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'''The following test cases are available with grids, input, and output files for the user to familiarize himself/herself with.'''
'''The following test cases are available with grids, input, and output files for review.'''


Test cases are available [[SMS:CGWAVE_Test_Cases|here]] with grids, input, and output files for the user to familiarize himself/herself.  An extensive list of test-cases are also provided by the Coastal and Hydraulics Laboratory [http://chl.erdc.usace.army.mil/chl.aspx?p=s&a=ARTICLES;447]. CGWAVE has been validated against these tests (which represents possibly the most rigorous testing for wave models). The model results are compared to lab data or analytical model results. The input and output files are provided. The user is highly encouraged to perform these simulations, alter parameters, etc., so that an examination of the results may help understand what can be expected.  At a minimum, we recommend a visual inspection of the results provided. Often real life problems have complex solutions which are difficult to explain or even anticipate.  The fact that the model reproduces the correct result in so many cases may enhance the user’s confidence in his/her results, assuming the modeling was performed with due diligence. The test cases can also be used as a teaching tool.
Test cases are available here with grids, input, and output files for review and instruction.  An extensive list of test-cases are also provided by the Coastal and Hydraulics Laboratory [http://chl.erdc.usace.army.mil/chl.aspx?p=s&a=ARTICLES;447]. CGWAVE has been validated against these tests (which represents possibly the most rigorous testing for wave models). The model results are compared to lab data or analytical model results. The input and output files are provided. It is highly encouraged to perform these simulations, alter parameters, etc., so that an examination of the results may help show what can be expected.  At a minimum, a visual inspection of the results provided is recommended. Often real life problems have complex solutions which are difficult to explain or even anticipate.  The fact that the model reproduces the correct result in so many cases may enhance confidence in the results, assuming the modeling was performed with due diligence. The test cases can also be used as a teaching tool.


The following [[SMS:Tutorials|tutorials]] may also be helpful for learning to use CGWAVE in SMS:
The following [[SMS:Tutorials|tutorials]] may also be helpful for learning to use CGWAVE in SMS:
* General Section
* General Section
** Data Visualization
** ''Data Visualization''
** Mesh Editing
** ''Mesh Generation''
** Observation
** ''Observations''
* Models Section
* Models Section
** CGWAVE
** ''CGWAVE ''


<u>'''[http://sms.aquaveo.com/CGWAVE-tests1and2.zip Tests 1 & 2]'''</u>
;<u>'''[https://s3.amazonaws.com/sms.aquaveo.com/CGWAVE-tests1and2.zip Tests 1 & 2]'''</u> : These tests involve monochromatic wave propagation over the shoal-slope bathymetry of Berkhoff et al. (1982). Grid has 15 points per wavelength.  Parabolic approximation open boundary condition.  Test 1 &ndash; input amplitudelitude = 1 meter (linear).  Test 2 &ndash; input amp = 0.0232 meter (nonlinear).  Resulting amplification factors along  Transect 5 are shown – they match results and data in Demirbilek and Panchang (1998).  Wave direction and phases diagram shows largely progressive waves except near the shoal where the waves become multidirectional.


These tests involve monochromatic wave propagation over the shoal-slope bathymetry of Berkhoff et al. (1982). Grid has 15 points per wavelength.  Parabolic approximation open boundary condition.  Test 1 &ndash; input amplitudelitude = 1 meter (linear).  Test 2 &ndash; input amp = 0.0232 meter (nonlinear).  Resulting amplification factors along  Transect 5 are shown – they match results and data in Demirbilek and Panchang (1998).  Wave direction and phases diagram shows largely progressive waves except near the shoal where the waves become multidirectional.
:All runs involve no breaking.


All runs involve no breaking.
;'''<u>[https://s3.amazonaws.com/sms.aquaveo.com/CGWAVE-tests3and4.zip Tests 3 & 4]</u>''' : Wave propagation over flat bottom and a shoal, after Vincent and Briggs (1989, JWPCOE).  Monochromatic (T = 1.3 s) and broad-directional spectral (BI) input based on Panchang et al. (1990, JWPCOE).  For spectral simulation, input consists of 29 directional components in the ±60° bandwidth and 5 frequency components. All runs involve no breaking. Results match numerical and experimental data described in Demirbilek and Panchang (1998), Vincent and Briggs (1989), and Panchang et al. (1990)


;'''<u>[https://s3.amazonaws.com/sms.aquaveo.com/CGWAVE-test05-flat.zip Test 5]</u>''' : Wave propagation (T=5.05 s, d = 0.25 meter) over a flat bottom surrounded by infinite ocean.  '''Depth = 0.25 meter'''.  Test 5 &ndash; using Bessel-Fourier boundary conditions (this is the most accurate boundary condition for the problem as specified although the exterior conditions are unrealistic in practice).  See Xu et al. (1996, JWPCOE) for details.  Note the Bessel-Fourier boundary condition works only for input amplitude = 1 meter.  For other input amplitudes, solution should be appropriately scaled.


'''<u>[http://sms.aquaveo.com/CGWAVE-tests3and4.zip Tests 3 & 4]</u>'''
; '''<u>[https://s3.amazonaws.com/sms.aquaveo.com/CGWAVE-test06-flat(fr=0.5).zip Test 6]</u>''' : As in test 5, but with friction which seems to become effective for long waves.  Test 6 &ndash; the circular domain is assigned f = 0.5 everywhere, waves propagate in from the right.  Friction leads to smaller wave heights.


Wave propagation over flat bottom and a shoal, after Vincent and Briggs (1989, JWPCOE). Monochromatic (T = 1.3 s) and broad-directional spectral (BI) input based on Panchang et al. (1990, JWPCOE).  For spectral simulation, input consists of 29 directional components in the ±60° bandwidth and 5 frequency components. All runs involve no breaking. Results match numerical and experimental data described in Demirbilek and Panchang (1998), Vincent and Briggs (1989), and Panchang et al. (1990)
;'''<u>[https://s3.amazonaws.com/sms.aquaveo.com/CGWAVE-test07-flat(fr=0.5c).zip Test 7]</u>''' : As in Test 5, but only the central area has a non-zero friction.


;'''<u>[https://s3.amazonaws.com/sms.aquaveo.com/CGWAVE-test08-semi-cir%201d.zip Test 8]</u>''' : Waves propagating towards a coastline on a flat seabed, parabolic and one-dimensional open boundary condition.  No breaking or friction used.


'''<u>[http://sms.aquaveo.com/CGWAVE-test05-flat.zip Test 5]</u>'''
;'''<u>[https://s3.amazonaws.com/sms.aquaveo.com/CGWAVE-test09-semi-cir.zip Test 9]</u>''' :
 
Wave propagation (T=5.05 s, d = 0.25 meter) over a flat bottom surrounded by infinite ocean.  '''Depth = 0.25 meter'''.  Test 5 &ndash; using Bessel-Fourier boundary conditions (this is the most accurate boundary condition for the problem as specified although the exterior conditions are unrealistic in practice).  See Xu et al. (1996, JWPCOE) for details.  Note the Bessel-Fourier boundary condition works only for input amplitude = 1 meter.  For other input amplitudes, solution should be appropriately scaled by user.
 
 
'''<u>[http://sms.aquaveo.com/CGWAVE-test06-flat(fr=0.5).zip Test 6]</u>'''
 
As in test 5, but with friction which seems to become effective for long waves.  Test 6 &ndash; the circular domain is assigned f = 0.5 everywhere, waves propagate in from the right.  Friction leads to smaller wave heights.
 
 
'''<u>[http://sms.aquaveo.com/CGWAVE-test07-flat(fr=0.5c).zip Test 7]</u>''' 
 
As in Test 5, but only the central area has a non-zero friction.
 
 
'''<u>[http://sms.aquaveo.com/CGWAVE-test08-semi-cir%201d.zip Test 8]</u>'''
 
Waves propagating towards a coastline on a flat seabed, parabolic and one-dimensional open boundary condition.  No breaking or friction used.
 
 
'''<u>[http://sms.aquaveo.com/CGWAVE-test09-semi-cir.zip Test 9]</u>'''
 
As in Test 8, but with parabolic boundary condition only.  This is used to demonstrate correctness of this boundary condition since solution for constant exterior depth is known.
As in Test 8, but with parabolic boundary condition only.  This is used to demonstrate correctness of this boundary condition since solution for constant exterior depth is known.


; '''<u>[https://s3.amazonaws.com/sms.aquaveo.com/CGWAVE-test10-semi-cir(fr=0.5)%201d.zip Test 10]</u>''' : As in Test 8, but friction f = 0.5 for the whole domain.  Note wave height input = 2 m. at the end of one-dimensional section which extends beyond the semicircle.  Wave heights decrease in shoreward direction due to friction.  No breaking used.


'''<u>[http://sms.aquaveo.com/CGWAVE-test10-semi-cir(fr=0.5)%201d.zip Test 10]</u>'''
; '''<u>[https://s3.amazonaws.com/sms.aquaveo.com/CGWAVE-test11-semi-cir(fr=0.5cen)%201d.zip Test 11]</u>''' : As in Test 8, but with f = 0.5 in a central square region (can be seen on .cgi file).  f = 0 elsewhere.  No breaking.


As in Test 8, but friction f = 0.5 for the whole domain. Note wave height input = 2 m. at the end of one-dimensional section which extends beyond the semicircle. Wave heights decrease in shoreward direction due to frictionNo breaking used.
; '''<u>[https://s3.amazonaws.com/sms.aquaveo.com/CGWAVE-test12-semi-cir(fr-and-floating).zip Test 12]</u>''' : As in Test 10, but with central square area indicated as a “floating dock”.   


; '''<u>[https://s3.amazonaws.com/sms.aquaveo.com/CGWAVE-test13-circ-island.zip Test 13 - Circular Island/Shoal]</u>''' : Long wave propagation past the circular island/shoal combination of Homma (1950).  Bessel-Fourier open boundary condition. Input T = 240 sec. Results match analytical solution given in Demirbilek & Panchang (1998).  No breaking. 


'''<u>[http://sms.aquaveo.com/CGWAVE-test11-semi-cir(fr=0.5cen)%201d.zip Test 11]</u>'''
; '''<u>[https://s3.amazonaws.com/sms.aquaveo.com/CGWAVE-test14-circ-cen.zip Test 14]</u>''' : As in Test 5, but with a circular pile in the domain.  Input T = 10 s and constant depth = 15.03 meters.  Results match analytical solution (see Panchang et al. 2000, ASCE JWPCOE).


As in Test 8, but with f = 0.5 in a central square region (can be seen on .cgi file).  f = 0 elsewhere.  No breaking.
; '''<u>[https://s3.amazonaws.com/sms.aquaveo.com/CGWAVE-test15-circ-off.zip Test 15]</u>''' : As in 14, but the pile is off-center.  Parabolic open boundary condition. Results match analytical solution (Panchang et al. 2000, JWPCOE).


; '''<u>[https://s3.amazonaws.com/sms.aquaveo.com/CGWAVE-test16-slope1(f=1).zip Test 16]</u>''' : Long wave (T = 260 s) propagation up a sloping beach.  Parabolic and one-dimensional boundary condition.  Solution is completely one-dimensional.  Results match those in Panchang et al. (2000).


'''<u>[http://sms.aquaveo.com/CGWAVE-test12-semi-cir(fr-and-floating).zip Test 12]</u>'''
; '''<u>[https://s3.amazonaws.com/sms.aquaveo.com/CGWAVE-test17-slope2(f=0).zip Test 17]</u>''' : Oblique wave incidence on uniformly sloping beach.  Results match analytical solution of Radder (1979) given in Panchang et al. (2000, JWPCOE).


As in Test 10, but with central square area indicated as a “floating dock”.   
; '''<u>[https://s3.amazonaws.com/sms.aquaveo.com/CGWAVE-test18-slope-break.zip Test 18]</u>''' : Propagation of obliquely incident waves (incidence angle =20°) past a shore-perpendicular thin fully-reflecting breakwater on a sloping beach (beach is fully absorbing).  Parabolic and one-dimensional open boundary conditionResults match analytical results given in Kirby (1986) and Panchang et al. (2000).


; '''<u>[https://s3.amazonaws.com/sms.aquaveo.com/CGWAVE-tests19and20.zip Tests 19 & 20]</u>''' : As in Test 18, but with nonlinear breaking on and off.  Test pertains parameters in Zhao et al., (2000, Coastal Engineering).


'''<u>[http://sms.aquaveo.com/CGWAVE-test13-circ-island.zip Test 13 - Circular Island/Shoal]</u>'''
; '''<u>[https://s3.amazonaws.com/sms.aquaveo.com/CGWAVE-test21-akira_j(linear).zip Test 21]</u>''' : As in Test 19, but with shore-parallel breakwater.  Parameters and results as in Zhao et al. (2000). Results are for no breaking.


Long wave propagation past the circular island/shoal combination of Homma (1950). Bessel-Fourier open boundary condition. Input T = 240 sec. Results match analytical solution given in Demirbilek & Panchang (1998). No breaking.
;'''<u>[https://s3.amazonaws.com/sms.aquaveo.com/CGWAVE-test22-akira_j.zip Test 22]</u>''' : As in Test 19, but with shore-parallel breakwater. Parameters and results as in Zhao et al. (2000). Results are for nonlinear breaking.


; '''<u>[https://s3.amazonaws.com/sms.aquaveo.com/CGWAVE-test23-rect.zip Test 23]</u>''' : Wave propagation/resonance in a rectangular harbor.  Results match analytical solution plotted in Demirbilek & Panchang (1998).  With friction f = 0.12, the resonant peak amplification reduces substantially for kl =1.4 (T = 1.0447 s).


'''<u>[http://sms.aquaveo.com/CGWAVE-test14-circ-cen.zip Test 14]</u>'''
; '''<u>[https://s3.amazonaws.com/sms.aquaveo.com/CGWAVE-test24-d1.0-c.zip Test 24]</u>''' : Wave propagation around a floating square platform in circular domain. While developing the 2-d grid, the area covering the dock is also filled with finite elements; each node is assigned a depth equal to the local under-keel clearance times the correction factor a. The parameters in the simulations are 2a = 2m, h = 1m, d/h = 0.5 and ka = 2 (corresponding to the cases described by Tsay and Liu (1983). So the depth used for calculation = &#945;.d = &#945;.(0.5) = 0.04. Correction factors such as a = 0.08 are given in Li et al. (2005, Canadian J. of Civil Engr). Results are similar to 3d results  given in Tsay & Liu (1983).


As in Test 5, but with a circular pile in the domainInput T = 10 s and constant depth = 15.03 meters.  Results match analytical solution (see Panchang et al. 2000, ASCE JWPCOE).
; '''<u>[https://s3.amazonaws.com/sms.aquaveo.com/CGWAVE-test25-kh.zip Test 25]</u>''' : Wave propagation around a circular shoal in a circular domain. This is intended to show the effects of the “steep slope” termsThe test is based on Fig. 7 in Chandrasekhara and Cheung (1997, JWPCOE).


; '''<u>[https://s3.amazonaws.com/sms.aquaveo.com/CGWAVE-test26-misc.zip Test 26]</u>''' : Radiation Stress calculations. Waves propagating towards a coastline on a flat seabed, parabolic and one-dimensional open boundary condition.  No breaking or friction used. Five folders are given. Three separate monochromatic cases (260 degrees, 270 degrees, and 280 degrees, i.e. normal incidence and 10 degrees off-center incidence) each of amplitude 0.5 m and period T = 1 s, for fully absorbing coastline.  For 270 degrees, results for fully reflecting coastline are also given. Results match theoretical solution (eq. 6-9 and eq. 54 in Copeland, 1985, Coastal Engg). 


'''<u>[http://sms.aquaveo.com/CGWAVE-test15-circ-off.zip Test 15]</u>'''
:For spectral tests, the same 3 waves were added to form the input spectrum. Radiation stresses for the spectrum are an integration of individual components (eq. 1 in Fedderson 2004, Coastal Engg). The spectral results can be used also to check the mean wave direction (which should be 270 degrees) and the mean frequency ( = 6.28 radians/s).  


As in 14, but the pile is off-center. Parabolic open boundary condition. Results match analytical solution (Panchang et al. 2000, JWPCOE).
; '''<u>[https://s3.amazonaws.com/sms.aquaveo.com/CGWAVE-test27.zip Test 27]</u>''' : Wave propagates (incidence angle =0°) over a rectangular friction region in a constant-depth domain. With friction f = 2.122, input T = 20s, H = 6.1m and constant depth = 15.2m. Results match solution obtained by Dalrymple et al. (1984).


; '''<u>[https://s3.amazonaws.com/sms.aquaveo.com/CGWAVE-test28.zip Test 28]</u>''' : Obliquely incident wave propagates in a rectangular channel with the fully-reflecting side walls. Input T = 12s and constant depth =  8m. Results match analytical solution plotted in Dalrymple and Martin (2000, JWPCOE).


'''<u>[http://sms.aquaveo.com/CGWAVE-test16-slope1(f=1).zip Test 16]</u>'''
Long wave (T = 260 s) propagation up a sloping beach.  Parabolic and one-dimensional boundary condition.  Solution is completely one-dimensional.  Results match those in Panchang et al. (2000).
'''<u>[http://sms.aquaveo.com/CGWAVE-test17-slope2(f=0).zip Test 17]</u>'''
Oblique wave incidence on uniformly sloping beach.  Results match analytical solution of Radder (1979) given in Panchang et al. (2000, JWPCOE).
'''<u>[http://sms.aquaveo.com/CGWAVE-test18-slope-break.zip Test 18]</u>'''
Propagation of obliquely incident waves (incidence angle =20°) past a shore-perpendicular thin fully-reflecting breakwater on a sloping beach (beach is fully absorbing).  Parabolic and one-dimensional open boundary condition.  Results match analytical results given in Kirby (1986) and Panchang et al. (2000).
'''<u>[http://sms.aquaveo.com/CGWAVE-tests19and20.zip Tests 19 & 20]</u>'''
As in Test 18, but with nonlinear breaking on and off.  Test pertains parameters in Zhao et al., (2000, Coastal Engineering).
'''<u>[http://sms.aquaveo.com/CGWAVE-test21-akira_j(linear).zip Test 21]</u>'''
As in Test 19, but with shore-parallel breakwater.  Parameters and results as in Zhao et al. (2000). Results are for no breaking.
'''<u>[http://sms.aquaveo.com/CGWAVE-test22-akira_j.zip Test 22]</u>'''
As in Test 19, but with shore-parallel breakwater.  Parameters and results as in Zhao et al. (2000). Results are for nonlinear breaking.
'''<u>[http://sms.aquaveo.com/CGWAVE-test23-rect.zip Test 23]</u>'''
Wave propagation/resonance in a rectangular harbor.  Results match analytical solution plotted in Demirbilek & Panchang (1998).  With friction f = 0.12, the resonant peak amplification reduces substantially for kl =1.4 (T = 1.0447 s).
'''<u>[http://sms.aquaveo.com/CGWAVE-test24-d1.0-c.zip Test 24]</u>'''
Wave propagation around a floating square platform in circular domain. While developing the 2-d grid, the area covering the dock is also filled with finite elements; each node is assigned a depth equal to the local under-keel clearance times the correction factor a. The parameters in the simulations are 2a = 2m, h = 1m, d/h = 0.5 and ka = 2 (corresponding to the cases described by Tsay and Liu (1983). So the depth used for calculation = &#945;.d = &#945;.(0.5) = 0.04. Correction factors such as a = 0.08 are given in Li et al. (2005, Canadian J. of Civil Engr). Results are similar to 3d results  given in Tsay & Liu (1983).
'''<u>[http://sms.aquaveo.com/CGWAVE-test25-kh.zip Test 25]</u>'''
Wave propagation around a circular shoal in a circular domain. This is intended to show the effects of the “steep slope” terms.  The test is based on Fig. 7 in Chandrasekhara and Cheung (1997, JWPCOE). 
'''<u>[http://sms.aquaveo.com/CGWAVE-test26-misc.zip Test 26]</u>'''
Radiation Stress calculations. Waves propagating towards a coastline on a flat seabed, parabolic and one-dimensional open boundary condition.  No breaking or friction used. Five folders are given. Three separate monochromatic cases (260 degrees, 270 degrees, and 280 degrees, i.e. normal incidence and 10 degrees off-center incidence) each of amplitude 0.5 m and period T = 1 s, for fully absorbing coastline.  For 270 degrees, results for fully reflecting coastline are also given. Results match theoretical solution (eq. 6-9 and eq. 54 in Copeland, 1985, Coastal Engg). 
For spectral tests, the same 3 waves were added to form the input spectrum. Radiation stresses for the spectrum are an integration of individual components (eq. 1 in Fedderson 2004, Coastal Engg). The spectral results can be used also to check the mean wave direction (which should be 270 degrees) and the mean frequency ( = 6.28 radians/s).
'''<u>[http://sms.aquaveo.com/CGWAVE-test27.zip Test 27]</u>'''
Wave propagates (incidence angle =0°) over a rectangular friction region in a constant-depth domain. With friction f = 2.122, input T = 20s, H = 6.1m and constant depth = 15.2m. Results match solution obtained by Dalrymple et al. (1984). 
'''<u>[http://sms.aquaveo.com/CGWAVE-test28.zip Test 28]</u>'''
Obliquely incident wave propagates in a rectangular channel with the fully-reflecting side walls. Input T = 12s and constant depth =  8m. Results match analytical solution plotted in Dalrymple and Martin (2000, JWPCOE).


== Related Topics ==
== Related Topics ==
* [[SMS:CGWAVE|CGWAVE]]
* [[SMS:CGWAVE|CGWAVE]]


{{Template:SMSMain}}
 
{{Template:Navbox SMS}}


[[Category:CGWAVE|T]]
[[Category:CGWAVE|T]]
[[Category:External Links]]

Latest revision as of 22:08, 22 October 2024

The following test cases are available with grids, input, and output files for review.

Test cases are available here with grids, input, and output files for review and instruction. An extensive list of test-cases are also provided by the Coastal and Hydraulics Laboratory [1]. CGWAVE has been validated against these tests (which represents possibly the most rigorous testing for wave models). The model results are compared to lab data or analytical model results. The input and output files are provided. It is highly encouraged to perform these simulations, alter parameters, etc., so that an examination of the results may help show what can be expected. At a minimum, a visual inspection of the results provided is recommended. Often real life problems have complex solutions which are difficult to explain or even anticipate. The fact that the model reproduces the correct result in so many cases may enhance confidence in the results, assuming the modeling was performed with due diligence. The test cases can also be used as a teaching tool.

The following tutorials may also be helpful for learning to use CGWAVE in SMS:

  • General Section
    • Data Visualization
    • Mesh Generation
    • Observations
  • Models Section
    • CGWAVE
Tests 1 & 2
These tests involve monochromatic wave propagation over the shoal-slope bathymetry of Berkhoff et al. (1982). Grid has 15 points per wavelength. Parabolic approximation open boundary condition. Test 1 – input amplitudelitude = 1 meter (linear). Test 2 – input amp = 0.0232 meter (nonlinear). Resulting amplification factors along Transect 5 are shown – they match results and data in Demirbilek and Panchang (1998). Wave direction and phases diagram shows largely progressive waves except near the shoal where the waves become multidirectional.
All runs involve no breaking.
Tests 3 & 4
Wave propagation over flat bottom and a shoal, after Vincent and Briggs (1989, JWPCOE). Monochromatic (T = 1.3 s) and broad-directional spectral (BI) input based on Panchang et al. (1990, JWPCOE). For spectral simulation, input consists of 29 directional components in the ±60° bandwidth and 5 frequency components. All runs involve no breaking. Results match numerical and experimental data described in Demirbilek and Panchang (1998), Vincent and Briggs (1989), and Panchang et al. (1990)
Test 5
Wave propagation (T=5.05 s, d = 0.25 meter) over a flat bottom surrounded by infinite ocean. Depth = 0.25 meter. Test 5 – using Bessel-Fourier boundary conditions (this is the most accurate boundary condition for the problem as specified although the exterior conditions are unrealistic in practice). See Xu et al. (1996, JWPCOE) for details. Note the Bessel-Fourier boundary condition works only for input amplitude = 1 meter. For other input amplitudes, solution should be appropriately scaled.
Test 6
As in test 5, but with friction which seems to become effective for long waves. Test 6 – the circular domain is assigned f = 0.5 everywhere, waves propagate in from the right. Friction leads to smaller wave heights.
Test 7
As in Test 5, but only the central area has a non-zero friction.
Test 8
Waves propagating towards a coastline on a flat seabed, parabolic and one-dimensional open boundary condition. No breaking or friction used.
Test 9

As in Test 8, but with parabolic boundary condition only. This is used to demonstrate correctness of this boundary condition since solution for constant exterior depth is known.

Test 10
As in Test 8, but friction f = 0.5 for the whole domain. Note wave height input = 2 m. at the end of one-dimensional section which extends beyond the semicircle. Wave heights decrease in shoreward direction due to friction. No breaking used.
Test 11
As in Test 8, but with f = 0.5 in a central square region (can be seen on .cgi file). f = 0 elsewhere. No breaking.
Test 12
As in Test 10, but with central square area indicated as a “floating dock”.
Test 13 - Circular Island/Shoal
Long wave propagation past the circular island/shoal combination of Homma (1950). Bessel-Fourier open boundary condition. Input T = 240 sec. Results match analytical solution given in Demirbilek & Panchang (1998). No breaking.
Test 14
As in Test 5, but with a circular pile in the domain. Input T = 10 s and constant depth = 15.03 meters. Results match analytical solution (see Panchang et al. 2000, ASCE JWPCOE).
Test 15
As in 14, but the pile is off-center. Parabolic open boundary condition. Results match analytical solution (Panchang et al. 2000, JWPCOE).
Test 16
Long wave (T = 260 s) propagation up a sloping beach. Parabolic and one-dimensional boundary condition. Solution is completely one-dimensional. Results match those in Panchang et al. (2000).
Test 17
Oblique wave incidence on uniformly sloping beach. Results match analytical solution of Radder (1979) given in Panchang et al. (2000, JWPCOE).
Test 18
Propagation of obliquely incident waves (incidence angle =20°) past a shore-perpendicular thin fully-reflecting breakwater on a sloping beach (beach is fully absorbing). Parabolic and one-dimensional open boundary condition. Results match analytical results given in Kirby (1986) and Panchang et al. (2000).
Tests 19 & 20
As in Test 18, but with nonlinear breaking on and off. Test pertains parameters in Zhao et al., (2000, Coastal Engineering).
Test 21
As in Test 19, but with shore-parallel breakwater. Parameters and results as in Zhao et al. (2000). Results are for no breaking.
Test 22
As in Test 19, but with shore-parallel breakwater. Parameters and results as in Zhao et al. (2000). Results are for nonlinear breaking.
Test 23
Wave propagation/resonance in a rectangular harbor. Results match analytical solution plotted in Demirbilek & Panchang (1998). With friction f = 0.12, the resonant peak amplification reduces substantially for kl =1.4 (T = 1.0447 s).
Test 24
Wave propagation around a floating square platform in circular domain. While developing the 2-d grid, the area covering the dock is also filled with finite elements; each node is assigned a depth equal to the local under-keel clearance times the correction factor a. The parameters in the simulations are 2a = 2m, h = 1m, d/h = 0.5 and ka = 2 (corresponding to the cases described by Tsay and Liu (1983). So the depth used for calculation = α.d = α.(0.5) = 0.04. Correction factors such as a = 0.08 are given in Li et al. (2005, Canadian J. of Civil Engr). Results are similar to 3d results given in Tsay & Liu (1983).
Test 25
Wave propagation around a circular shoal in a circular domain. This is intended to show the effects of the “steep slope” terms. The test is based on Fig. 7 in Chandrasekhara and Cheung (1997, JWPCOE).
Test 26
Radiation Stress calculations. Waves propagating towards a coastline on a flat seabed, parabolic and one-dimensional open boundary condition. No breaking or friction used. Five folders are given. Three separate monochromatic cases (260 degrees, 270 degrees, and 280 degrees, i.e. normal incidence and 10 degrees off-center incidence) each of amplitude 0.5 m and period T = 1 s, for fully absorbing coastline. For 270 degrees, results for fully reflecting coastline are also given. Results match theoretical solution (eq. 6-9 and eq. 54 in Copeland, 1985, Coastal Engg).
For spectral tests, the same 3 waves were added to form the input spectrum. Radiation stresses for the spectrum are an integration of individual components (eq. 1 in Fedderson 2004, Coastal Engg). The spectral results can be used also to check the mean wave direction (which should be 270 degrees) and the mean frequency ( = 6.28 radians/s).
Test 27
Wave propagates (incidence angle =0°) over a rectangular friction region in a constant-depth domain. With friction f = 2.122, input T = 20s, H = 6.1m and constant depth = 15.2m. Results match solution obtained by Dalrymple et al. (1984).
Test 28
Obliquely incident wave propagates in a rectangular channel with the fully-reflecting side walls. Input T = 12s and constant depth = 8m. Results match analytical solution plotted in Dalrymple and Martin (2000, JWPCOE).


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