Canopies generalize vines and vineyards by tracking simplex pairs in filtered chain complexes instead of persistence diagram points, with proofs of homeomorphism and applications to multiplicity and monodromy.
Khasawneh
2 Pith papers cite this work. Polarity classification is still indexing.
2
Pith papers citing it
years
2026 2verdicts
UNVERDICTED 2representative citing papers
A new 0-persistence exponent derived from persistent homology quantifies chaos with proven stability and non-negativity when Lyapunov exponents are positive.
citing papers explorer
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Canopies: A Generalization of Vines and Vineyards for Parameterized Persistence
Canopies generalize vines and vineyards by tracking simplex pairs in filtered chain complexes instead of persistence diagram points, with proofs of homeomorphism and applications to multiplicity and monodromy.
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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.