The paper establishes a coarse-grained resolution inequality Psi(r) <= 4 Psi^ell(r) + 4 Omega^ell(r) and a fixed-chain depletion theorem for combined pressure-flux work in the Navier-Stokes CKN setting.
Yu, Critical Ledgers and Scale-Defect Cascades for Navier–Stokes, arXiv:2606.13887 [math.AP], 2026
3 Pith papers cite this work. Polarity classification is still indexing.
3
Pith papers citing it
fields
math.AP 3years
2026 3verdicts
UNVERDICTED 3representative citing papers
Audit of Navier-Stokes obstruction calculus shows existing decompositions locate CKN badness transport but lack coercive estimates, proving a resolution lemma and identifying the need for a filtered stretching-diffusion estimate with subgrid terms.
Proves a local-to-clean detection theorem and anti-phantom principle ensuring baseline-visible defects in sharp Navier-Stokes packages are either detector-caught or charged to a quotient-residual ledger under listed conditions.
citing papers explorer
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Coarse-Grained Resolution and Pressure-Flux Work Depletion for Navier-Stokes CKN Badness
The paper establishes a coarse-grained resolution inequality Psi(r) <= 4 Psi^ell(r) + 4 Omega^ell(r) and a fixed-chain depletion theorem for combined pressure-flux work in the Navier-Stokes CKN setting.
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A Structural Audit of Navier-Stokes Obstruction Calculus
Audit of Navier-Stokes obstruction calculus shows existing decompositions locate CKN badness transport but lack coercive estimates, proving a resolution lemma and identifying the need for a filtered stretching-diffusion estimate with subgrid terms.
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Finite-Window Local-to-Clean Transfer and Anti-Phantom Detection for Sharp Navier-Stokes Packages
Proves a local-to-clean detection theorem and anti-phantom principle ensuring baseline-visible defects in sharp Navier-Stokes packages are either detector-caught or charged to a quotient-residual ledger under listed conditions.