Difference between revisions of "Rayleigh-Bloch Waves"

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Rayleigh--Bloch waves are waves which travel along an [[Infinite Array]] and which decay exponentially away from the array. Only in very exceptional cases are they excited by plane incident waves [[Porter_Evans_05|Porter & Evans (2005)]]. Rayleigh--Bloch waves (if they can be
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Rayleigh-Bloch waves are waves which travel along an  
supported by the structure) will be excited in a [[Semi-Infinite Array]] provided that <math>k < \pi/R</math> (where <math>k</math> is the wavenumber of the incident wave and <math>R</math> is the body spacing of the array).  
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[[:Category:Infinite Array|Infinite Array]].
 +
Generally, they propagate along the array with a dominant wavenumber which is greater than that for freely-propagating waves and they decay exponentially away from the array. They have other names (guided waves, surface waves) in acoustics and electromagnetics.  Only in very exceptional cases are they excited by plane incident waves ([[Porter and Evans 2005]]). Rayleigh-Bloch waves (if they can be supported by the structure) will be excited in a [[Semi-Infinite Array]] provided that <math> \ k < \pi/R \ </math> (where <math>k</math> is the wavenumber of the incident wave and <math>R</math> is the body spacing of the array).  
  
Rayleigh--Bloch waves are observed for a very general class of arrays, where the medium is governed by the two-dimensional [[Helmholtz's Equation]] (cf. [[Linton_Mciver_02|Linton & McIver 2002]]). In the water-wave context this means that the structures must have a depth dependence which can be removed (cf. [[Removing The Depth Dependence]]), so that the problem reduces to two dimensions. In the more general water-wave context, no Rayleigh--Bloch waves have been found. It seems likely that such waves will exist only for very special geometries and frequencies, but this remains only a conjecture at the present time. There are many off-shore structures which do support Rayleigh--Bloch waves, e.g. [[Bottom Mounted Cylinder|Bottom-Mounted Cylinders]].
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[[Image:RB_wiki.jpg|thumb|right|Rayleigh-Bloch wave travelling down an infinite array of bottom-mounted cylinders]]
Some more information on Rayleigh--Bloch waves can be found in [[Porter_Evans_99|Porter & Evans (1999)]] and [[Linton_Mciver_02|Linton & McIver (2002)]].
 
  
The Rayleigh--Bloch wavenumber <math>\beta</math> is the value for which the operator
+
Rayleigh-Bloch waves are observed for a very general class of arrays, where the medium is governed by the two-dimensional [[Helmholtz's Equation]] (cf. [[Linton and McIver 2002]]). In the water-wave context this means that the structures must have a depth dependence which can be removed (cf. [[Removing The Depth Dependence]]), so that the problem reduces to two dimensions. In the more general water-wave context, no Rayleigh-Bloch waves have been found (see [[Peter and Meylan 2007]] for a discussion). It seems likely that such waves will exist only for very special geometries and frequencies, but this remains only a conjecture at the present time. There are many off-shore structures which do support Rayleigh-Bloch waves, e.g. [[Bottom Mounted Cylinder|Bottom-Mounted Cylinders]].
 +
Some more information on Rayleigh--Bloch waves can be found in [[Porter and Evans 1999]] and [[Linton and McIver 2002]].
 +
 
 +
The Rayleigh-Bloch wavenumber <math>\beta</math> is the value for which the operator
 
<math>-\nabla^2</math>, subject to the periodicity conditions
 
<math>-\nabla^2</math>, subject to the periodicity conditions
  
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and appropriate boundary conditions at the body surfaces, has an
 
and appropriate boundary conditions at the body surfaces, has an
eigenvalue in the interval <math>(k,\pi/R]</math>. This corresponds to a wave
+
eigenvalue in the interval <math> \ (k,\pi/R] \ </math>. This corresponds to a wave
 
travelling down the array with phase factor  
 
travelling down the array with phase factor  
  
 
<math>
 
<math>
  Q_j = \mathrm{e}^{\mathrm{i} j R \beta}.
+
\ Q_j = \mathrm{e}^{\mathrm{i} j R \beta}.
 
</math>
 
</math>
 +
 +
An example is given in the plot.
 +
 +
[[Category:Infinite Array]]

Latest revision as of 11:37, 23 September 2010

Rayleigh-Bloch waves are waves which travel along an Infinite Array. Generally, they propagate along the array with a dominant wavenumber which is greater than that for freely-propagating waves and they decay exponentially away from the array. They have other names (guided waves, surface waves) in acoustics and electromagnetics. Only in very exceptional cases are they excited by plane incident waves (Porter and Evans 2005). Rayleigh-Bloch waves (if they can be supported by the structure) will be excited in a Semi-Infinite Array provided that [math]\displaystyle{ \ k \lt \pi/R \ }[/math] (where [math]\displaystyle{ k }[/math] is the wavenumber of the incident wave and [math]\displaystyle{ R }[/math] is the body spacing of the array).

Rayleigh-Bloch wave travelling down an infinite array of bottom-mounted cylinders

Rayleigh-Bloch waves are observed for a very general class of arrays, where the medium is governed by the two-dimensional Helmholtz's Equation (cf. Linton and McIver 2002). In the water-wave context this means that the structures must have a depth dependence which can be removed (cf. Removing The Depth Dependence), so that the problem reduces to two dimensions. In the more general water-wave context, no Rayleigh-Bloch waves have been found (see Peter and Meylan 2007 for a discussion). It seems likely that such waves will exist only for very special geometries and frequencies, but this remains only a conjecture at the present time. There are many off-shore structures which do support Rayleigh-Bloch waves, e.g. Bottom-Mounted Cylinders. Some more information on Rayleigh--Bloch waves can be found in Porter and Evans 1999 and Linton and McIver 2002.

The Rayleigh-Bloch wavenumber [math]\displaystyle{ \beta }[/math] is the value for which the operator [math]\displaystyle{ -\nabla^2 }[/math], subject to the periodicity conditions

[math]\displaystyle{ \phi|_{x=0} = \mathrm{e}^{\mathrm{i} R \beta }\phi|_{x=R}, \quad \partial_x \phi|_{x=0} = \mathrm{e}^{\mathrm{i} R \beta } \partial_x \phi|_{x=R} }[/math]

and appropriate boundary conditions at the body surfaces, has an eigenvalue in the interval [math]\displaystyle{ \ (k,\pi/R] \ }[/math]. This corresponds to a wave travelling down the array with phase factor

[math]\displaystyle{ \ Q_j = \mathrm{e}^{\mathrm{i} j R \beta}. }[/math]

An example is given in the plot.