Équation de Sackur-Tetrode

The Sackur–Tetrode equation is an expression for the entropy of a monatomic ideal gas. It is named for Hugo Martin Tetrode (1895–1931) and Otto Sackur (1880–1914), who developed it independently as a solution of Boltzmann's gas statistics and entropy equations, at about the same time in 1912. The Sackur–Tetrode equation expresses the entropy of a monatomic ideal gas in terms of its thermodynamic state—specifically, its volume , internal energy , and the number of particles : where is the Boltzmann constant, is the mass of a gas particle and is the Planck constant. The equation can also be expressed in terms of the thermal wavelength : For a derivation of the Sackur–Tetrode equation, see the Gibbs paradox. For the constraints placed upon the entropy of an ideal gas by thermodynamics alone, see the ideal gas article. The above expressions assume that the gas is in the classical regime and is described by Maxwell–Boltzmann statistics (with "correct Boltzmann counting"). From the definition of the thermal wavelength, this means the Sackur–Tetrode equation is valid only when The entropy predicted by the Sackur–Tetrode equation approaches negative infinity as the temperature approaches zero. The Sackur–Tetrode constant, written S0/R, is equal to S/kBN evaluated at a temperature of T = 1 kelvin, at standard pressure (100 kPa or 101.325 kPa, to be specified), for one mole of an ideal gas composed of particles of mass equal to the atomic mass constant (). Its 2018 CODATA recommended value is: S0/R = -1.15170753706 for po = 100 kPa S0/R = -1.16487052358 for po = 101.325 kPa. In addition to the thermodynamic perspective of entropy, the tools of information theory can be used to provide an information perspective of entropy. In particular, it is possible to derive the Sackur–Tetrode equation in information-theoretic terms. The overall entropy is represented as the sum of four individual entropies, i.e., four distinct sources of missing information. These are positional uncertainty, momenta uncertainty, the quantum mechanical uncertainty principle, and the indistinguishability of the particles.