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On the Blow-up criterion of Navier-Stokes equation associated with the Weinstein operator
Published 11 Jan 2021 in math.AP | (2101.04221v1)
Abstract: In this paper we give Navier-Stokes system associated with the Weinstein operator $(NSW)$ (see Eq.\eqref{11}), We study the existence and uniqueness of solutions to equations (NSW) in $L_{\alpha}{p}\left(\mathbb{R}_{+}{d+1}\right), 2 \alpha+d+2<p \leq \infty$, and we proved some properties of the maximal solution of equation. If the maximum time $T*$is finite, we establish that the growth of $\left| u ( {t}) \right|{L ^ {p}{\alpha}} $ is at least of the order of ${\left(T{*}-t\right){{-\frac{2 p}{p-2 \alpha-d-2}}}},$ fo rall $t$ in $\left[0, T{*}\right]$, also we give some blow-up results.
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