Publication: Mean first passage time of the symmetric noisy voter model
Our most recent work [1] concerning the first passage time problem in the noisy voter model has been published in Chaos, Solitons and Fractals!
The mean first passage time is a prominent tool that quantifies fundamental switching behavior in systems ranging from natural to social sciences. In our earlier works the first-passage framework has found applications as a test for long-range memory [2]. While, the noisy voter model is a prominent model used to understand human opinion dynamics.
References
- R. Kazakevicius, A. Kononovicius. Mean first passage time of the symmetric noisy voter model with arbitrary initial and boundary conditions. Chaos, Solitons and Fractals 203: 117649 (2026). doi: 10.1016/j.chaos.2025.117649. arXiv:2512.02519 [cond-mat.stat-mech].
- R. Kazakevicius, A. Kononovicius, B. Kaulakys, V. Gontis. Understanding the nature of the long-range memory phenomenon in socio-economic systems. Entropy 23: 1125 (2021). doi: 10.3390/e23091125. arXiv:2108.02506 [physics.soc-ph].
