前辅文
CHAPTER I GENERAL NOTIONS THE PRINCIPLE OF CONSERVATION OF EXTENSION-IN-PHASE
CHAPTER II APPLICATION OF THE PRINCIPLE OF CONSERVATION OF EXTENSION-IN-PHASE TO THE THEORY OF ERRORS
CHAPTER III APPLICATION OF THE PRINCIPLE OF CONSERVATION OF EXTENSION-IN-PHASE TO THE INTEGRATION OF THE DIFFERENTIAL EQUATIONS OF MOTION
CHAPTER IV ON THE DISTRIBUTION-IN-PHASE CALLED CANONICAL, IN WHICH THE INDEX OF PROBABILITY IS A LINEAR FUNCTION OF THE ENERGY
CHAPTER V AVERAGE VALUES IN A CANONICAL ENSEMBLE OF SYSTEMS
CHAPTER VI EXTENSION-IN-CONFIGURATION AND EXTENSION-IN-VELOCITY
CHAPTER VII FARTHER DISCUSSION OF AVERAGES IN A CANONICAL ENSEMBLE OF SYSTEMS
CHAPTER VIII ON CERTAIN IMPORTANT FUNCTIONS OF THE ENERGIES OF A SYSTEM
CHAPTER IX THE FUNCTION ? AND THE CANONICAL DISTRIBUTION
CHAPTER X ON A DISTRIBUTION IN PHASE CALLED MICROCANONICAL IN WHICH ALL THE SYSTEMS HAVE THE SAME ENERGY
CHAPTER XI MAXIMUM AND MINIMUM PROPERTIES OF VARIOUS DISTRIBUTIONS IN PHASE
CHAPTER XII ON THE MOTION OF SYSTEMS AND ENSEMBLES OF SYSTEMS THROUGH LONG PERIODS OF TIME
CHAPTER XIII EFFECT OF VARIOUS PROCESSES ON AN ENSEMBLE OF SYSTEMS
CHAPTER XIV DISCUSSION OF THERMODYNAMIC ANALOGIES
CHAPTER XV SYSTEMS COMPOSED OF MOLECULES
