Weak and dissipative solutions for the Hasegawa-Mima equation
Abstract
We consider the Hasegawa-Mima equation in its ``Euler-like'' velocity form: \[∂t(u-Δ-1u)+(u·∇)u-u n0=0,\] n0 being the time-independent function appearing in the particle count n=n0eeφT, and u being the drift velocity ∇φ=-∇φ× z. Adapting the notion from Lions' book on the Euler equations, we prove the existence of dissipative solutions for this equation for any L2 divergence free initial condition w∈ L2(D), for D= T2 and D⊂ R2 a bounded C1 domain.
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