Taylor–Goldstein equation

Formulation

The equation is derived by solving a linearized version of the Navier–Stokes equation, in presence of gravity g and a mean density gradient (with gradient-length L ρ ), for the perturbation velocity field

where ( U ( z ) , 0 , 0 ) is the unperturbed or basic flow. The perturbation velocity has the wave-like solution u ′ ∝ exp ⁡ ( i α ( x − c t ) ) (real part understood). Using this knowledge, and the streamfunction representation u x ′ = d ϕ ~ / d z , u z ′ = − i α ϕ ~ for the flow, the following dimensional form of the Taylor–Goldstein equation is obtained:

where N = g L ρ denotes the Brunt–Väisälä frequency. The eigenvalue parameter of the problem is c . If the imaginary part of the wave speed c is positive, then the flow is unstable, and the small perturbation introduced to the system is amplified in time.

Note that a purely imaginary Brunt–Väisälä frequency N results in a flow which is always unstable. This instability is known as the Rayleigh–Taylor instability.

No-slip boundary conditions

The relevant boundary conditions are, in case of the no-slip boundary conditions at the channel top and bottom z = z 1 and z = z 2 :