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Abstrakty
Long time existence of solutions to the Navier-Stokes equations in cylindrical domains under boundary slip conditions is proved. Moreover, the existence of solutions with no restrictions on the magnitude of the initial velocity and the external force is shown. However, we have to assume that the quantity
$I = ∑_{i=1}^{2} (||∂_{x₃}^{i} v(0)||_{L₂(Ω)} + ||∂_{x₃}^{i}f||_{L₂(Ω×(0,T))})$
is sufficiently small, where x₃ is the coordinate along the axis parallel to the cylinder. The time of existence is inversely proportional to I. Existence of solutions is proved by the Leray-Schauder fixed point theorem applied to problems for $h^{(i)} = ∂_{x₃}^{i}v$, $q^{(i)} = ∂_{x₃}^{i}p$, i = 1,2, which follow from the Navier-Stokes equations and corresponding boundary conditions. Existence is proved in Sobolev-Slobodetskiĭ spaces: $h^{(i)} ∈ W_{δ}^{2+β,1+β/2}(Ω×(0,T))$, where i = 1,2, β ∈ (0,1), δ ∈ (1,2), 5/δ < 3 + β, 3/δ < 2 + β.
$I = ∑_{i=1}^{2} (||∂_{x₃}^{i} v(0)||_{L₂(Ω)} + ||∂_{x₃}^{i}f||_{L₂(Ω×(0,T))})$
is sufficiently small, where x₃ is the coordinate along the axis parallel to the cylinder. The time of existence is inversely proportional to I. Existence of solutions is proved by the Leray-Schauder fixed point theorem applied to problems for $h^{(i)} = ∂_{x₃}^{i}v$, $q^{(i)} = ∂_{x₃}^{i}p$, i = 1,2, which follow from the Navier-Stokes equations and corresponding boundary conditions. Existence is proved in Sobolev-Slobodetskiĭ spaces: $h^{(i)} ∈ W_{δ}^{2+β,1+β/2}(Ω×(0,T))$, where i = 1,2, β ∈ (0,1), δ ∈ (1,2), 5/δ < 3 + β, 3/δ < 2 + β.
Słowa kluczowe
Kategorie tematyczne
Czasopismo
Rocznik
Tom
Numer
Strony
243-285
Opis fizyczny
Daty
wydano
2005
Twórcy
autor
- Institute of Mathematics, Polish Academy of Sciences, Śniadeckich 8, 00-956 Warszawa, Poland
- Institute of Mathematics and Cryptology, Military University of Technology, Kaliskiego 2, 00-908 Warszawa, Poland
Bibliografia
Typ dokumentu
Bibliografia
Identyfikatory
Identyfikator YADDA
bwmeta1.element.bwnjournal-article-doi-10_4064-sm169-3-3