The Van der Meer formula is a formula for calculating the required stone weight for armourstone under the influence of (wind) waves. This is necessary for the design of breakwaters and shoreline protection. Around 1985 it was found that the Hudson formula in use at that time had considerable limitations (only valid for permeable breakwaters and steep (storm) waves). That is why the Dutch government agency Rijkswaterstaat commissioned Deltares to start research for a more complete formula. This research, conducted by Jentsje van der Meer, resulted in the Van der Meer formula in 1988, as described in his dissertation.[1] This formula reads [2] [3]
Hs | |
\Delta ⋅ dn50 |
=\begin{cases}cpP0.18\left(
S | |
\sqrt{N |
\xicr=\left[
cp | |
cs |
P0.31\sqrt{\tan\alpha}
| ||||
\right] |
In this formula:
Hs = Significant wave height at the toe of the construction
Δ = relative density of the stone (= (ρs -ρw)/ρw) where ρs is the density of the stone and ρw is the density of the water
dn50 = nominal stone diameter
α = breakwater slope
P = notional permeability
S = Damage number
N = number of waves in the storm
ξm = the Iribarren number calculated with the Tm
For design purposes, for the coefficient cp the value of 5,2 and for cs the value 0,87 is recommended.[2] The value of P can be read from attached graph. Until now, there is no good method for determining P different than with accompanying pictures. Research is under way to try to determine the value of P using calculation models that can simulate the water movement in the breakwater (OpenFOAM models).
The value of the damage number S is defined as
S= | A | |||||
|
slope | Start of damage | Average damage, repair needed | Failure (core is exposed)) | |
---|---|---|---|---|
1:1,5 | 2 | 3-5 | 8 | |
1:2 | 2 | 4-6 | 8 | |
1:3 | 2 | 6-9 | 12 | |
1:4 | 3 | 8-12 | 17 | |
1:6 | 3 | 8-12 | 17 |