The Navier-Stokes Problem

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<p>The main result of this book is a proof of the contradictory nature of the Navier‒Stokes problem (NSP). It is proved that the NSP is physically wrong, and the solution to the NSP does not exist on ℝ₊ (except for the case when the initial velocity and the exterior force are both equal to zero; in this case, the solution 𝑣(𝑥, 𝑡) to the NSP exists for all 𝑡 ≥ 0 and 𝑣(𝑥, 𝑡) = 0).</p> <p>It is shown that if the initial data 𝑣₀(𝑥) ≢ 0, 𝑓(𝑥,𝑡) = 0 and the solution to the NSP exists for all 𝑡 ϵ ℝ₊, then 𝑣₀(𝑥) := 𝑣(𝑥, 0) = 0.</p> <p>This Paradox proves that the NSP is physically incorrect and mathematically unsolvable, in general. Uniqueness of the solution to the NSP in the space 𝑊₂¹(ℝ³) × C(ℝ₊) is proved, 𝑊₂¹(ℝ³) is the Sobolev space, ℝ₊ = [0, ∞).</p> <p>Theory of integral equations and inequalities with hyper-singular kernels is developed. The NSP is reduced to an integral inequality with a hyper-singular kernel.</p>