On random Fourier-Hermite transform associated with stochastic process

Abstract

Liu and Liu in 2007 introduced the Fourier - Hermite transform Σ anλnRn(t) which is a random Fourier - Hermite series with random variables λnR choosen randomly from the unit circle of C, where n(t) are Hermite functions and an are Fourier - Hermite coefficients of an L2(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 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 an are Fourier - Hermite coefficients of functions of suitable Lp spaces. The Fourier transform of the sum functions are found out which is possible in case of p = 2 only.