Diagram Wave Prediction for Deep Water Conditions

Shown are the results of the wave prediction procedure for deep water conditions according to Shore Protection Manual (SPM) for the set parameters.

The dimensionless variables used are therefore calculated as follows: \( \tilde{x} = \frac{g \cdot x}{{U_A}^2} \), \( \tilde{H} = \frac{g \cdot H_s}{{U_A}^2} \), \( \tilde{T_p} = \frac{g \cdot T_p}{U_A} \), \( \tilde{t} = \frac{g \cdot t}{U_A} \), with acceleration due to gravity \( g = 9.81 \frac{m}{s^2} \).

For fetch limited sea states: \( \tilde{H} = 1.6 \cdot 10^{-3} \cdot \tilde{x}^{1/2} \), \( \tilde{T_p} = 0.2857 \cdot \tilde{x}^{1/3} \), \( \tilde{t} = 6.88 \cdot 10^{1} \cdot \tilde{x}^{2/3} \).
For duration limited sea states, a dimensionless replacement fetch is calculated according to \( \tilde{x} = 1.752 \cdot 10^{-3} \cdot \tilde{t}^{3/2} \).
The limit values for fully arisen sea states are \( \tilde{H}_{max} = 0.2433 \), \( \tilde{T_p}_{,max} = 8.134 \), \( \tilde{t}_{max} = 71500 \).

Lernplattform des Leichtweiß-Institut für Wasserbau

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The field of Sea State is part of the module Basic Coastal Engineering within the specialization Coastal and Ocean Engineering of the master programmes Civil and Environmental Engineering.