更改

In 2009, Mahulikar & Herwig redefined negentropy of a dynamically ordered sub-system as the specific entropy deficit of the ordered sub-system relative to its surrounding chaos. Thus, negentropy has SI units of (J kg⁻¹ K⁻¹) when defined based on specific entropy per unit mass, and (K⁻¹) when defined based on specific entropy per unit energy. This definition enabled: i) scale-invariant thermodynamic representation of dynamic order existence, ii) formulation of physical principles exclusively for dynamic order existence and evolution, and iii) mathematical interpretation of Schrödinger's negentropy debt.

In 2009, Mahulikar & Herwig redefined negentropy of a dynamically ordered sub-system as the specific entropy deficit of the ordered sub-system relative to its surrounding chaos. Thus, negentropy has SI units of (J kg⁻¹ K⁻¹) when defined based on specific entropy per unit mass, and (K⁻¹) when defined based on specific entropy per unit energy. This definition enabled: i) scale-invariant thermodynamic representation of dynamic order existence, ii) formulation of physical principles exclusively for dynamic order existence and evolution, and iii) mathematical interpretation of Schrödinger's negentropy debt.

2009年，Mahulikar 和 Herwig 将动态有序子系统的负熵重新定义为有序子系统相对于周围混沌的特定熵赤字。因此，根据单位质量比熵定义负熵的 SI 单位为(j kg sup-1 / sup k sup-1 / sup) ，根据单位能量比熵定义负熵的 SI 单位为(k sup-1 / sup)。这个定义实现了: i)动态有序存在的尺度不变热力学表示，ii)专门为动态有序存在和演化而制定的物理原理，iii)薛定谔负熵债的数学解释。

2009年，Mahulikar 和 Herwig 将动态有序子系统的负熵重新定义为有序子系统相对于周围混沌的特定熵赤字。因此，根据单位质量的熵定义负熵的 SI 单位为（J kg⁻¹ K⁻¹） ，其中(K⁻¹)的定义基于单位能量的熵。这个定义实现了: i)动态有序存在的尺度不变的热力学表示，ii)专门为动态有序存在和演化而制定的物理原理，iii)薛定谔负熵的数学解释。