A way to generate poloidal (zonal) flow in the dynamics of drift (Rossby) waves

Abstract

The paper considers dynamics in the Charney-Hasegawa-Mima equation, basic to several different phenomena. In each of them, the generation of poloidal/zonal flow is important. The paper suggests a possibility to generate such flows (which can serve as transport barriers). Namely, one needs to create significant increment and decrement in neighborhoods of some wave vectors k1 and k2 (respectively) such that (1) R k1<R k2, where R k is the spectral density of the extra invariant (I=∫ R k E k d k is the extra invariant, with E k being the energy spectrum), (2) | k1|<| k2|, and (3) k1+ k2 is a poloidal/zonal wave vector. These three conditions define quite narrow region.