Abstract
In this paper, we consider a nonlinear evolution equation for surface waves in shallow water over uneven bottom. First, the local well-posedness is obtained in Besov space $B^{ \frac 32 }_{2,1}$. Then, persistence properties on strong solutions are also investigated.
Citation
Lili Fan. Hongjun Gao. "Local well-posedness and persistence properties for the variable depth KDV general equations in Besov space $B^{ \frac 32 }_{2,1}$." Differential Integral Equations 29 (3/4) 241 - 268, March/April 2016. https://doi.org/10.57262/die/1455806024
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