In fluid dynamics, the Ursell number indicates the nonlinearity of long surface gravity waves on a fluid layer. This dimensionless parameter is named after Fritz Ursell, who discussed its significance in 1953.
The Ursell number is derived from the Stokes wave expansion, a perturbation series for nonlinear periodic waves, in the long-wave limit of shallow water â when the wavelength is much larger than the water depth. Then the Ursell number U is defined as:
which is, apart from a constant 3 / (32 ÃÂ<sup>2</sup>), the ratio of the amplitudes of the second-order to the first-order term in the free surface elevation. The used parameters are:
So the Ursell parameter U is the relative wave height H / h times the relative wavelength û / h squared.
For long waves (û â« h) with small Ursell number, U ⪠32 ÃÂ<sup>2</sup> / 3 â 100, linear wave theory is applicable. Otherwise (and most often) a non-linear theory for fairly long waves (û > 7 h) â like the KortewegâÂÂde Vries equation or Boussinesq equations â has to be used. The parameter, with different normalisation, was already introduced by George Gabriel Stokes in his historical paper on surface gravity waves of 1847.