James C. Robinson, José L. Rodrigo, Jack W. D. Skipper
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引用次数: 16
摘要
研究了T2×R+上不可压缩欧拉方程的弱解;我们使用无散度且法向分量为零的测试函数,从而得到一个不涉及压力的定义。我们在u∈L3(0,T;L3(T2×R+)), lim|y|→01|y|∫0T∫T2∫x3>|y|∞|u(x+y)−u(x)|3dxdt=0的假设下证明了能量守恒,并在边界附近证明了一个附加的连续性条件:对于某些δ>0,我们要求u∈L3(0,T;C0(t2x [0,δ]))。我们注意到,当u(x,t)∈Cα,对于某些α>1/3,且Holder常数C(x,t)∈L3(T2×R+ x (0, t))时,所有条件都满足。
Energy conservation for the Euler equations on T2×R+ for weak solutions defined without reference to the pressure
We study weak solutions of the incompressible Euler equations on T2×R+; we use test functions that are divergence free and have zero normal component, thereby obtaining a definition that does not involve the pressure. We prove energy conservation under the assumptions that u∈L3(0,T;L3(T2×R+)), lim|y|→01|y|∫0T∫T2∫x3>|y|∞|u(x+y)−u(x)|3dxdt=0, and an additional continuity condition near the boundary: for some δ>0 we require u∈L3(0,T;C0(T2×[0,δ])). We note that all our conditions are satisfied whenever u(x,t)∈Cα, for some α>1/3, with Holder constant C(x,t)∈L3(T2×R+×(0,T)).
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