Time integration of stochastic Turing patterns in the Levin-Segel model yields effective hyperuniformity with intensive number variance approaching a reaction-kinetic floor as 1/R near the Turing instability.
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2 Pith papers cite this work. Polarity classification is still indexing.
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2026 2verdicts
UNVERDICTED 2representative citing papers
Competition pins multicomponent systems to marginal stability of the most persistent species, implementing compositional proofreading via extended lifetimes of dominant components and rapid turnover of others.
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Effective hyperuniformity in time-integrated stochastic Turing patterns
Time integration of stochastic Turing patterns in the Levin-Segel model yields effective hyperuniformity with intensive number variance approaching a reaction-kinetic floor as 1/R near the Turing instability.
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Compositional proofreading through critical self-tuning
Competition pins multicomponent systems to marginal stability of the most persistent species, implementing compositional proofreading via extended lifetimes of dominant components and rapid turnover of others.