Вид документа : Статья из журнала Шифр издания : 53/K 79 Автор(ы) : Koverda V. P., Skokov V. N. Заглавие : Maximum entropy and stability of a random process with a 1 f power spectrum under deterministic action Место публикации : Physica A. - 2012. - Vol.391, №23. - С. 5850-5857 ББК : 53 Предметные рубрики: ФИЗИКА Ключевые слова (''Своб.индексиров.''): 1/f-noise--maximum entropy principle--stochastic equations Аннотация: The principle of maximum entropy has been used to analyze the stability of the resulting process observed during the interaction of a random process with a 1f spectrum and a deterministic action in lumped and distributed systems of nonlinear stochastic differential equations describing the coupled nonequilibrium phase transitions. Under the action of a harmonic force the stable resulting process is divided into two branches depending on the amplitude of the harmonic force. Under the action of exponential relaxation in a lumped system with an increase in the dumping coefficient the power spectrum of the resulting process becomes a spectrum of the Lorentz Доп.точки доступа: Skokov, V. N.; Скоков Вячеслав Николаевич; Коверда Владимир Петрович |