When Does Population Diversity Matter? A Unified Framework for Binary-Choice Dynamics
Abstract
We propose a modeling framework for binary-choice dynamics in which agents update their states using two mechanisms selected based on individual preference drawn from an arbitrary distribution. We compare annealed dynamics, where preferences change over time, and quenched dynamics, where they remain fixed. Our framework bridges gaps between existing models and provides a systematic approach to assess when individual-level diversity affects collective dynamics and when it can be effectively ignored. We identify a constraint on transition probabilities that makes annealed and quenched dynamics equivalent. We show that when this condition is satisfied, the quenched dynamics reduces to a one-dimensional system, ruling out oscillatory behavior that may otherwise emerge.
Cite
@article{arxiv.2507.03665,
title = {When Does Population Diversity Matter? A Unified Framework for Binary-Choice Dynamics},
author = {Arkadiusz Jędrzejewski and José F. F. Mendes},
journal= {arXiv preprint arXiv:2507.03665},
year = {2025}
}
Comments
9 pages, 5 figures, extended Introduction, Modeling framework, and Conclusions, added End Matter and links to the source code repository, major improvements throughout the text, corrected typos