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Main Authors: Datseris, George, Lohmann, Johannes, Hamilton, Oisín, Haqq-Misra, Jacob
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2604.09661
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author Datseris, George
Lohmann, Johannes
Hamilton, Oisín
Haqq-Misra, Jacob
author_facet Datseris, George
Lohmann, Johannes
Hamilton, Oisín
Haqq-Misra, Jacob
contents Multistability is a phenomenon prevalent in many natural systems. In climate, for example, it allows the possibility of irreversible consequences on planetary scale as a result of climate change. Indeed, a climate ``tipping element'' is a multistable component that can undergo a transition to an alternative steady state due to an external perturbation. Despite the potential impact, multistability in realistic, complex simulations (e.g. climate models) remains poorly understood. Arguably a reason for this the lack of applicable methodology that explicitly targets finite yet high-dimensional datasets. In this work we utilize recent progress in computational nonlinear dynamics to formulate a workflow that analyses potentially multistable simulation data and decides algorithmically what are the alternative steady states contained within, if any. The framework undergoes an optimization routine that showcases which observables in the data best differentiate the alternative states, and which ones do not differentiate at all, which could be used to guide monitoring and early-warning for multistable components in climate or ecosystems. Finally, once the alternate states have been found, we define an indicator called ``intermingledness''. It quantifies differences and similarities between alternate states, as well as for their basins of attraction, across various diagnostic variables. We analyse and present results using three diverse climate datasets: Atlantic ocean circulation, atmospheric midlatitude flow, and habitability of exoplanets. We also provide easy-to-use open source code for applying the workflow to new data.
format Preprint
id arxiv_https___arxiv_org_abs_2604_09661
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Multistability and intermingledness in complex high-dimensional data
Datseris, George
Lohmann, Johannes
Hamilton, Oisín
Haqq-Misra, Jacob
Atmospheric and Oceanic Physics
Adaptation and Self-Organizing Systems
Data Analysis, Statistics and Probability
Methodology
Multistability is a phenomenon prevalent in many natural systems. In climate, for example, it allows the possibility of irreversible consequences on planetary scale as a result of climate change. Indeed, a climate ``tipping element'' is a multistable component that can undergo a transition to an alternative steady state due to an external perturbation. Despite the potential impact, multistability in realistic, complex simulations (e.g. climate models) remains poorly understood. Arguably a reason for this the lack of applicable methodology that explicitly targets finite yet high-dimensional datasets. In this work we utilize recent progress in computational nonlinear dynamics to formulate a workflow that analyses potentially multistable simulation data and decides algorithmically what are the alternative steady states contained within, if any. The framework undergoes an optimization routine that showcases which observables in the data best differentiate the alternative states, and which ones do not differentiate at all, which could be used to guide monitoring and early-warning for multistable components in climate or ecosystems. Finally, once the alternate states have been found, we define an indicator called ``intermingledness''. It quantifies differences and similarities between alternate states, as well as for their basins of attraction, across various diagnostic variables. We analyse and present results using three diverse climate datasets: Atlantic ocean circulation, atmospheric midlatitude flow, and habitability of exoplanets. We also provide easy-to-use open source code for applying the workflow to new data.
title Multistability and intermingledness in complex high-dimensional data
topic Atmospheric and Oceanic Physics
Adaptation and Self-Organizing Systems
Data Analysis, Statistics and Probability
Methodology
url https://arxiv.org/abs/2604.09661