Reynolds stress: Difference between revisions

Revision as of 15:29, 30 August 2009

In the context of fusion plasmas, the Reynolds stress is a mechanism for generation of sheared flow from turbulence.

Starting from the incompressible momentum balance equation, neglecting the dissipative pressure tensor: ^[1]

{\frac {\partial u_{x}}{\partial t}}+\nabla _{y}\left(u_{y}u_{x}\right)=-\nabla _{x}P+{\frac {1}{\rho }}\left({\vec {j}}\times {\vec {B}}\right)_{x}

Averaging over a magnetic surface (assuming it exists), the right-hand side cancels (MHD equilibrium):

{\frac {\partial u_{x}}{\partial t}}+\nabla _{y}\left(u_{y}u_{x}\right)=0

Now, writing the flow as the sum of a mean and a fluctuating part

u={\bar {u}}+{\tilde {u}}

one obtains

{\frac {\partial {\bar {u}}_{x}}{\partial t}}+\nabla _{y}\left\langle {\tilde {u}}_{y}{\tilde {u}}_{x}\right\rangle =0

Here, the Reynolds stress tensor appears:

R_{xy}=\left\langle {\tilde {u}}_{y}{\tilde {u}}_{x}\right\rangle

and it is clear that a non-zero value of the gradient of the Reynolds stress (of fluctuating flow components) can drive a laminar flow.

↑ R. Balescu, Aspects of Anomalous Transport in Plasmas, Institute of Physics Pub., Bristol and Philadelphia, 2005, ISBN 9780750310307

@@ Line 4: / Line 4: @@
 <ref>R. Balescu, ''Aspects of Anomalous Transport in Plasmas'', Institute of Physics Pub., Bristol and Philadelphia, 2005, ISBN 9780750310307</ref>
-:<math>\frac{\partial u_x}{\partial t} + \nabla_y \left ( u_y u_x \right ) = -\nabla_x P - \frac{1}{\rho} \left ( \vec{j} \times \vec{B} \right )_x</math>
+:<math>\frac{\partial u_x}{\partial t} + \nabla_y \left ( u_y u_x \right ) = -\nabla_x P + \frac{1}{\rho} \left ( \vec{j} \times \vec{B} \right )_x</math>
 Averaging over a [[Flux surface|magnetic surface]] (assuming it exists), the right-hand side cancels ([[MHD equilibrium]]):