Simple unity among the fundamental equations of science
Steven A. Frank

TL;DR
The paper explores the universal mathematical structure underlying diverse scientific equations through the Price equation, revealing how invariance principles unify concepts like natural selection, information, and entropy.
Contribution
It demonstrates that the Price equation's form captures a fundamental abstraction explaining the commonality among various scientific disciplines.
Findings
The Price equation partitions change into direct forces and frame of reference.
Universal forms in science arise from invariance of total probability.
Natural selection, information, and entropy are interconnected through this common structure.
Abstract
The Price equation describes the change in populations. Change concerns some value, such as biological fitness, information or physical work. The Price equation reveals universal aspects for the nature of change, independently of the meaning ascribed to values. By understanding those universal aspects, we can see more clearly why fundamental mathematical results in different disciplines often share a common form. We can also interpret more clearly the meaning of key results within each discipline. For example, the mathematics of natural selection in biology has a form closely related to information theory and physical entropy. Does that mean that natural selection is about information or entropy? Or do natural selection, information and entropy arise as interpretations of a common underlying abstraction? The Price equation suggests the latter. The Price equation achieves its abstract…
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