R)L^{2}(\mathbb{R}) function. They used it in image encryption and decryption and expected its application in general signal and image processing. This motivated us to investigate more on random Fourier - Hermite transform by replacing the random variables λnR\lambda_{n}^{R} by some other random variables. It leads to address two problems. First to focus on convergence of random Fourier - Hermite series. Secondly to investigate on finding Fourier transform of the sum function of these random Fourier - Hermite series. The random variables those has been choosen are Fourier - Hermite coefficients of stochastic process. They are independent if associated with Wiener process and dependent if associated with symmetric stable process. The scalars ana_{n} are Fourier - Hermite coefficients of functions of suitable LpL^{p} spaces. The Fourier transform of the sum functions are found out which is possible in case of p=2p = 2 only.

Cite

@article{arxiv.1909.09152,
  title  = {On random Fourier-Hermite transform associated with stochastic process},
  author = {Bharatee Mangaraj and Sabita Sahoo},
  journal= {arXiv preprint arXiv:1909.09152},
  year   = {2022}
}

Comments

14 Pages

R2 v1 2026-06-23T11:20:35.673Z