Title :
Einstein-Smoluchowsky equation handled by complex fractional moments
Author :
Alotta, Gioacchino ; Di Paola, Mario
Author_Institution :
Dipt. di Ing. Civile, Ambientale, Aerospaziale, dei Mater., Univ. degli Studi di Palermo, Palermo, Italy
Abstract :
In this paper the response of a non linear half oscillator driven by α-stable white noise in terms of probability density function (PDF) is investigated. The evolution of the PDF of such a system is ruled by the so called Einstein-Smoluchowsky equation involving, in the diffusive term, the Riesz fractional derivative. The solution is obtained by the use of complex fractional moments of the PDF, calculated with the aid of Mellin transform operator. It is shown that solution can be found for various values of stability index α and for any nonlinear function of the drift term in the stochastic differential equation.
Keywords :
differential equations; diffusion; mathematical operators; method of moments; oscillators; statistical distributions; stochastic processes; transforms; Einstein-Smoluchowsky equation; Mellin transform operator; Riesz fractional derivative; alpha-stable white noise; complex fractional moments; nonlinear function; nonlinear half oscillator; probability density function; stability index; stochastic differential equation; Differential equations; Equations; Mathematical model; Probability density function; Strips; Transforms; White noise; α-stable white noise; Complex fractional moments; Einstein-Smoluchowsky equation; Nonlinear systems;
Conference_Titel :
Fractional Differentiation and Its Applications (ICFDA), 2014 International Conference on
Conference_Location :
Catania
DOI :
10.1109/ICFDA.2014.6967405
