A modal susceptibility score derived from the real part of the tracked slow Laplacian branch quantifies first-order changes in relaxation rate under node deletion in directed networks.
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3 Pith papers cite this work. Polarity classification is still indexing.
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2026 3verdicts
UNVERDICTED 3representative citing papers
A new random walk operator on simplicial complexes bridges different dimensions hierarchically and uses the walkers' asymptotic distribution to rank the importance of higher-order simplices.
Chaos in higher-order coupled oscillator networks is organized by effective-frequency shear from amplitude heterogeneity, not by phase coherence.
citing papers explorer
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Functional Dismantling of Network Relaxation through Slow-Branch Susceptibility
A modal susceptibility score derived from the real part of the tracked slow Laplacian branch quantifies first-order changes in relaxation rate under node deletion in directed networks.
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Random Walks Across Dimensions: Exploring Simplicial Complexes
A new random walk operator on simplicial complexes bridges different dimensions hierarchically and uses the walkers' asymptotic distribution to rank the importance of higher-order simplices.
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Shear, Not Coherence, Organizes chaotic response under Higher-Order Coupling
Chaos in higher-order coupled oscillator networks is organized by effective-frequency shear from amplitude heterogeneity, not by phase coherence.