Asymptotic study of Leray solution of 3D-Navier-Stokes equations with exponential damping
We study the uniqueness, the continuity in $L^2$ and the large
time decay for the Leray solutions of the $3D$ incompressible
Navier-Stokes equations with the nonlinear exponential
damping term $a (e^{b |u|^{\bf 2}}-1)u$, ($a,b>0$).
Publisher Name
De Gruyter Open Access
Volume Number
56
Issue Number
20220208
Magazine \ Newspaper
Demonstratio Mathematica
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Lamiri and M.Ouni state some characterization theorems for d-orthogonal polynomials
of Hermite, Gould-Hopper and Charlier type polynomials. In [3] Y.Ben Cheikh I. Lamiri and M.Ouni
…
2023
We study the uniqueness, the continuity in $L^2$ and the large
time decay for the Leray solutions of the $3D$ incompressible
Navier-Stokes equations with the nonlinear exponential…
2023
Published in:
De Gruyter Open Access