Mechanism underlying the scaling law of home-return probability in human mobility

Abstract

Individual daily mobility exhibits a striking scaling law: the probability of returning home after a tour of l locations decays as P ret(l) l-γ. While the tour-terminate-continue (TTC) model reproduces this behavior, it relies on this power law as an empirical input, leaving the microscopic origin of γ unresolved. Here we show that this scaling emerges from a utility trade-off governed by cognitive constraints. By invoking the principle of least effort, we demonstrate that individual activity priorities follow Zipf's law, p(r) r-ν, which directly dictates the sublinear accumulation of tour utility, UL(l) l1-ν. Luce's choice rule then yields P ret(l) l-(1-ν), giving the exact exponent γ= 1 - ν. Agent-based simulations confirm this analytical relation. Our framework bridges the gap between individual cognitive constraints and the scaling law of tour behavior, providing a microscopic theoretical underpinning for human mobility.