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I have the following plot.

lst={{1, 1, 1, 1, 1, 1, 1, 1, 1}, {1, 0, 0, 0, 0, 0, 0, 0, 1}, {1, 0, 0, 
  0, 0, 0, 0, 0, 1}, {1, 0, 0, 0, 0, 0, 0, 0, 1}, {1, 0, 0, 0, 0, 0, 
  0, 0, 1}, {1, 0, 0, 0, 0, 0, 0, 0, 1}, {1, 0, 0, 0, 0, 0, 0, 0, 
  1}, {1, 0, 0, 0, 0, 0, 0, 0, 1}, {1, 1, 1, 1, 1, 1, 1, 1, 1}};
ArrayPlot[lst, Mesh -> All, 
 MeshStyle -> Directive[AbsoluteThickness[3.], Gray, Opacity[0.1]]]

enter image description here

But it does not look as I expected, in which I want the grey boundaries/grids for the black squares to be overshadowed by the color of these black squares. Only show the gray boundaries/grids of the white squares.

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Your question is not very clear to me. I've uploaded the output of your code to your question. From my understanding of your question re: "Only show the gray boundaries/grids of the white squares.", the output looks correct. There are no gray boundaries for the black squares. Did you have something else in mind or are you getting a different output? Or did you mean the outermost gray border? –  r.m. Dec 31 '11 at 18:25
    
@yoda: You can still see some shadows of the boundaries for the black squares, don't you? –  user1096734 Dec 31 '11 at 18:28
    
I see it now. It wasn't apparent at first (probably because of my monitor), but changing it to a brighter color revealed it. This might not be straightforward, because Grids are always layed after the rest of the graphic is drawn. There is an undocumented option to work around this, but I can't seem to remember it right now. Let me search... –  r.m. Dec 31 '11 at 18:41
    
@yoda, I think you are looking for Method->{"GridLinesInFront"->True} sub-option for GridLines? I think regardless of which one (Mesh or GridLines) one uses, the solution will require use of a customized styling function for MeshStyle or GridLinesStyle that uses the value of the data in the neighboring cells to color segments of each mesh/grid line. Not straightforward indeed... –  kguler Dec 31 '11 at 19:09
    
@kguler Yeah, I found that but that didn't work either. I have a custom solution below that's a reasonable workaround for now. –  r.m. Dec 31 '11 at 19:29

2 Answers 2

up vote 4 down vote accepted

This isn't something that can be easily solved using built in options (AFAIK). You can define a custom function that plots the gridlines only at those rows and columns that you need and masks the others. Here is my solution:

gridArrayPlot[mat_?MatrixQ, options___] := Module[{dim = Dimensions@mat},
  Show[
    ArrayPlot[mat, Mesh -> ({Range[#1 - 1], Range[#2 - 1]} & @@ dim), options],
    ArrayPlot[mat, Mesh -> ({{0, #1}, {0, #2}} & @@ dim), 
       ColorRules -> {0 -> Directive[Opacity@0, White]}, 
       options /. Opacity[_] :> Opacity[1] /. (RGBColor[___] | GrayLevel[_]) :> White
    ]
  ]
]

The above solution first plots an ArrayPlot, drawing the mesh everywhere except at the outer boundaries and overlays a second ArrayPlot with the White cells set to be transparent, and draws White mesh lines on the outer boundary (to mask the bits sticking out from the previous plot).

You can call the above function as

gridArrayPlot[lst,MeshStyle -> Directive[AbsoluteThickness[3.],Gray,Opacity[0.1]]]

and the output is:

enter image description here

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How about just ditching grid lines and mesh lines and using Epilog and Line?

ArrayPlot[lst, Mesh -> False, Frame -> False, 
 Epilog -> {GrayLevel[0.5], AbsoluteThickness[1], 
   Line@Table[{{2 + i, 8}, {2 + i, 1}}, {i, 0, 5}], 
   Line@Table[{{1, 2 + i}, {8, 2 + i}}, {i, 0, 5}]}]

enter image description here

This is obviously specific to this list of data but is straight forward to generalize to data where you have "x" unit black "perimeter" and "y" times "y" white square (i.e. a y+2x list of rows and columns).

gridArrayPlot[mat_?MatrixQ] := Module[{dim = First@Dimensions@mat, 
  white = Length@Cases[mat, {__, 0 .., __}], black, left, right, grid},

  black = (dim - white)/2;
  left = black + 1;
  right = dim - black;
  grid = white - 2;

  ArrayPlot[mat, Mesh -> False, Frame -> False, 
   Epilog -> {GrayLevel[0.5], AbsoluteThickness[1], 
     Line@Table[{{left + i, right}, {left + i, black}}, {i, 0, grid}],
      Line@Table[{{black, left + i}, {right, left + i}}, {i, 0, grid}]}]

  ]
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