RT @BickMath: Higher-order network interactions give heteroclinic transitions between sets where identical oscillators show distinct freque…
RT @BickMath: Higher-order network interactions give heteroclinic transitions between sets where identical oscillators show distinct freque…
RT @BickMath: Higher-order network interactions give heteroclinic transitions between sets where identical oscillators show distinct freque…
RT @BickMath: Higher-order network interactions give heteroclinic transitions between sets where identical oscillators show distinct freque…
Higher-order network interactions give heteroclinic transitions between sets where identical oscillators show distinct frequencies. Now out: Existence https://t.co/dDl8M1fdZm and stability https://t.co/uL9dNrd31I in terms of the coupling parameters. Joint
New results on Heteroclinic Dynamics of Localized Frequency Synchrony on the @arxiv joint with @alex_lohse: on existence https://t.co/IvA9WwHs1O and stability https://t.co/eyWJen7k5w. Feedback welcome!
Heteroclinic Dynamics of Localized Frequency Synchrony: Stability of Heteroclinic Cycles and Networks. https://t.co/zB9GM7melH
Christian Bick, Alexander Lohse : Heteroclinic Dynamics of Localized Frequency Synchrony: Stability of Heteroclinic Cycles and Networks https://t.co/YxAkPaYnLY
https://t.co/SXM9NBJLdp C Bick, A Lohse Heteroclinic Dynamics of Localized Frequency Synchrony: Stability of Heteroclinic Cycles and Networks https://t.co/d1dUYSkBj9