From Minimum Entropy Production Principle To Minimum Information Loss With Elliptic Type Quasilinear PDEs

摘要

The Laplace equation does not contain any entropy production [27]. The entropy production can be illustrated with the Dirichlet Integral Principle and the quasilinear PDE of second order [28,27]. They can show the physical meaning too. The content of the quasilinear PDE leads to the probability density function of the process and the minimum principle of the entropy production [15,16,19,25]. The Maxwell's demon shows the connection between [18,26,21,20,22,23,24] thermodynamics and the theory of information. The negentropy principle of Brillouin [22] gives the important bridge between the thermodynamical problem of dissipation and the gain in information. The entropy compensation at an open stationary state shows the relation between negentropy principle [27] and minimum entropy principle and the connection to minimum information loss.