Strouhal number

In dimensional analysis, the Strouhal number is a dimensionless number describing oscillating flow mechanisms. The parameter is named after Vincenc Strouhal, a Czech physicist who experimented in 1878 with wires experiencing vortex shedding and singing in the wind.^[1] The Strouhal number is an integral part of the fundamentals of fluid mechanics.

The Strouhal number is often given as

${\displaystyle \mathrm {St} ={fL \over V},}$

where ${\displaystyle \mathrm {St} }$ is the dimensionless Strouhal number, ${\displaystyle f}$ is the frequency of vortex shedding, ${\displaystyle L}$ is the characteristic length (for example hydraulic diameter) and ${\displaystyle V}$ is the velocity of the fluid. In certain cases like heaving (plunging) flight, this characteristic length is the amplitude of oscillation. This selection of characteristic length can be used to present a distinction between Strouhal number and Reduced Frequency.

${\displaystyle \mathrm {St} ={ka \over c},}$

where ${\displaystyle k}$ is the reduced frequency and ${\displaystyle a}$ is amplitude of the heaving oscillation.

For large Strouhal numbers (order of 1), viscosity dominates fluid flow, resulting in a collective oscillating movement of the fluid "plug". For low Strouhal numbers (order of 10⁻⁴ and below), the high-speed, quasi steady state portion of the movement dominates the oscillation. Oscillation at intermediate Strouhal numbers is characterized by the buildup and rapidly subsequent shedding of vortices.^[2]

For spheres in uniform flow in the Reynolds number range of 800 < Re < 200,000 there co-exist two values of the Strouhal number. The lower frequency is attributed to the large-scale instability of the wake and is independent of the Reynolds number Re and is approximately equal to 0.2. The higher frequency Strouhal number is caused by small-scale instabilities from the separation of the shear layer.^[3][4]

In metrology, specifically axial-flow turbine meters, the Strouhal number is used in combination with the Roshko number to give a correlation between flow rate and frequency. The advantage of this method over the freq/viscosity versus K-factor method is that it takes into account temperature effects on the meter.

${\displaystyle \mathrm {St} ={f \over U}{C^{3}}}$

f = meter frequency, U = flow rate, C = linear coefficient of expansion for the meter housing material

This relationship leaves Strouhal dimensionless, although a dimensionless approximation is often used for C³, resulting in units of pulses/volume (same as K-factor).

In animal flight or swimming, propulsive efficiency is high over a narrow range of Strouhal constants, generally peaking in the 0.2 < St < 0.4 range.^[5] This range is used in the swimming of dolphins, sharks, and bony fish, and in the cruising flight of birds, bats and insects.^[5] However, in other forms of flight other values are found.^[5] Intuitively the ratio measures the steepness of the strokes, viewed from the side (e.g., assuming movement through a stationary fluid) – f is the stroke frequency, L is the amplitude, so the numerator fL is half the vertical speed of the wing tip, while the denominator V is the horizontal speed. Thus the graph of the wing tip forms an approximate sinusoid with aspect (maximum slope) twice the Strouhal constant.^[6]

• Froude number
• Mach Number
• Rossby number
• Weber Number
• Aeroelastic Flutter

• Vincenc Strouhal, Ueber eine besondere Art der Tonerregung