Von Kármán wind turbulence model

History

The von Kármán wind turbulence model first appeared in a 1957 NACA report based on earlier work by Theodore von Kármán.

Power spectral densities

The von Kármán model is characterized by power spectral densities for gusts' three linear velocity components (u_g,v_g,w_g),

Φ u g ( Ω ) = σ u 2 2 L u π 1 ( 1 + ( 1.339 L u Ω ) 2 ) 5 6 Φ v g ( Ω ) = σ v 2 2 L v π 1 + 8 3 ( 2.678 L v Ω ) 2 ( 1 + ( 2.678 L v Ω ) 2 ) 11 6 Φ w g ( Ω ) = σ w 2 2 L w π 1 + 8 3 ( 2.678 L w Ω ) 2 ( 1 + ( 2.678 L w Ω ) 2 ) 11 6

where σ_i and L_i are the turbulence intensity and scale length, respectively, for the ith velocity component, and Ω is a spatial frequency. These power spectral densities give the stochastic process spatial variations, but any temporal variations rely on vehicle motion through the gust velocity field. The speed with which the vehicle is moving through the gust field V allows conversion of these power spectral densities to different types of frequencies,

Ω = ω V Φ i ( Ω ) = V Φ i ( ω V )

where ω has units of radians per unit time.

The gust angular velocity components (p_g,q_g,r_g) are defined as the variations of the linear velocity components along the different vehicle axes,

p g = ∂ w g ∂ y q g = ∂ w g ∂ x r g = − ∂ v g ∂ x

though different sign conventions may be used in some sources. The power spectral densities for the angular velocity components are

Φ p g ( ω ) = σ w 2 2 V L w 0.8 ( 2 π L w 4 b ) 1 3 1 + ( 4 b ω π V ) 2 Φ q g ( ω ) = ± ( ω V ) 2 1 + ( 4 b ω π V ) 2 Φ w g ( ω ) Φ r g ( ω ) = ∓ ( ω V ) 2 1 + ( 3 b ω π V ) 2 Φ v g ( ω )

The military specifications give criteria based on vehicle stability derivatives to determine whether the gust angular velocity components are significant.

Spectral factorization

The gusts generated by the von Kármán model are not a white noise process and therefore may be referred to as colored noise. Colored noise may, in some circumstances, be generated as the output of a minimum phase linear filter through a process known as spectral factorization. Consider a linear time invariant system with a white noise input that has unit variance, transfer function G(s), and output y(t). The power spectral density of y(t) is

Φ y ( ω ) = | G ( i ω ) | 2

where i² = -1. For irrational power spectral densities, such as that of the von Kármán model, a suitable transfer function can be found whose magnitude squared evaluated along the imaginary axis approximates the power spectral density. The MATLAB documentation provides a realization of such a transfer function for von Kármán gusts that is consistent with the military specifications,

G u g ( s ) = σ u 2 L u π V ( 1 + 0.25 L u V s ) 1 + 1.357 L u V s + 0.1987 ( L u V s ) 2 G v g ( s ) = σ v 2 L v π V ( 1 + 2.7478 2 L v V s + 0.3398 ( 2 L v V s ) 2 ) 1 + 2.9958 2 L v V s + 1.9754 ( 2 L v V s ) 2 + 0.1539 ( 2 L v V s ) 3 G w g ( s ) = σ w 2 L w π V ( 1 + 2.7478 2 L w V s + 0.3398 ( 2 L w V s ) 2 ) 1 + 2.9958 2 L w V s + 1.9754 ( 2 L w V s ) 2 + 0.1539 ( 2 L w V s ) 3 G p g ( s ) = σ w 0.8 V ( π 4 b ) 1 6 ( 2 L w ) 1 3 ( 1 + 4 b π V s ) G q g ( s ) = ± s V 1 + 4 b π V s G w g ( s ) G r g ( s ) = ∓ s V 1 + 3 b π V s G v g ( s )

Driving these filters with independent, unit variance, band-limited white noise yields outputs with power spectral densities that approximate the power spectral densities of the velocity components of the von Kármán model. The outputs can, in turn, be used as wind disturbance inputs for aircraft or other dynamic systems.

Altitude dependence

The von Kármán model is parameterized by a length scale and turbulence intensity. The combination of these two parameters determine the shape of the power spectral densities and therefore the quality of the model's fit to spectra of observed turbulence. Many combinations of length scale and turbulence intensity give realistic power spectral densities in the desired frequency ranges. The Department of Defense specifications include choices for both parameters, including their dependence on altitude.