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The quantum langevin forces for dynamical systems with linear dissipation and the Lindblad equation

✍ Scribed by Rouslan L. Stratonovich

Publisher
Elsevier Science
Year
1997
Tongue
English
Weight
651 KB
Volume
236
Category
Article
ISSN
0378-4371

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✦ Synopsis

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 obtained properties of the forces are unusual for physical systems interacting with the environment systems.

In the last section the random Hamiltonian and the corresponding stochastic equations are considered.

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## Abstract In this paper we consider a quadrature method for the solution of the double‐layer potential equation corresponding to Laplace's equation in a polygonal domain. We prove the stability for our method in case of special triangulations over the boundary of the polygon. For the solution of