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SOLUTION OF THE MILLENNIUM PROBLEM CONCERNING THE NAVIER-STOKES EQUATIONS - PART 2
Alexander Ramm1
1Kansas State University, Manhattan, United States

PAPER: 529/Mathematics/Plenary (Oral) OL
SCHEDULED: 17:50/Wed. 23 Oct. 2024/Marika B2

ABSTRACT:

The Navier-Stokes problem in 3 consists of solving the equations:

where v = v(x, t) is the velocity of the incompressible viscous fluid, p = p(x, t) is the pressure, the density ρ = 1, f = f(x, t) is the force, v0 = v0(x) is the initial velocity.

The aim of this talk is to explain and prove the author’s result concerning the Navier-Stokes problem (NSP) in 3 without boundaries.

It is proved that the NSP is contradictory in the following sense:

If one assumes that the initial data and the solution to the NSP exists for all t ≥ 0, then one proves that the solution v(x, t) to the NSP has the property v(x, 0) = 0.

This paradox (the NSP paradox) shows that:

The NSP is not a correct description of the fluid mechanics problem and the NSP does not have a solution defined on all t ≥ 0.

In the exceptional case, when the data are equal to zero, the solution v(x, t) to the NSP exists for all t ≥ 0 and is equal to zero, v(x, t) ≡ 0.

The results, mentioned above, are proved in the author’s monographs [1], [5] and paper [3].

Our results solve the millennium problem concerning the Navier-Stokes equations, see [5].

These results are based on the author’s theory of integral equations with hyper-singular kernels, see [2], [4].

In paper [6], p.472, Theorem 2, there is a statement that, for f(x, t) = 0 and u0(x) sufficiently small, the solution to the NSP exists for all t ≥ 0 if mq, where m is the dimension of the space and the solution is in Lq. In our case m = 3 and q = 2, so the condition mq does not hold. Therefore, the claim in [6], p. 472, is not applicable in our case.

REFERENCES:
[1] A. G. Ramm, The Navier-Stokes problem, Morgan & Claypool Publishers, 2021. [2] A. G. Ramm, Theory of hyper-singular integrals and its application to the Navier-Stokes problem, Contrib. Math. 2, (2020), 47—54. Open access Journal: www.shahindp.com/locate/cm; DOI: 10.47443/cm.2020.0041 [3] A. G. Ramm, Navier-Stokes equations paradox, Reports on Math. Phys. (ROMP), 88, N1, (2021), 41-45. [4] A. G. Ramm, Applications of analytic continuation to tables of integral transforms and some integral equations with hyper-singular kernels, Open Journal of Optimization, (2022), 11, 1-6. www.scirp.org/journal/ojop [5] A. G. Ramm, Analysis of the Navier-Stokes Problem. Solution of a Millennium Problem, Springer, 2023. isbn 978-3-031-30722-5 [6] T. Kato, Strong Lp-solutions of the Navier-Stokes equation in ℝm, with applications to weak solutions, Math. Z., 187, (1984), 471-480.