Irreversible thermodynamics, quantum mechanics and intrinsic time scales

摘要: Abstract It is often assumed that phenomenology a rather weak tool for the analysis of natural systems because it lacks generality. However, in series papers we have developed phenomenological calculus based upon general theory measurement and mathematical representations (or, equivalently, system response as bilinear form) which has broad range application. The present paper illustrates its power versatility by demonstrating irreversible thermodynamics quantum mechanics are homomorphic. This result is, itself, interesting since shows large class dissipative, deterministic homomorphic to ideal, stochastic systems. In both cases, metrical structure allows us define “proper time” intrinsic dynamics. With this time, dynamics aging can be defined system's parameter space. context, Schrodinger's equation seen aging.