Langevin Equation with the Deterministic Algebraically Correlated Noise

The e ects of temporally correlated noise on the conservation growth are studied via the Flory-type approach introduced by Hentschel and Family (Phys. Rev. Lett. 66, (1991Lett. 66, ( ) 1982)). This phenomenological equation contains the Kardar-Parisi-Zhang, Sun-Guo-Grant, and molecular-beam epitaxy

This is an extension of an earlier paper by the second author. In the previous work, an algorithm was derived for the moments of an homogeneous equation with noise similar to the white noise, but has small, finite correlafion time. In the present work this algorithm is extended for an inhomogeneous

We will investigate solutions to the Darmon-Granville equation with Gaussian integer exponents.

The general form of the quantum master equation (the Lindblad-Kossakowski equation) for linear and nonlinear systems with linear dissipation is considered. This equation and the quantum regression theorem are used for finding two-time commutators and symmetrized moments of the Langevin forces. The o