Field theory of the inverse cascade in two-dimensional turbulence.

Conformal Models of Two–Dimensional Turbulence

Polyakov recently showed how to use conformal field theory to describe two-dimensional turbulence. Here we construct an infinite hierarchy of solutions, both for the constant enstrophy flux cascade, and the constant energy flux cascade. We conclude with some speculations concerning the stability and physical meaning of these solutions.

The Inverse Energy Cascade of Two-Dimensional Turbulence

Diminishing inverse transfer and non-cascading dynamics in surface quasi-geostrophic turbulence

The inverse transfer in two-dimensional turbulence governed by the surface quasigeostrophic (SQG) equation is studied. The nonlinear transfer of this system conserves the two quadratic quantities Ψ1 = 〈|(−∆) 1/4ψ|2〉/2 and Ψ2 = 〈|(−∆) 1/2ψ|2〉/2 (kinetic energy), where ψ is the streamfunction and 〈·〉 denotes a spatial average. In the limit of infinite domain, the kinetic energy density Ψ2 remains...

Remarks on the KLB theory of two-dimensional turbulence

We study the inverse energy transfer in forced two-dimensional (2D) Navier–Stokes turbulence in a doubly periodic domain. It is shown that an inverse energy cascade that carries a nonzero fraction of the injected energy to the large scales via a power-law energy spectrum ∝ k−α requires that α ≥ 5/3. This result is consistent with the classical theory of 2D turbulence that predicts a k−5/3 inver...

Magnetic helicity conservation and inverse energy cascade in electron magnetohydrodynamic wave packets.

Electron magnetohydrodynamics (EMHD) provides a fluidlike description of small-scale magnetized plasmas. An EMHD wave propagates along magnetic field lines. The direction of propagation can be either parallel or antiparallel to the magnetic field lines. We numerically study propagation of three-dimensional (3D) EMHD wave packets moving in one direction. We obtain two major results. (1) Unlike i...