Saved in:
Bibliographic Details
Main Authors: Koertje, Christian, Sayama, Hiroki
Format: Preprint
Published: 2023
Subjects:
Online Access:https://arxiv.org/abs/2310.01564
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866914669379190784
author Koertje, Christian
Sayama, Hiroki
author_facet Koertje, Christian
Sayama, Hiroki
contents In the age of technology, individuals accelerate their biased gathering of information which in turn leads to a population becoming extreme and more polarized. Here we study a partial differential equation model for opinion dynamics that exhibits collective behavior subject to nonlocal interactions. We developed a new interaction kernel function to represent biased information gathering. Through a linear stability analysis, we show that biased populations can still form opinionated groups. However, a population that is too heavily biased can no longer come to a consensus, that is, the initial homogeneous mixed state becomes stable. Numerical simulations with biased information gathering show the ability for groups to collectively drift towards one end of the opinion space. This means that a small bias in each individual will collectively lead to groups of individuals becoming extreme together. The characteristic time scale for a groups existence is captured from numerical experiments using the temporal correlation function. Supplementing this, we included a measure of how different each population is after regular time intervals using a form of the Manhattan and Euclidean distance metrics. We conclude by exploring how wall boundary conditions induce pattern formation initially on the most extreme sides of the domain.
format Preprint
id arxiv_https___arxiv_org_abs_2310_01564
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Collective group drift in a PDE-based opinion dynamics model with biased perception kernels
Koertje, Christian
Sayama, Hiroki
Physics and Society
Pattern Formation and Solitons
In the age of technology, individuals accelerate their biased gathering of information which in turn leads to a population becoming extreme and more polarized. Here we study a partial differential equation model for opinion dynamics that exhibits collective behavior subject to nonlocal interactions. We developed a new interaction kernel function to represent biased information gathering. Through a linear stability analysis, we show that biased populations can still form opinionated groups. However, a population that is too heavily biased can no longer come to a consensus, that is, the initial homogeneous mixed state becomes stable. Numerical simulations with biased information gathering show the ability for groups to collectively drift towards one end of the opinion space. This means that a small bias in each individual will collectively lead to groups of individuals becoming extreme together. The characteristic time scale for a groups existence is captured from numerical experiments using the temporal correlation function. Supplementing this, we included a measure of how different each population is after regular time intervals using a form of the Manhattan and Euclidean distance metrics. We conclude by exploring how wall boundary conditions induce pattern formation initially on the most extreme sides of the domain.
title Collective group drift in a PDE-based opinion dynamics model with biased perception kernels
topic Physics and Society
Pattern Formation and Solitons
url https://arxiv.org/abs/2310.01564