Introduction to Mathematical Physics/Statistical physics/Entropy maximalization

In general, a system is described by two types of variables. External variables $y^{i}$ whose values are fixed at $y_{j}$ by the exterior and internal variables $X^{i}$ that are free to fluctuate, only their mean being fixed to $\bar{X^{i}}$ . Problem to solve is thus the following: Template:IMP/prob Entropy functional maximization is done using Lagrange multipliers technique. Result is: Template:IMP/eq where function $Z$ , called partition function, \index{partition function} is defined by: Template:IMP/eq Numbers $λ_{i}$ are the Lagrange multipliers of the maximization problem considered. Template:IMP/exmp Template:IMP/exmp Relations on means^[1] that: Template:IMP/eq This relation that binds $L$ to $S$ is called a {\bf Legendre transform}.\index{Legendre transformation} $L$ is function of the $y^{i}$ 's and $λ_{j}$ 's, $S$ is a function of the $y^{i}$ 's and $\bar{X^{j}}$ 's.

↑ They are used to determine Lagrange multipliers $λ_{i}$ from associated means $\bar{X_{i}}$ } can be written as: Template:IMP/eq It is useful to define a function $L$ by: Template:IMP/eq It can be shown\footnote{ By definition Template:IMP/eq thus Template:IMP/eq Template:IMP/eq

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[1] They are used to determine Lagrange multipliers $λ_{i}$ from associated means $\bar{X_{i}}$ } can be written as: Template:IMP/eq It is useful to define a function $L$ by: Template:IMP/eq It can be shown\footnote{ By definition Template:IMP/eq thus Template:IMP/eq Template:IMP/eq

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Introduction to Mathematical Physics/Statistical physics/Entropy maximalization

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