Ergodic theory and dynamical systems are branches of mathematics that study the statistical properties of dynamical systems. Ergodic theory deals with systems that are "chaotic" in a specific sense, meaning that they tend to mix points in phase space. Dynamical systems are systems that evolve over time according to a fixed rule. This journal publishes research on both theoretical and applied aspects of ergodic theory and dynamical systems.
⚡ Speed vs Prestige
How does this journal balance review speed with impact level?
Based on the Think.Check.Submit framework by DOAJ, COPE & OASPA. All data from verified open sources.
Publication & Citation Trend
Articles published
Times cited
2019
2020
2021
2022
2023
2024
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2026
Source: OpenAlex · Note: citations accumulate over time so older years appear higher
SJR Quartile by Discipline
Scimago ranks this journal separately in each subject category — its quartile can differ by discipline.
Applied MathematicsQ1
Mathematics (miscellaneous)Q1
Subject Classification
Web of Science Categories
MathematicsMathematics, Applied
Scopus Categories
Mathematics (miscellaneous)Applied Mathematics
Research Topics (OpenAlex)
Mathematical Dynamics and FractalsQuantum chaos and dynamical systemsGeometric and Algebraic TopologyAdvanced Differential Equations and Dynamical SystemsAdvanced Topology and Set TheoryDiverse Scientific and Economic StudiesLegal case studies and regulationsCellular Automata and ApplicationsAdvanced Operator Algebra Researchsemigroups and automata theory