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| Формат: | Recurso digital |
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| Опубліковано: |
Zenodo
2026
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| Предмети: | |
| Онлайн доступ: | https://doi.org/10.5281/zenodo.19930405 |
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Зміст:
- <p>Paper 151L assembles the final coefficient ledger for the current high-vorticity Navier-Stokes bridge arc. Earlier papers developed the route estimates, repaired exact-zero accounting defects, classified moving-support costs, and imported the thin-support, scale-evasion, and intermittent-burst coefficients. This paper does not introduce a new route and does not reprove the source estimates. Its purpose is to collect every declared coefficient, lower-order term, finite constant, remainder, symbolic condition, unknown term, and obstruction into one final audit.</p> <p>The final coefficient ledger is the sum of the ordinary-channel terms, the thin-support coefficient, the scale-evasion coefficient, the intermittent-burst coefficient, the declared moving-support block, and the moving-support remainder block. The final reserve is one minus the total coefficient. The bridge is margin-compatible only when the complete visible ledger has positive reserve, every nonzero coefficient has a favorable or explicitly conditional status, no route is omitted, no route is double-counted, and all lower-order and finite-constant terms are carried forward.</p> <p>The main result is a ledger theorem. It identifies the exact final coefficient expression, the exact reserve, and the exact status logic under which the previously imported bridge estimates yield a positive integrated dissipation margin. If all coefficients are favorable and the total coefficient is less than one, the integrated enstrophy inequality retains a positive amount of dissipation. If symbolic assumptions remain, the conclusion is conditional. If any coefficient is unknown, the bridge remains open. If any coefficient is obstructive, the bridge is blocked unless the obstruction is repaired or retained as an explicit condition. If all coefficients are finite but the total coefficient is at least one, the ledger is finite but the margin fails.</p> <p>Paper 151L is therefore final only at the level of declared coefficient-ledger assembly. It does not by itself prove unconditional Navier-Stokes regularity, discharge symbolic assumptions, or recover every higher Sobolev norm. It closes the accounting arc by making the remaining mathematical question explicit: whether the declared coefficient values and retained assumptions give positive reserve with no unknown or obstructive term remaining.</p>