本文利用Littlewood-Paley分解和交换子估计,建立了无粘准地转方程在Besov-Herz空间上的局部适定性,推广了和的结果。 In this paper, using the Littlewood-Paley decomposition and commutator estimates, we establish the local well-posedness for the quasi-geostrophic equation without viscosity in Besov-Herz spaces, which improves the results in and.
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机译:本文利用Littlewood-Paley分解和交换子估计,建立了无粘准地转方程在Besov-Herz空间上的局部适定性,推广了和的结果。 In this paper, using the Littlewood-Paley decomposition and commutator estimates, we establish the local well-posedness for the quasi-geostrophic equation without viscosity in Besov-Herz spaces, which improves the results in and.
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