Difference between revisions of "Wave overtopping"

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==Notes==
 
==Notes==
Pictures of wave overtopping in the laboratory and in the field are shown in Fig. 1; a schematic representation with definitions is displayed in Fig. 2. During overtopping, two important processes take place: wave run-up on the structure and partial transmission of waves. There is no permanent discharge over the crest of a structure during overtopping. The process of wave overtopping is very random in time, space and volume. The highest waves will wash a large volume of water over the crest in a short period of time (less than a wave period), whereas lower waves may not produce any overtopping.
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Pictures of wave overtopping in the laboratory and in the field are shown in Fig. 1; a schematic representation with definitions is displayed in Fig. 2. During overtopping, two important processes take place: wave run-up on the structure and partial transmission of waves. The process of wave overtopping is highly random in time, space and volume; there is no permanent discharge over the crest of a structure. The highest waves will wash a large volume of water over the crest in a short period of time (less than a wave period), whereas lower waves may not produce any overtopping.
  
An empirical formula of wave overtopping of coastal structures is given in the EurOtop manual<ref>EurOtop, 2018. Manual on wave overtopping of sea defences and related structures. An overtopping manual largely based on European research, but for worldwide application. Van der Meer, J.W., Allsop, N.W.H., Bruce, T., De Rouck, J., Kortenhaus, A., Pullen, T., Schüttrumpf, H., Troch, P. and Zanuttigh, B., www.overtopping-manual.com</ref>. As observational overtopping rates of more than a factor 10 higher were observed in several experiments, a revised formula was developed by Eldrup et al. 2022<ref>Eldrup, M.R., Andersen, T.L., Van Doorslaer, K. and Van der Meer, J. 2022. Improved guidance on roughness and crest width in overtopping of rubble mound structures along EurOtop. Coastal Engineering 176, 104152</ref>. The general form of the formula for the average water discharge <math>q</math> per linear meter by waves over a protection structure is
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An empirical formula of wave overtopping of coastal structures is given in the EurOtop manual<ref name=E18>EurOtop, 2018. Manual on wave overtopping of sea defences and related structures. An overtopping manual largely based on European research, but for worldwide application. Van der Meer, J.W., Allsop, N.W.H., Bruce, T., De Rouck, J., Kortenhaus, A., Pullen, T., Schüttrumpf, H., Troch, P. and Zanuttigh, B., www.overtopping-manual.com</ref>. As observational overtopping rates of more than a factor 10 higher were observed in several experiments, a revised formula was developed by Eldrup et al. 2022<ref>Eldrup, M.R., Andersen, T.L., Van Doorslaer, K. and Van der Meer, J. 2022. Improved guidance on roughness and crest width in overtopping of rubble mound structures along EurOtop. Coastal Engineering 176, 104152</ref>. The general form of the formula for the average water discharge <math>q</math> per linear meter by waves over a protection structure is
  
 
<math>q=a \, \sqrt{gH_{m0}^3} \, \exp\Big[ \big(-b \large\frac{R_c}{H_{m0}}\normalsize \big)^c \Big], </math>
 
<math>q=a \, \sqrt{gH_{m0}^3} \, \exp\Big[ \big(-b \large\frac{R_c}{H_{m0}}\normalsize \big)^c \Big], </math>
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<math>q = (1.22 \pm 0.13) 10^{-4} \, \sqrt{gH_{m0}^3} \, \exp \big[ (3.5 \pm 0.13)  \large\frac{R_2 -R_c}{H_{m0}}\normalsize – (0.64 \pm 0.07) \large\frac{G_c}{H_{m0}}\normalsize \big]  . </math>
 
<math>q = (1.22 \pm 0.13) 10^{-4} \, \sqrt{gH_{m0}^3} \, \exp \big[ (3.5 \pm 0.13)  \large\frac{R_2 -R_c}{H_{m0}}\normalsize – (0.64 \pm 0.07) \large\frac{G_c}{H_{m0}}\normalsize \big]  . </math>
  
The standard deviation of observational data with respect to this formula is about a factor 2-3.
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The standard deviation of observational data with respect to this formula is about a factor 3. This uncertainty is mainly related to estimating the wave run-up. The EurOtop manual<ref name=E18/> proposes for approximately normal wave incidence:
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<math>R_2 = 1.65 \, \gamma_f \, H_{m0} \, \xi \;</math>, with a maximum of <math>\gamma_{sf} \, H_{m0} \, (4 - 1.5 \, \xi^{-1/2})</math>. The friction factor <math>\gamma_{sf}</math> for surging waves is estimated as <math>\gamma_{sf} = \gamma_f + 0.12 \, (1-\gamma_f)(\xi-1.8)</math> with a minimum value equal to <math>\gamma_f</math>.
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==Related articles==
 
==Related articles==
 
:[[ Stability of rubble mound breakwaters and shore revetments]]
 
:[[ Stability of rubble mound breakwaters and shore revetments]]
 
:[[Freeboard]]
 
:[[Freeboard]]
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:[[Wave run-up]]
 
:[[Overtopping resistant dikes]]
 
:[[Overtopping resistant dikes]]
 
:[[Detached breakwaters]]
 
:[[Detached breakwaters]]
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==References==
 
==References==
 
<references/>
 
<references/>
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{{author
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|AuthorID=120
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|AuthorFullName=Job Dronkers
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|AuthorName=Dronkers J}}
  
  
 
[[Category:Coastal protection]]
 
[[Category:Coastal protection]]
 
[[Category:Hard structures]]
 
[[Category:Hard structures]]

Revision as of 11:55, 29 January 2023

Definition of Wave overtopping:
Wave overtopping is the average amount of water that is discharged per linear meter by waves over a protection structure (e.g. breakwater, dike) whose crest is higher than the still water level (SWL).
This is the common definition for Wave overtopping, other definitions can be discussed in the article


Overtopping flume.jpg Overtopping nature.jpg
Fig. 1a. Wave-overtopping of a breakwater in a flume test. Fig. 1b. Wave-overtopping of a breakwater in nature.

Notes

Pictures of wave overtopping in the laboratory and in the field are shown in Fig. 1; a schematic representation with definitions is displayed in Fig. 2. During overtopping, two important processes take place: wave run-up on the structure and partial transmission of waves. The process of wave overtopping is highly random in time, space and volume; there is no permanent discharge over the crest of a structure. The highest waves will wash a large volume of water over the crest in a short period of time (less than a wave period), whereas lower waves may not produce any overtopping.

An empirical formula of wave overtopping of coastal structures is given in the EurOtop manual[1]. As observational overtopping rates of more than a factor 10 higher were observed in several experiments, a revised formula was developed by Eldrup et al. 2022[2]. The general form of the formula for the average water discharge [math]q[/math] per linear meter by waves over a protection structure is

[math]q=a \, \sqrt{gH_{m0}^3} \, \exp\Big[ \big(-b \large\frac{R_c}{H_{m0}}\normalsize \big)^c \Big], [/math]


Fig. 2. Waves overtopping a breakwater; definition of symbols.

where the coefficients [math]a, b, c[/math] depend on (see Fig. 2):

  • The spectral wave height [math]H_{m0}[/math] (approximately equal to the significant wave height [math]H_s[/math], see Statistical description of wave parameters)
  • The mean wave energy period [math]T_{m-1,0}[/math]
  • The water depth [math]h[/math] at the toe of the structure
  • The breakwater wave run-up [math]R_2[/math] exceeded by only 2 % of the waves; [math]R_2/ H_{m0}[/math] depends on the roughness (and permeability) reduction factor [math]\gamma_f[/math], the surf similarity parameter [math]\xi[/math] and the wave obliqueness
  • The freeboard [math]R_c[/math] (the structure crest level relative to the still water level (SWL); overtopping occurs if [math]\; R_c \lt R_2 \;[/math])
  • The seabed slope [math]m[/math]
  • The front slope of the structure [math]\tan \alpha[/math]
  • The crest width of the structure [math]G_c[/math]
  • The surf similarity parameter (Iribarren number) [math]\xi[/math]
  • The roughness (and permeability) reduction factor [math]\gamma_f[/math] that accounts for the roughness and percolation of structures’ slope. The reduction factor [math]\gamma_f[/math] may further depend on the surf similarity parameter and the overtopping flow rate. Usual values are in the range [math]\gamma_f \sim 0.38 – 0.6[/math].


A simpler formula for overtopping of rubble mound breakwaters by surging waves was empirically derived by Etemad-Shahidi et al. 2022[3]:

[math]q = (1.22 \pm 0.13) 10^{-4} \, \sqrt{gH_{m0}^3} \, \exp \big[ (3.5 \pm 0.13) \large\frac{R_2 -R_c}{H_{m0}}\normalsize – (0.64 \pm 0.07) \large\frac{G_c}{H_{m0}}\normalsize \big] . [/math]

The standard deviation of observational data with respect to this formula is about a factor 3. This uncertainty is mainly related to estimating the wave run-up. The EurOtop manual[1] proposes for approximately normal wave incidence:

[math]R_2 = 1.65 \, \gamma_f \, H_{m0} \, \xi \;[/math], with a maximum of [math]\gamma_{sf} \, H_{m0} \, (4 - 1.5 \, \xi^{-1/2})[/math]. The friction factor [math]\gamma_{sf}[/math] for surging waves is estimated as [math]\gamma_{sf} = \gamma_f + 0.12 \, (1-\gamma_f)(\xi-1.8)[/math] with a minimum value equal to [math]\gamma_f[/math].


Related articles

Stability of rubble mound breakwaters and shore revetments
Freeboard
Wave run-up
Overtopping resistant dikes
Detached breakwaters
Modelling coastal hydrodynamics


References

  1. 1.0 1.1 EurOtop, 2018. Manual on wave overtopping of sea defences and related structures. An overtopping manual largely based on European research, but for worldwide application. Van der Meer, J.W., Allsop, N.W.H., Bruce, T., De Rouck, J., Kortenhaus, A., Pullen, T., Schüttrumpf, H., Troch, P. and Zanuttigh, B., www.overtopping-manual.com
  2. Eldrup, M.R., Andersen, T.L., Van Doorslaer, K. and Van der Meer, J. 2022. Improved guidance on roughness and crest width in overtopping of rubble mound structures along EurOtop. Coastal Engineering 176, 104152
  3. Etemad-Shahidi, A., Koosheh, A. and Van Gent, M.R.A. 2022. On the mean overtopping rate of rubble mound structures. Coastal Engineering 177, 104150


The main author of this article is Job Dronkers
Please note that others may also have edited the contents of this article.

Citation: Job Dronkers (2023): Wave overtopping. Available from http://www.coastalwiki.org/wiki/Wave_overtopping [accessed on 22-11-2024]