A new 0-persistence exponent derived from persistent homology quantifies chaos with proven stability and non-negativity when Lyapunov exponents are positive.
Tempelman and Firas A
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A Stable Measure of Chaos in Dynamical Systems using Persistent Homology
A new 0-persistence exponent derived from persistent homology quantifies chaos with proven stability and non-negativity when Lyapunov exponents are positive.