Introduction to Mathematical Physics/Statistical physics/Introduction

Statistical physics goal is to describe matter's properties at macroscopic scale from a microscopic description (atoms, molecules, etc\dots). The great number of particles constituting a macroscopic system justifies a probabilistic description of the system. Quantum mechanics (see chapter ---chapmq---) allows to describe part of systems made by a large number of particles: Schr\"odinger equation provides the various accessible states as well as their associated energy. Statistical physics allows to evaluate occupation probabilities ${\displaystyle P_{l}}$ of a quantum state ${\displaystyle l}$. It introduces fundamental concepts as temperature, heat\dots

Obtaining of probability ${\displaystyle P_{l}}$ is done using the statistical physics principle that states that physical systems tend to go to a state of ``maximum disorder [ph:physt:Reif64], [ph:physt:Diu89]. A disorder measure is given by the statistical entropy^[1]\index{entropy}

${\displaystyle S=-k_{B}\sum P_{l}\ln P_{l}}$

The statistical physics principle can be enounced as:

1. ↑ This formula is analog to the information entropy chosen by Shannon in his information theory [ph:physt:Shannon49].