Global well-posedness and quantitative flocking are shown for Lagrangian p-alignment dynamics; Eulerian variables are constructed via pushforward and disintegration, with defect terms vanishing asymptotically under heavy-tailed kernels to give mono-kinetic closure and mean-field convergence.
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A matrix generalization of the Winfree model on SO(n) yields leader-follower synchronization, exponential stability, and classified equilibria under sufficient coupling.
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Lagrangian formulation and Eulerian closure in alignment dynamics
Global well-posedness and quantitative flocking are shown for Lagrangian p-alignment dynamics; Eulerian variables are constructed via pushforward and disintegration, with defect terms vanishing asymptotically under heavy-tailed kernels to give mono-kinetic closure and mean-field convergence.
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Emergent behaviors of Winfree oscillators on special orthogonal group
A matrix generalization of the Winfree model on SO(n) yields leader-follower synchronization, exponential stability, and classified equilibria under sufficient coupling.