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ANSWER - flume experiment - wave propagation in estuary

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Sommaire

Context

This page is part of the collaborative initiative ANSWER relative to the elaboration and dissemination of scientific knowledge in water resources

It concerns

  • MARITIME HYDRAULICS
  • WAVE PROPAGATION IN ESTUARY

It is closely related to 2 others pages:

To validate these theoretical approaches, a series of flume experiments were conducted at Southern Institute of Water Resources Research (SIWRR) in Saigon - Vietnam.

Experimental set-ups

Nomenclature of tests

The physical model tests were conducted from April to August 2016 at SIWRR by Hazeme Mohamed as part of her 2nd year internship at ENTPE, proposed by Jean-Michel Tanguy (SHF) and supervised by Professor San Dinh Director of SIWRR.

The SIWRR is home to several experimental facilities that study the behavior of waves near the coast.

We used the 40 m long, 1.2 m wide and 1.5 m maximum depth canal. It includes a wave maker that can generate regular and irregular waves, with a maximum amplitude of 0.42m, period between 0.5s and 5s. At its upstream end, the beach may be absorbent or reflective.

In order to build a database necessary for the validation of the theoretical developments, 3 types of tests were carried out:

  1. SmAbUn : runs in a rectangular uniform smooth bottom flume with absorbing upstream beach
  2. RoAbUn : runs in a rectangular uniform partially rocky covered bottom flume with absorbing upstream beach
  3. SmAbCo : runs in a rectangular convergent banks and absorbing upstream beach

By varying the parameters below, it is more than 68 different tests that have been instrumented:

  • Regular waves
  • Constant slope along 10 m upstream of the channel: 1/25.
  • Different templates: rectangular canal and canal with linearly bank reduction.
  • Variation of the bottom roughness of the channel (smooth bottom with sand and bottom covered with rocks)
  • Varying conditions at the upstream boundaries: absorption or reflection.
  • Variation of different wave parameters: water level, amplitude and period

In order to simplify the identification of the runs, we have established the following nomenclature:

  • Upstream depth at the wave maker: D65 or D70 corresponding to depths of 65cm and 70cm
  • A4: amplitude of the wave: 4cm (half-amplitude: the real amplitude is 8 cm counted from head to trough)
  • T4: wave period: 4s
  • Bottom surface: Sm (Smooth) or Ro (Rocks)
  • Upstream boundary conditions: Re (reflection) or Ab (Absorption)
  • Geometry of the section: Un (rectangular channel of constant section) or Co (rectangular channel with linear convergent section)

For example, the file D70A2T7_RoAbCo corresponds to a regular canal. Waves are generated upstream with a water height of 70cm, an amplitude of 2cm, a period of 7s on a bottom constituted in its sloping part of rocks with an absorbing beach in a convergent canal. The _D and _E suffixes are added to the file names corresponding to Data and Exploitation.

The combinations of parameters are as follows (not all combinations have been tested):

D (cm) A (cm) T (s)
65 2 2
70 4 4
5 5
6
7

The following photos and videos illustrate the configurations:

General view towards the wave maker
General view upstream
Lateral viewl
upstream of the wave maker
Rocks on the bed (partial)
Convergents banks
Convergent banks

Here are also some videos records at SIWRR on the channel in conditions close to our tests, but with a boundary condition not corresponding to our scenarios.

Locations of the measuring sections

The channel consists of two parts: a first part of 10 m long characterized by a slope of 1/25 which continues with a horizontal part until the boundary condition represented either by an absorbing beach (diagram below) or by a reflective wall.

Canal position sections.jpeg

The measurement sections were positioned every 2.5 m from the beginning of the slope to the section x = 10m. Sections 6 and 7 are respectively at X = 12m and X = 14m

Exploitation of results

We present below 4 tests which seem to us representative of the typologies of configurations, then we compare several similar tests by varying one parameter at a time (the period, the amplitude, the roughness, the convergence effect).

Presentation of 4 standard tests

SmAbUn

We choose test D70A4T4_SmAbUn which corresponds to the following parameters:

'Depth: 70cm, Amplitude 4cm, Period 4s, Smooth bottom, Absorption upstream, uniform cross sections'

The graph above represents the time records of the 7 measurement devices along the channel. They are indicated with different colors. We have selected a time window that corresponds to a series of well-formed waves between the following limits: the first waves are unusable because of the movement of the wave maker and the last ones are disturbed corresponding to parasitic phenomena: transverse wave appearance and/or wave return from the not fully absorbent beach.

Thus, thanks to this diagram, we can illustrate several parameters whose longitudinal variations can be highlighted on the following graphs, but also the appearance of local disturbances.

Figure 1
Figure 2
Figure 3
Figure 4
Figure 5

Diagrams interpretations

  • Figure 2: In accordance with the theory, the wave amplitude increases upstream along the bottom slope
  • Figure 3: Variation of the upstream and downstream slopes of the propagation waves. The graph shows very well the stiffening of the upstream slope of the wave (in red) and the decrease of the downstream slope: this illustrates the importance of non-linear processes. We will see that they decrease with the amplitude and the period of the wave. In absolute values, the slope of the upstream stiffening is greater than that of the downstream subsidence.
  • Figure 4: the celerity of the waves decreases and remains very close to the theoretical values ​​given by the theory of the long waves. There is however a particular point located at the upstream limit of the slope (X = 10m)
  • Figure 5: The wavelength decreases along the slope. The break point of slope is also apparent.

Note : At the section X = 10m, the speed is close to 1.5 m/s. Thus for a return trip of 2x20m = 40 m to return to the profile X = 14m, the wave takes 27 s. Thus the graph of Figure 1 is before the reflected wave (if any) from the absorbing range does disturb the sensors.

RoAbUn

We choose test D70A4T4_RoAbUn which corresponds to the following parameters:

'Depth: 70cm, 1/2 Amplitude 4cm, Period 4s, Rocky bottom, Absorption upstream, Constant pattern'

In a similar way to the other tests described above, we can illustrate several parameters whose longitudinal variations can be highlighted on the following graphs.

Figure 6
-
Figure 7
Figure 8
-
Figure 10

Interpretations:

  • Figure 7: According to the theory, the wave amplitude increases longitudinally along the bottom slope
  • Figure 8: Variation of the upstream and downstream slopes of the propagation waves. The graph shows very well the stiffening of the upstream slope of the wave (in red) and the decrease of the downstream slope: this illustrates the importance of non-linear processes. We will see that they decrease with the amplitude and the period of the wave. In absolute values, the slope of the upstream stiffening is greater than that of the downstream subsidence.
  • Figure 9: the celerity of the waves decreases and remains very close to the theoretical values ​​given by the theory of the long waves. The same singular point is found at the upstream limit of the slope as in the previous test (X = 10m)
  • Figure 10: The wavelength decreases along the slope. The point of slope failure is also apparent.

Note: At the right of section X = 12 m, the speed is close to 1.5 m / s. Thus for a round trip of 2x20m = 40 m to return to the profile X = 14m, the wave will put a time close to 27 s. Thus the graph of FIG. 6 is located before the reflected wave (if any) from the absorbing pad returns to disturb the sensors.

SmAbCo

We choose run D70A4T4_SmAbCo which corresponds to the following parameters :

'Depth: 70cm, 1/2 Amplitude 4cm, Period 4s, Smooth Bottom, Absorption upstream, Convergent banks'

In a similar way to the other tests described above, we can illustrate several parameters whose longitudinal variations can be illustrate on the following graphs:

Figure 11
Figure 12
Figure 13
Figure 14
Figure 15

Schema interpretations:

  • Figure 12: According to the theory, the wave amplitude increases longitudinally along the slope of the bottom
  • Figure 13: Variation of the upstream and downstream slopes of the propagation waves. The graph shows very well the stiffening of the upstream slope of the wave (in red) and the decrease of the downstream slope: this illustrates the importance of non-linear processes. We will see that they decrease with the amplitude and the period of the wave. In absolute values, the slope of the upstream stiffening is greater than that of the downstream subsidence.
  • Figure 14: the celerity of the waves decreases and remains very close to the theoretical values ​​given by the theory of the long waves. The same singular point is found at the upstream limit of the slope as in the previous test (X = 10m)
  • Figure 15: The wavelength decreases along the slope. The point of slope failure is also apparent.

Note: At the right of the section X = 12 m, the speed is close to 1.5 m / s Thus for a return trip of 2x20m = 40 m to return to the profile X = 14m, the wave takes 27 s. Thus, the graph of Figure. 11 is located before the (eventual) reflected wave coming from the absorbing upstream boundary, which can disturb the sensors.

Comparative analysis of records

We have exploited all the tests in a transversal manner, so as to implement particular behaviors of the surface waves. This is how we will compare the following parameters:

  • impact of the variation of the amplitude for several tests characterized by the same parameters but with roughnesses, and a template either uniform, or linear
  • impact of the change in the period
  • impact of the variation of the initial amplitude
  • comparison for the same test carried out in uniform or convergent section
  • impact of roughness variation

Impact of the variation of the amplitude for several tests with the same parameters

We have compared several tests characterized by D70, by Ab absorbing boundary conditions and for the same period T5. These are tests D70A5T5, D70A2T2 and D70A5T7 in RoAbUn, SmAbCo and SmAbUn conditions

Figure 16
Figure 17
Figure 18
  • Figure 16: amplitudes variations for the 3 diagrams are increasing according to the slope, which is in accordance with the theory.
  • Figure 17: the initial amplitudes of the waves generated by the wave maker are not always well respected: all the curves of the same diagram should start from the same point to X = 0
  • Figure 18: there is a sharp drop in amplitude at the arrival at the top of the slope.

Impact of period variation on wave propagation conditions

We chose the configuration of rectangular channel D70A4 with convergent banks (SmAbCo) and compare tests realized with different periods (T2, T4, T5 and T6)

Figure 19
Figure 20
Figure 21
Figure 22

comments

  • Figure 19: the amplitude increases along the slope, except for the lowest period (T2) which decreases at the top of the slope. The curves T4 and T5 are quite similar. The curve T6 is lower because it does not start from the same origin
  • Figure 20: The slopes of low frequency waves are very close in absolute value and evolve little, which shows the quasi-linear nature of the propagation. For larger frequencies, upstream stiffening are larger in absolute value than downstream subsidence. This subsidence is maintained at a value close to 1% while the stiffening increases gradually along the slope
  • Figure 21: all waves of the same amplitude propagate upstream with a decreasing speed close to -0.1 m / s / ml, which can be written as: $ dC / dX = -0.1 </ math>. After the point-break of slope, the celerity tends to take a constant value close to 1.6 m / s * Figure 22: the wavelength decreases upstream with intensity varying with amplitude. From previous figures, we can deduce the following empirical relationships: knowing that '''''L = CT''''', the law of variation of the wavelength '''''dL / dX = dC / dx * T = -0.1 * T''''', which can be checked on the figure 22 === Impact of amplitude variation on wave propagation === In order to highlight the impact of the amplitude variation on the wave propagation conditions, we chose to compare several tests corresponding to D70T4 but with different amplitudes: A2, A4 and A5 in the SmAbCo configuration ( smooth bottom, absorbent upstream boundary and convergent banks) {| |- | [[File:G3_D70T4_Amplitude.png|400px|thumb|Figure 23]] || [[File:D70T4 - Wave steepness variation .png|400px|thumb|Figure 24]] |- | [[File:G3_D70T4_celerity.png|400px|thumb|Figure 25]] || [[File:G3_D70T4_Length.png|400px|thumb|Figure 26]] |} comments * Figure 23: The amplitude increases along the axis proportionally to the value of the initial amplitude. For the lowest initial amplitude, the wave does not "increase": the amplitude remains constant along the slope, which confirms the quasi-linear nature of the test * Figure 24: the slopes of the upstream curves of stiffening are more important than the downstream curves of subsidence * Figure 25: The wave speed tends to decrease uniformly regardless of the initial amplitude * Figure 26: the wavelength tends to decrease uniformly regardless of the initial amplitude with a slope close to 30% From previous schemes, we can deduce the following 2 empirical relationships: '''''L=-0,3*X+10,5 et C=-1/12*X+2,6''''' === Demonstration of the convergence effect of the banks with respect to the uniform channel === We chose to compare 2 tests D70A4T4: SmAbUn and SmAbCo {| |- | [[File:Figure26.png|400px|thumb|Figure 26 ]] || [[File:Figure27.png|400px|thumb|Figure 27]] |- | [[File:Figure28.png|400px|thumb|Figure 28]] || [[File:Figure29.png|400px|thumb|Figure 29]] |- | [[File:Figure30.png|400px|thumb|Figure 30]] || [[File:Figure31.png|400px|thumb|Figure 31]] |} comments * the differences between the curves Un and Co appear from the top of the slope (X = 10m) * for low periods (Figures 26, 27, 28 and 31) there is a sharp drop in amplitude below the starting amplitude at the wave maker (X = 0m) * the higher the frequency (Figures 28, 29, 30) is, the lower the curve Co goes down === Impact of bottom roughness on wave propagation conditions === We chose 2 D70A4T4 runs and compare the SmAbUn and RoAbUn configurations {| |- | [[File:G5_D70A4T4_amplitude.png|400px|thumb|Figure 32]] || [[File:D70A4T4 - Wave Steepness comparison .png|400px|thumb|Figure 33]] |- | [[File:D70A4T4 - Wave celerity comparison .png|400px|thumb|Figure 34]] || [[File:D70A4T4 - Wave Length comparison .png|400px|thumb|Figure 35]] |} comments * Figure 32: the change of amplitudes is not very important in intensity. However, a greater roughness causes a damping of the wave amplitude * Figure 33: There are few modifications concerning the stiffening and the subsidence of the waves * Figure 34: few differences in celerity decreasing along the slope, with however the presence in both cases of a peak speed at the high point of the slope failure * Figure 35: few differences for the wavelength that decreases along the slope, with however the presence in both cases of a long wave peak at the high point of the slope failure === Appearance of a particular point in X = 10m === In the curves above, there is a discontinuity at the upstream point of slope failure. Several hypotheses can be advanced: either the sensor did not work well, or it was implanted in the wrong place or there is a particular phenomenon at this point. Note that all the runs carried out in uniform channel (SmAbUn and RoSmUn) present this point whereas the tests carried out in convergent channel (SmAbCo) do not show it. ==Annex== {| |- | [[File:graphique calcul pentes.jpg|600px]] || * Upsream slope : '''''US = A*Dt3/(L*Dt1)''''' * Downstream slope : '''''DS = A*Dt3/(L*Dt2)''''' * L = Distance between 2 gauges |} == Conclusion = = == Test results == The tests conducted at SIWRR are interesting in several ways: * They make possible to highlight the behavior of long waves as they progress in an estuary of rectangular shape, the bottom of which is characterized by a regular slope ascending upstream (example: estuary of the Gironde). Two configurations of variation of sections were studied: uniform on the whole channel on the one hand and convergent upstream on the other hand. * they made it possible to build a database freely available on the internet * Compared to theories, they allowed to verify the following points: : * the wave amplitude increases upstream because of the slope of the rising bottom increased by the restriction of gauge in the configuration with convergent banks : * the curve of the waves remains fairly homogeneous in the case of small amplitudes and weak periods, which shows that the progression is quasi-linear. But the greater the amplitudes or the period is large, the waves stiffen on their upstream face and collapse on their downstream face. : * wavelengths decrease upstream : * the particular behavior of the wave deformations at the point of upstream slope failure (X = 10 m) is not explicable. == Recommendations to modellers == Given the choice of parameters in all of these tests, modelers are recommended to test several types of models: * the most interesting configurations in the sense of the richness of the data produced are D70AiTj (i = 2,4,5 and j = 2,4,5,6) * it is likely that the steep slope makes the Saint-Venant models difficult to use, but it is worthwhile to test them * linearized models can be used for low amplitudes and low periods * non-linearities must be characterized by disconnecting each non-linear term: speed or friction, to highlight their respective impacts * It is recommended to reproduce amplitude and period sensitivity curves (tests D70AiTj) * It is also necessary to finely analyze what happens at the point of upstream slope failure (between the slope and the horizontal at the abscissa X = 10m). The tests have highlighted peculiarities of wave propagation and an accurate examination of the results at this point must be conducted * the comparison of numerical modeling model results with the linear analytical solution in the case of uniform channel and channel with convergent banks is quite relevant insofar as one is in quasi-linear configurations (weak / weak period) amplitude) = Authors = * Hazeme Mohamed: tests conducted at SIWRR in Saigon, Vietnam * Jean-Michel Tanguy: exploitation of the essays and writing of this page We thank Prof. San Dinh, director of the Southern Institute of Water Resources Research in Saigon, Vietnam, for allowing the completion of these trials, the mentoring of the trainee. These tests were made possible thanks to the financing of ENTPE as part of the FORM @ HYDRO project. We would like to thank in particular Bernard Clément, Director of the City & Environment Department, HDR Teacher-Researcher at LEHNA-IPE, ENTPE [[Catégorie:ANSWER]] [[Catégorie:Simulation_sur_modèle_physique]] $
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