Detecting grid size by using the FFT

>Hi everybody,
>
>I am trying to automatically detect the grid size of counting chambers:
>http://tweakers.net/ext/f/qxSACpwr36khxQfNC0hlqqGO/full.png
>My idea was to do this by applying the following steps:
>
>1) Crop the image to square size
>2) Calculate the MEAN of the image and subtract this value from all pixel
>values
>3) Calculate the FFT
>4) Find the maxima locations close to the center of the FFT and use the
>distance to the center to calculate the distance in pixels
>
>I am now stuck at step (4)...When I was searching how to do this I stumbled
>upon this post of Michael Schmid:
>http://imagej.1557.n6.nabble.com/fft-maxima-td3682605.html
>It seems that analyzing the FFT (from the window) is not a good idea (can
>anyone confirm this?). So I calculated the raw Power Spectrum, but I get a
>almost complete black image. I experimented with this a little, for example
>by subtracting (size^2) from the pixel values and applying a Math>Log. But
>there doesn't seem to change much...
>
>Can someone help me with this problem? A brief explanation of how this is
>usually done would be very helpful!
>Also it is not completely clear to me how I calculate the square size in
>pixels (px) from the FFT (or Power Spectrum).
>
>Thanks in advance!
>
>Best,
>
>Tom

>Thanks guys!
>
>Applying gamma corrections or taking the nth order square root works!
>See: http://tweakers.net/ext/f/V05DVyciM7s0LIAtvfA7CRfR/full.png
>
>Now the only question that remains is how I calculate the size of the
>(smallest) squares of the grid in pixels.
>When I measure the size in the original image this is approximately 52
>pixels. The peak in the power spectrum that is closest to the center has a
>distance of ~40 pixels to the center of the PS.
>
>gr,
>
>Tom
>
>
>2012/2/27 Herbie <[hidden email]>
>
>>   Hi everybody,
>>>
>>>  I am trying to automatically detect the grid size of counting chambers:
>>>
>>>http://tweakers.net/ext/f/**qxSACpwr36khxQfNC0hlqqGO/full.**png<http://tweakers.net/ext/f/qxSACpwr36khxQfNC0hlqqGO/full.png>
>>>  My idea was to do this by applying the following steps:
>>>
>>>  1) Crop the image to square size
>>>  2) Calculate the MEAN of the image and subtract this value from all pixel
>>>  values
>>>  3) Calculate the FFT
>>>  4) Find the maxima locations close to the center of the FFT and use the
>>>  distance to the center to calculate the distance in pixels
>>>
>>>  I am now stuck at step (4)...When I was searching how to do this I
>>>  stumbled
>>>  upon this post of Michael Schmid:
>>>
>>>http://imagej.1557.n6.nabble.**com/fft-maxima-td3682605.html<http://imagej.1557.n6.nabble.com/fft-maxima-td3682605.html>
>>>  It seems that analyzing the FFT (from the window) is not a good idea (can
>>>  anyone confirm this?). So I calculated the raw Power Spectrum, but I get a
>>>  almost complete black image. I experimented with this a little, for
>>>  example
>>>  by subtracting (size^2) from the pixel values and applying a Math>Log. But
>>>  there doesn't seem to change much...
>>>
>>>  Can someone help me with this problem? A brief explanation of how this is
>>>  usually done would be very helpful!
>>>  Also it is not completely clear to me how I calculate the square size in
>>>  pixels (px) from the FFT (or Power Spectrum).
>>>
>>>  Thanks in advance!
>>>
>>>  Best,
>>>
>>>  Tom
>>>
>>
>>
>>  Tom,
>>
>>  no problem here.
>>
>>  You may try to take the 4th square root of the Power Spectrum.
>>  Yes, and don't forget to reset in the "Brightnness/Contrast"-Window.
>>
>>  HTH
>>
>>                   Herbie
>>
>>          ------------------------
>>          <http://www.gluender.de>
>>

>Oke, thanks!
>But how do you come from 40px in the FD to 25.6px in the SD?
>
>gr,
>
>Tom
>
>
>2012/2/27 Herbie <[hidden email]>
>
>>  Dear,
>>
>>  as far as I measure, the smallest line distance is about 26 pixels. This
>>  fits nicely with your spectral peak-distance of 40 which corresponds to
>>  25.6 pixels in the spatial domain.
>>
>  >                  Herbie
>>
>>          ------------------------
>>          <http://www.gluender.de>
>>
>>
>>   Thanks guys!
>>>
>>>  Applying gamma corrections or taking the nth order square root works!
>>>  See:
>>>http://tweakers.net/ext/f/**V05DVyciM7s0LIAtvfA7CRfR/full.**png<http://tweakers.net/ext/f/V05DVyciM7s0LIAtvfA7CRfR/full.png>
>>>
>>>  Now the only question that remains is how I calculate the size of the
>>>  (smallest) squares of the grid in pixels.
>>>  When I measure the size in the original image this is approximately 52
>  >> pixels. The peak in the power spectrum that is closest to the center has a
>  >> distance of ~40 pixels to the center of the PS.
>>>
>>>  gr,
>>>
>>>  Tom
>>>
>>>
>>>  2012/2/27 Herbie <[hidden email]>
>>>
>>>    Hi everybody,
>>>>
>>>>>
>>>>>   I am trying to automatically detect the grid size of counting chambers:
>>>>>
>>>>>
>>>>>http://tweakers.net/ext/f/****qxSACpwr36khxQfNC0hlqqGO/full.****png<http://tweakers.net/ext/f/**qxSACpwr36khxQfNC0hlqqGO/full.**png>
>>>>>
>>>>><http://tweakers.net/ext/**f/qxSACpwr36khxQfNC0hlqqGO/**full.png<http://tweakers.net/ext/f/qxSACpwr36khxQfNC0hlqqGO/full.png>
>>>>>  >
>>>>>
>>>>>   My idea was to do this by applying the following steps:
>>>>>
>>>>>   1) Crop the image to square size
>>>>>   2) Calculate the MEAN of the image and subtract this value from all
>>>>>  pixel
>>>>>   values
>>>>>   3) Calculate the FFT
>>>>>   4) Find the maxima locations close to the center of the FFT and use the
>>>>>   distance to the center to calculate the distance in pixels
>>>>>
>>>>>   I am now stuck at step (4)...When I was searching how to do this I
>>>>>   stumbled
>>>>>   upon this post of Michael Schmid:
>>>>>
>>>>>  http://imagej.1557.n6.nabble.****com/fft-maxima-td3682605.**html<
>>>>>
>>>>>http://imagej.1557.n6.**nabble.com/fft-maxima-**td3682605.html<http://imagej.1557.n6.nabble.com/fft-maxima-td3682605.html>
>>>>>  >
>>>>>
>>>>>   It seems that analyzing the FFT (from the window) is not a good idea
>>>>>  (can
>>>>>   anyone confirm this?). So I calculated the raw Power Spectrum, but I
>>>>>  get a
>>>>>   almost complete black image. I experimented with this a little, for
>>>>>   example
>>>>>   by subtracting (size^2) from the pixel values and applying a Math>Log.
>>>>>  But
>>>>>   there doesn't seem to change much...
>>>>>
>>>>>   Can someone help me with this problem? A brief explanation of how this
>>>>>  is
>>>>>   usually done would be very helpful!
>>>>>   Also it is not completely clear to me how I calculate the square size
>>>>>  in
>>>>>   pixels (px) from the FFT (or Power Spectrum).
>  >>>>
>>>>>   Thanks in advance!
>>>>>
>>>>>   Best,
>>>>>
>>>>>   Tom
>>>>>
>>>>>
>>>>
>>>>   Tom,
>>>>
>>>>   no problem here.
>>>>
>>>>   You may try to take the 4th square root of the Power Spectrum.
>>>>   Yes, and don't forget to reset in the "Brightnness/Contrast"-Window.
>>>>
>>>>   HTH
>>>>
>>>>                   Herbie
>>>>
>>>>          ------------------------
>>>>          <http://www.gluender.de>
>>>>
>>>>

>delta_FD = distance in the Fourier Domain
>delta_SD = distance in the Spatial Domain
>N = width of the image in pixels
>
>But applying this formula does not lead me to anything. Can anyone
>recommend a website/source where I can find some information about this?
>Thanks!
>
>gr,
>
>Tom

>2012/2/28 Herbie <[hidden email]>
>
>>  Dear,
>>
>>  not sure what you want to achieve by Fourier-transforming your image.
>>
>>  You write that
>>
>>
>>         "The peak in the power spectrum that is closest to the center has a
>>         distance of ~40 pixels to the center of the PS."
>>
>>  but I neither can confirm this, nor would the closest peak give you any
>>  information about the finest grid, i.e. the corresponding spatial frequency.
>>
>>  A closer look at your image reveals that at least the spectral information
>>  about the coarsest grid is well hidden in low frequency components caused
>>  by fluctuations in your image of similar periods. It should be observed at
>>  about 4 pixels from the spectral origin. For the next finer grid, a peak at
>>  about 20 pixels is to be expected but hardly to detect.
>>
>>  In short, there is not enough "energy" in the grid lines to reliably
>>  detect their periods in the Fourier spectrum.
>>
>>  As far as Fourier-transformation and especially FFT is concerned, you may
>>  consult a good text book dealing with these topics. The idea of
>>  Fourier-transformation is quite simple but its proper use is sometimes
>>  rather involved.
>>
>>  Best
>>
>>                   Herbie
>>
>>          ------------------------
>>          <http://www.gluender.de>
>>
>>   Oke, thanks!
>>>  But how do you come from 40px in the FD to 25.6px in the SD?
>>>
>>>  gr,
>>>
>>>  Tom
>>>
>>>
>>>  2012/2/27 Herbie <[hidden email]>
>>>
>>>    Dear,
>>>>
>>>>   as far as I measure, the smallest line distance is about 26 pixels. This
>>>>   fits nicely with your spectral peak-distance of 40 which corresponds to
>>>>   25.6 pixels in the spatial domain.
>>>>
>>>>    >                  Herbie
>>>
>>>>
>>>>          ------------------------
>>>>          <http://www.gluender.de>
>>>>
>>>>
>>>>   Thanks guys!
>>>>
>>>>>
>>>>>   Applying gamma corrections or taking the nth order square root works!
>>>>>   See: http://tweakers.net/ext/f/****V05DVyciM7s0LIAtvfA7CRfR/full.**
>>>>>  **png <http://tweakers.net/ext/f/**V05DVyciM7s0LIAtvfA7CRfR/full.**png>
>>>>>
>>>>><http://tweakers.net/ext/**f/V05DVyciM7s0LIAtvfA7CRfR/**full.png<http://tweakers.net/ext/f/V05DVyciM7s0LIAtvfA7CRfR/full.png>
>>>>>  >
>>>>>
>>>>>
>  >>>>  Now the only question that remains is how I calculate the size of the
>>>>>   (smallest) squares of the grid in pixels.
>>>>>   When I measure the size in the original image this is approximately 52
>>>>>
>>>>   >> pixels. The peak in the power spectrum that is closest to the center
>>>  has a
>>>   >> distance of ~40 pixels to the center of the PS.
>>>
>>>>
>>>>>   gr,
>>>>>
>>>>>   Tom
>>>>>
>>>>>
>>>>>   2012/2/27 Herbie <[hidden email]>
>>>>>
>>>>>    Hi everybody,
>>>>>
>>>>>>
>>>>>>
>>>>>>>   I am trying to automatically detect the grid size of counting
>>>>>>>  chambers:
>>>>>>>
>>>>>>>
>>>>>>>  http://tweakers.net/ext/f/******qxSACpwr36khxQfNC0hlqqGO/full.**
>>>>>>>
>>>>>>>****png<http://tweakers.net/ext/f/****qxSACpwr36khxQfNC0hlqqGO/full.****png>
>>>>>>>  <http://tweakers.net/**ext/f/****qxSACpwr36khxQfNC0hlqqGO/full.**
>>>>>>>  **png<http://tweakers.net/ext/f/**qxSACpwr36khxQfNC0hlqqGO/full.**png>
>>>>>>>  >
>>>>>>>
>>>>>>>
>>>>>>><http://tweakers.net/ext/**f/**qxSACpwr36khxQfNC0hlqqGO/****full.png<http://tweakers.net/ext/**f/qxSACpwr36khxQfNC0hlqqGO/**full.png>
>>>>>>>
>>>>>>><http://tweakers.net/**ext/f/**qxSACpwr36khxQfNC0hlqqGO/full.**png<http://tweakers.net/ext/f/qxSACpwr36khxQfNC0hlqqGO/full.png>
>>>>>>>  >
>>>>>>>
>>>>>>>   >
>>>>>>>
>>>>>>>   My idea was to do this by applying the following steps:
>>>>>>>
>>>>>>>   1) Crop the image to square size
>>>>>>>   2) Calculate the MEAN of the image and subtract this value from all
>>>>>>>   pixel
>>>>>>>   values
>>>>>>>   3) Calculate the FFT
>>>>>>>   4) Find the maxima locations close to the center of the FFT and use
>>>>>>>  the
>>>>>>>   distance to the center to calculate the distance in pixels
>>>>>>>
>>>>>>>   I am now stuck at step (4)...When I was searching how to do this I
>>>>>>>   stumbled
>>>>>>>   upon this post of Michael Schmid:
>>>>>>>
>>>>>>>   http://imagej.1557.n6.nabble.******com/fft-maxima-td3682605.****
>>>>>>>  html<
>>>>>>>
>>>>>>>
>>>>>>>http://imagej.1557.n6.**nabble**.com/fft-maxima-**td3682605.**html<http://nabble.com/fft-maxima-**td3682605.html>
>>>>>>>
>>>>>>><http://imagej.1557.n6.**nabble.com/fft-maxima-**td3682605.html<http://imagej.1557.n6.nabble.com/fft-maxima-td3682605.html>
>>>>>>>  >
>>>>>>>
>>>>>>>   >
>>>>>>>
>>>>>>>   It seems that analyzing the FFT (from the window) is not a good idea
>>>>>>>   (can
>>>>>>>   anyone confirm this?). So I calculated the raw Power Spectrum, but I
>>>>>>>   get a
>>>>>>>   almost complete black image. I experimented with this a little, for
>>>>>>>   example
>>>>>>>   by subtracting (size^2) from the pixel values and applying a
>>>>>>>  Math>Log.
>>>>>>>   But
>>>>>>>   there doesn't seem to change much...
>>>>>>>
>>>>>>>   Can someone help me with this problem? A brief explanation of how
>>>>>>>  this
>>>>>>>   is
>>>>>>>   usually done would be very helpful!
>>>>>>>   Also it is not completely clear to me how I calculate the square size
>>>>>>>   in
>>>>>>>   pixels (px) from the FFT (or Power Spectrum).
>>>>>>>
>>>>>>   >>>>
>>>
>>>>    Thanks in advance!
>>>>>>>
>>>>>>>   Best,
>>>>>>>
>>>>>>>   Tom
>>>>>>>
>>>>>>>
>>>>>>>
>>>>>>   Tom,
>>>>>>
>>>>>>   no problem here.
>>>>>>
>>>>>>   You may try to take the 4th square root of the Power Spectrum.
>>>>>>   Yes, and don't forget to reset in the "Brightnness/Contrast"-Window.
>>>>>>
>>>>>>   HTH
>>>>>>
>>>>>>                   Herbie
>>>>>>
>>>>>>          ------------------------
>>>>>>          <http://www.gluender.de>
>>>>>>
>>>>>>
>>>>>>
>>
>>  --
>>
>>                   Herbie
>>
>>          ------------------------
>>          <http://www.gluender.de>
>>

>Funny you,
>
>sending an image to the list with a question for analysis and now you write
>
>>Never mind my images!
>>
>>I have some knowledge about Fourier Transforms (undergraduate course), but
>>I just don't know how to translate a peak in the power spectrum back to a
>>distance in the spatial domain.
>
>If so, you will find the answer in your course notes.
>Furthermore I gave you three examples, from which you may conclude
>the answer to your question.
>
>>I was hoping the ImageJ user manual would
>>briefly describe how to do it, but unfortunately it does not mention it.
>
>Of course the manuals deal with the IJ-program not with properties of the FFT.
>
>>In the documentation of DIPimage, the image analysis toolkit for MatLAB I
>>found the formula:
>>
>>*delta_FD = 1 / (delta_SD * N)*
>
>In fact, this doesn't make sense but I think you didn't read carefully.
>
>>delta_FD = distance in the Fourier Domain
>>delta_SD = distance in the Spatial Domain
>>N = width of the image in pixels
>>
>>But applying this formula does not lead me to anything. Can anyone
>>recommend a website/source where I can find some information about this?
>>Thanks!
>>
>>gr,
>>
>>Tom
>
>For the FFT holds:
>The borders of the frequency plane (with the origin in the center)
>evidently are the Nyquist frequency
> f_N = f_0/2
>i.e. half the sampling frequnecy f_0. From this we obtain that the
>pixel to pixel spacing in the spatial domain is
> X = 1/f_0 = 2 * f_N;
>Now set X = 1 and f_0 = n, where n is the image size.
>With the rule of three you get
> 1/1 corresponds to n
> 1/x corresponds to f
>where x is the _period_ (not a distance!)) in the space domain and f
>is the location (in spectral pixels) of the corresponding spectral
>component with respect to the origin.
>
>HTH
>
>                   Herbie
>
>          ------------------------
>          <http://www.gluender.de>
>
>>2012/2/28 Herbie <[hidden email]>
>>
>>>  Dear,
>>>
>>>  not sure what you want to achieve by Fourier-transforming your image.
>>>
>>>  You write that
>>>
>>>
>>>         "The peak in the power spectrum that is closest to the center has a
>>>         distance of ~40 pixels to the center of the PS."
>>>
>>>  but I neither can confirm this, nor would the closest peak give you any
>>>  information about the finest grid, i.e. the corresponding spatial
>>>frequency.
>>>
>>>  A closer look at your image reveals that at least the spectral information
>>>  about the coarsest grid is well hidden in low frequency components caused
>>>  by fluctuations in your image of similar periods. It should be observed at
>>>  about 4 pixels from the spectral origin. For the next finer grid, a peak at
>>>  about 20 pixels is to be expected but hardly to detect.
>>>
>>>  In short, there is not enough "energy" in the grid lines to reliably
>>>  detect their periods in the Fourier spectrum.
>>>
>>>  As far as Fourier-transformation and especially FFT is concerned, you may
>>>  consult a good text book dealing with these topics. The idea of
>>>  Fourier-transformation is quite simple but its proper use is sometimes
>>>  rather involved.
>>>
>>>  Best
>>>
>>>                   Herbie
>>>
>>>          ------------------------
>>>          <http://www.gluender.de>
>>>
>>>   Oke, thanks!
>>>>  But how do you come from 40px in the FD to 25.6px in the SD?
>>>>
>>>>  gr,
>>>>
>>>>  Tom
>>>>
>>>>
>>>>  2012/2/27 Herbie <[hidden email]>
>>>>
>>>>    Dear,
>>>>>
>>>>>   as far as I measure, the smallest line distance is about 26 pixels. This
>>>>>   fits nicely with your spectral peak-distance of 40 which corresponds to
>>>>>   25.6 pixels in the spatial domain.
>>>>>
>>>>>    >                  Herbie
>>>>
>>>>>
>>>>>          ------------------------
>>>>>          <http://www.gluender.de>
>>>>>
>>>>>
>>>>>   Thanks guys!
>>>>>
>>>>>>
>>>>>>   Applying gamma corrections or taking the nth order square root works!
>>>>>>   See: http://tweakers.net/ext/f/****V05DVyciM7s0LIAtvfA7CRfR/full.**
>>>>>>  **png <http://tweakers.net/ext/f/**V05DVyciM7s0LIAtvfA7CRfR/full.**png>
>>>>>>
>>>>>><http://tweakers.net/ext/**f/V05DVyciM7s0LIAtvfA7CRfR/**full.png<http://tweakers.net/ext/f/V05DVyciM7s0LIAtvfA7CRfR/full.png>
>>>>>>  >
>>>>>>
>>  >>>>  Now the only question that remains is how I calculate the size of the
>>>>>>   (smallest) squares of the grid in pixels.
>>>>>>   When I measure the size in the original image this is approximately 52
>>>>>>
>>>>>   >> pixels. The peak in the power spectrum that is closest to the center
>>>>  has a
>>>>   >> distance of ~40 pixels to the center of the PS.
>>>>
>>>>>
>>>>>>   gr,
>>>>>>
>>>>>>   Tom
>>>>>>
>>>>>>
>>>>>>   2012/2/27 Herbie <[hidden email]>
>>>>>>
>>>>>>    Hi everybody,
>>>>>>
>>>>>>>
>>>>>>>
>>>>>>>>   I am trying to automatically detect the grid size of counting
>>>>>>>>  chambers:
>>>>>>>>
>>>>>>>>
>>>>>>>>  http://tweakers.net/ext/f/******qxSACpwr36khxQfNC0hlqqGO/full.**
>>>>>>>>
>>>>>>>>****png<http://tweakers.net/ext/f/****qxSACpwr36khxQfNC0hlqqGO/full.****png>
>>>>>>>>  <http://tweakers.net/**ext/f/****qxSACpwr36khxQfNC0hlqqGO/full.**
>>>>>>>>  **png<http://tweakers.net/ext/f/**qxSACpwr36khxQfNC0hlqqGO/full.**png>
>>>>>>>>  >
>>>>>>>>
>>>>>>>>
>>>>>>>><http://tweakers.net/ext/**f/**qxSACpwr36khxQfNC0hlqqGO/****full.png<http://tweakers.net/ext/**f/qxSACpwr36khxQfNC0hlqqGO/**full.png>
>>>>>>>>
>>>>>>>><http://tweakers.net/**ext/f/**qxSACpwr36khxQfNC0hlqqGO/full.**png<http://tweakers.net/ext/f/qxSACpwr36khxQfNC0hlqqGO/full.png>
>>>>>>>>  >
>>>>>>>>
>>>>>>>>   >
>>>>>>>>
>>>>>>>>   My idea was to do this by applying the following steps:
>>>>>>>>
>>>>>>>>   1) Crop the image to square size
>>>>>>>>   2) Calculate the MEAN of the image and subtract this value from all
>>>>>>>>   pixel
>>>>>>>>   values
>>>>>>>>   3) Calculate the FFT
>>>>>>>>   4) Find the maxima locations close to the center of the FFT and use
>>>>>>>>  the
>>>>>>>>   distance to the center to calculate the distance in pixels
>>>>>>>>
>>>>>>>>   I am now stuck at step (4)...When I was searching how to do this I
>>>>>>>>   stumbled
>>>>>>>>   upon this post of Michael Schmid:
>>>>>>>>
>>>>>>>>   http://imagej.1557.n6.nabble.******com/fft-maxima-td3682605.****
>>>>>>>>  html<
>>>>>>>>
>>>>>>>>
>>>>>>>>http://imagej.1557.n6.**nabble**.com/fft-maxima-**td3682605.**html<http://nabble.com/fft-maxima-**td3682605.html>
>>>>>>>>
>>>>>>>><http://imagej.1557.n6.**nabble.com/fft-maxima-**td3682605.html<http://imagej.1557.n6.nabble.com/fft-maxima-td3682605.html>
>>>>>>>>  >
>>>>>>>>
>>>>>>>>   >
>>>>>>>>
>>>>>>>>   It seems that analyzing the FFT (from the window) is not a good idea
>>>>>>>>   (can
>>>>>>>>   anyone confirm this?). So I calculated the raw Power Spectrum, but I
>>>>>>>>   get a
>>>>>>>>   almost complete black image. I experimented with this a little, for
>>>>>>>>   example
>>>>>>>>   by subtracting (size^2) from the pixel values and applying a
>>>>>>>>  Math>Log.
>>>>>>>>   But
>>>>>>>>   there doesn't seem to change much...
>>>>>>>>
>>>>>>>>   Can someone help me with this problem? A brief explanation of how
>>>>>>>>  this
>>>>>>>>   is
>>>>>>>>   usually done would be very helpful!
>>>>>>>>   Also it is not completely clear to me how I calculate the square size
>>>>>>>>   in
>>>>>>>>   pixels (px) from the FFT (or Power Spectrum).
>>>>>>>>
>>>>>>>   >>>>
>>>>
>>>>>    Thanks in advance!
>>>>>>>>
>>>>>>>>   Best,
>>>>>>>>
>>>>>>>>   Tom
>>>>>>>>
>>>>>>>>
>>>>>>>   Tom,
>>>>>>>
>>>>>>>   no problem here.
>>>>>>>
>>>>>>>   You may try to take the 4th square root of the Power Spectrum.
>>>>>>>   Yes, and don't forget to reset in the "Brightnness/Contrast"-Window.
>>>>>>>
>>>>>>>   HTH
>>>>>>>
>>>>>>>                   Herbie
>>>>>>>
>>>>>>>          ------------------------
>>>>>>>          <http://www.gluender.de>
>>>>>>>
>>>>>>>
>>>
>>>  --
>>>
>>>                   Herbie
>>>
>>>          ------------------------
>>>          <http://www.gluender.de>