| Popis: |
The purpose of this paper is to consider the application of the direct interaction approximation (DIA) developed by Kraichnan to generalized stochastic models in the turbulence problem. Previous developments (Kraichnan, Shivamoggi et al., Shivamoggi and Tuovila) were based on the Boltzmann-Gibbs prescription for the underlying entropy measure, which exhibits the extensivity property and is suited for ergodic systems. Here, we consider the introduction of an influence bias discriminating rare and frequent events explicitly, as behooves non-ergodic systems. More specifically, we consider the application of the DIA to a linear damped stochastic oscillator system using a Tsallis type autocorrelation model with an underlying non-extensive entropy measure, and describe the resulting stochastic process. We also deduce some apparently novel mathematical properties of the stochastic models associated with the present investigation -- the gamma distribution and the Tsallis non-extensive entropy. |
