We present a rigorous logical scheme for the definition of entropy, based on operative definitions of all the concepts employed, with all assumptions declared explicitly. Our treatment is an equivalent variation of the general definition of entropy given in E.P. Gyftopoulos and G.P. Beretta, Thermodynamics. Foundations and Applications, Dover, Mineola, 2005. However, here we outline the minimal set of definitions and assumptions required to construct the same definition by the most direct and essential sequence of logical steps.
E. Zanchini, G.P. Beretta (2008). Rigorous Axiomatic Definition of Entropy Valid Also for Non-Equilibrium States. New York : American Institute Of Physics [10.1063/1.2979048].
Rigorous Axiomatic Definition of Entropy Valid Also for Non-Equilibrium States
ZANCHINI, ENZO;
2008
Abstract
We present a rigorous logical scheme for the definition of entropy, based on operative definitions of all the concepts employed, with all assumptions declared explicitly. Our treatment is an equivalent variation of the general definition of entropy given in E.P. Gyftopoulos and G.P. Beretta, Thermodynamics. Foundations and Applications, Dover, Mineola, 2005. However, here we outline the minimal set of definitions and assumptions required to construct the same definition by the most direct and essential sequence of logical steps.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
