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I want to use gridlines to create an effect of millimeter graphing paper on a 2d graph, to show how multi-variable function depends on 1 variable. The scales of different variables differ a lot, so my naive approach (that I have used before) does not seem to work.

Example of what I have at the moment:

<< ErrorBarPlots`
Cmb[x_, y_, ex_, ey_] := {{N[x], N[y]}, ErrorBar[ex, ey]};
SetAttributes[Cmb, Listable];

ELP[x_, y_, ex_, ey_, name_] :=
 ErrorListPlot[
  Cmb[x, y, ex, ey],
  PlotRange -> FromTo[x, y],
  PlotLabel -> name,
  Joined -> True, Frame -> True, GridLines -> GetGrid,
  ImageSize -> {600}
 ]

Both FromTo (I want to leave 5% margin in the frame) and GetGrid do not work exactly as I want them to.

On some axes the variables differs many orders of 10. And I do not want, that one axis has many orders of 10 gridlines more then other. And most importantly I want the gridlines to line up with ticks.

Sample data:

ELP[
  {4124961/25000000, 27573001/100000000, 9162729/25000000, 44635761/
   100000000, 15737089/25000000, 829921/1562500, 4405801/4000000, 
   23068809/25000000, 329386201/100000000, 58079641/100000000},
  {1/10, 1/5, 3/10, 2/5, 3/5, 1/2, 1/2, 1/2, 1/2, 1/2},
  {2031/(250000 Sqrt[10]), 5251/(500000 Sqrt[10]), 3027/(
   250000 Sqrt[10]), 6681/(500000 Sqrt[10]), 3967/(250000 Sqrt[10]), 
   911/(62500 Sqrt[10]), 2099/(100000 Sqrt[10]), 4803/(
   250000 Sqrt[10]), 18149/(500000 Sqrt[10]), 7621/(500000 Sqrt[10])},
  {1/2000, 1/1000, 3/2000, 1/500, 3/1000, 1/400, 1/400, 1/400, 1/400, 
   1/400},
  "T2, m"
]

Would result in:

enter image description here

And my naive GetGrid, that works in some sence:

FromTo[x_, y_] := Module[{dx, dy},
   dx = (Max[x] - Min[x])*0.1;
   dy = (Max[y] - Min[y])*0.1;
   {{Min[x] - dx, Max[x] + dx}, {Min[y] - dy, Max[y] + dy}}];
GetGrid[min_, max_] := Module[{step, i},
  step = (max - min)/100;
  Table[
   {min + i*step,
    If[Equal[Mod[i, 10], 0],
     Directive[Gray, Thick, Opacity[0.5]],
     If[Equal[Mod[i, 5], 0],
      Directive[Gray, Opacity[0.5]],
      Directive[LightGray, Opacity[0.5]]
      ]]},
   {i, 1, 100}]
  ]

Question

How to make GridLines line up with ticks?

edit: With

GetTicks[x_, y_] := Module[{dx, dy},
   dx = (Max[x] - Min[x])*0.1;
   dy = (Max[y] - Min[y])*0.1;
   {
    Min[x] - dx + Table[i*dx*1.2, {i, 1, 9}],
    Min[y] - dy + Table[i*dy*1.2, {i, 1, 9}]
    }];

ELP[x_, y_, ex_, ey_, name_] :=
 ErrorListPlot[
  Cmb[x, y, ex, ey],
  PlotRange -> FromTo[x, y],
  PlotLabel -> name,
  Joined -> True, Frame -> True, GridLines -> GetGrid, 
  FrameTicks -> GetTicks[x, y],
  ImageSize -> {600},
  AspectRatio -> 1
  ]

I can get:

enter image description here

And that is a lot better. But I would like to shift the grid and not the ticks.

edit: @Sjoerd C. de Vries

Your solution does what I wanted to archive and works. I also noticed, that if I take first 5 elements of sample data, then the plot will be (elements are sorted and regression line is added). enter image description here

Notice the left most element is like off grid.

share|improve this question
1  
You may want to insert Needs["ErrorBarPlots"] for completeness. Do you intend the gridlines to form a square raster? In that case you have to play with AspectRatio` as well. –  Sjoerd C. de Vries Apr 14 '11 at 15:43
    
@Sjoerd C. de Vries : Yes, your right. –  Margus Apr 14 '11 at 15:59
1  
If you want to specify the locations of your tick marks, I'd suggest using LevelScheme. It's CustomTicks package is far superior to the built-in capabilities, and you don't you have to write your own code, which is error prone, to set up custom specifications. –  rcollyer Apr 14 '11 at 16:34
    
@rcollyer : Interesting resource. –  Margus Apr 14 '11 at 17:04
    
Apparently, custom grid lines is supposed to be in the next version of LevelScheme. I don't know if it will be capable of three levels of styles, though. –  rcollyer Apr 16 '11 at 1:00

3 Answers 3

up vote 8 down vote accepted

Don't use FrameTicks but shift the grid correctly. This is a first approach. Dinner waits.

getGrid[min_, max_] :=
 Module[{step, i},
  Print[{min, max}];
  step = 1/100;
  Table[
   {
    Floor[min, 0.1] + i*step,
    If[Equal[Mod[i, 10], 0], Directive[Gray, Thick, Opacity[0.5]],
     If[Equal[Mod[i, 5], 0], Directive[Gray, Opacity[0.5]],
      Directive[LightGray, Opacity[0.5]]
      ]
     ]
    },
   {i, 1, (Ceiling[max, 0.1] - Floor[min, 0.1])/step // Round}
   ]
  ]

Use an AspectRatio that's appropriate for the grid (probably the ratio of x and y ranges)


After-dinner update

To make it more robust for different value ranges (per your comment) I generate the ticks that would be chosen by ListPlot and base my steps on that:

getGrid[min_, max_] :=
 Module[{step, i,j},
  i = Cases[(Ticks /. 
       AbsoluteOptions[ListPlot[{{min, min}, {max, max}}], 
        Ticks])[[1]], {a_, ___, {_, AbsoluteThickness[0.25`]}} :> a];
  step = i[[2]] - i[[1]];
  Table[
   {
    i[[1]] + j*step/10,
    If[Equal[Mod[j, 10], 0], Directive[Gray, Thick, Opacity[0.5]],
     If[Equal[Mod[j, 5], 0], Directive[Gray, Opacity[0.5]],
      Directive[LightGray, Opacity[0.5]]
      ]
     ]
    },
   {j, 0, 10 Length[i]}
   ]
  ]

and getting the aspect ratio which yields a square raster

getAspect[{{minX_, maxX_}, {minY_, maxY_}}] :=
 Module[{stepx, stepy, i, rx, ry},
   i = (Ticks /.AbsoluteOptions[ListPlot[{{minX, minY}, {maxX, maxY}}], Ticks]);
   rx = Cases[i[[1]], {a_, ___, {_, AbsoluteThickness[0.25`]}} :> a];
   stepx = rx[[2]] - rx[[1]];
   ry = Cases[i[[2]], {a_, ___, {_, AbsoluteThickness[0.25`]}} :> a];
   stepy = ry[[2]] - ry[[1]];
  ((maxY - minY)/stepy)/((maxX - minX)/stepx)
  ]

Test

ELP[x_, y_, ex_, ey_, name_] := 
 ErrorListPlot[Cmb[x, y, ex, ey], PlotLabel -> name, Joined -> True, 
  Frame -> True, GridLines -> getGrid, ImageSize -> {600}, 
  PlotRangePadding -> 0, AspectRatio -> getAspect[FromTo[x, y]], 
  PlotRange -> FromTo[x, y]]


ELP[{4124961/25000000, 27573001/100000000, 9162729/25000000, 
  44635761/100000000, 15737089/25000000, 829921/1562500, 
  4405801/4000000, 23068809/25000000, 329386201/100000000, 
  58079641/100000000}, {1/10, 1/5, 3/10, 2/5, 3/5, 1/2, 1/2, 1/2, 1/2,
   1/2}, {2031/(250000 Sqrt[10]), 5251/(500000 Sqrt[10]), 
  3027/(250000 Sqrt[10]), 1/100000 6681/(500000 Sqrt[10]), 
  3967/(250000 Sqrt[10]), 911/(62500 Sqrt[10]), 
  2099/(100000 Sqrt[10]), 4803/(250000 Sqrt[10]), 
  18149/(500000 Sqrt[10]), 7621/(500000 Sqrt[10])}, {1/2000, 1/1000, 
  3/2000, 1/500, 3/1000, 1/400, 1/400, 1/400, 1/400, 1/400}, "T2, m"]

enter image description here

Here I divide the y-values by 20 and multiplied the x-values by 10000 to show the grid is still good:

enter image description here


Final update (I hope)

This uses FindDivisions as suggested by belisarius. However, I used the three level line structure standard for milimeter paper as requested by Margus:

getGrid[x_, y_] := 
 FindDivisions[{x, y}, {10, 2, 5}] /. {r_, s_, t_} :> 
   Join[
     {#, Directive[Gray, Thick, Opacity[0.5]]} & /@ r, 
     {#, Directive[Gray, Opacity[0.5]]} & /@ Union[Flatten[s]], 
     {#, Directive[LightGray, Opacity[0.5]]} & /@ Union[Flatten[t]]
   ]

and

getAspect[{{minX_, maxX_}, {minY_, maxY_}}] :=
 Module[{stepx, stepy},
  stepx = (#[[2]] - #[[1]]) &@FindDivisions[{minX, maxX}, 10];
  stepy = (#[[2]] - #[[1]]) &@FindDivisions[{minY, maxY}, 10];
 ((maxY - minY)/stepy)/((maxX - minX)/stepx)
  ]

WARNING!!!

I just noticed that if you have this in MMA:

enter image description here

and you copy it to SO (just ctrl-c ctrl-v), you get this:

(maxY - minY)/stepy/(maxX - minX)/stepx  

which is not mathematically equivalent. It should be this:

((maxY - minY)*stepx)/((maxX - minX)*stepy)

I corrected this in the code above, but it has been posted wrong for half a day while working correctly on my computer. Thought that it would be good to mention this.

share|improve this answer
    
@Sjoerd C. de Vries : I tried approach like that, but using Ceiling and Floor function backfired, because on some variables the average change is around 10^4 and others 10^-4. –  Margus Apr 14 '11 at 17:09
    
@Sjoerd C. de Vries : If i set AspectRatio -> (Max[y] - Min[y])/(Max[x] - Min[x]), and variable sizes are in same order of 10, then I think it even works (at least cases I tested). But that is not exactly what I am trying to do. –  Margus Apr 14 '11 at 17:26
    
@Margus WRT your first comment: check my update; it should be good for all kinds of data ranges. WRT to comment #2: that doesn't work. What if y is huge and x small? –  Sjoerd C. de Vries Apr 14 '11 at 18:49
    
@Margus changed my update to include an automatic AspectRatio using your FromTo range input. –  Sjoerd C. de Vries Apr 14 '11 at 21:46
    
@Margus yet another update using belisarius' suggestion –  Sjoerd C. de Vries Apr 15 '11 at 9:50

I think FindDivisions[ ] is what you're after:

FindDivisions[{xmin,xmax},n] finds a list of about n "nice" numbers that divide the interval around xmin to xmax into equally spaced parts.

getTicks[x_, y_] := Flatten@FindDivisions[#, {10}] & /@ FromTo[x, y]
getGrid  [x_,y_] := FindDivisions[{x,y},{10,5}]/.
                          {r__,{s__}}:>Join@@{s,{#,{Gray,Thick}}&/@r} 

enter image description here

share|improve this answer
    
+1 Are we assured that FindDivisions[] yields the same ticks as Ticks->Automatic does? I couldn't find this in the documentation. If it's not, this is not a guaranteed solution. But I guess FindDivisions[] exposes the routines mma itself uses. Nice, didn't know this one. This is one of the reasons I think the mma splash screen should have a random Function Of The Day, to increase the number of serendipitous finds like these. Since your mm paper still isn't precisely what Margus asked (three subdivisions are required with a square grid) I'll give an update using your code in my answer. –  Sjoerd C. de Vries Apr 15 '11 at 9:42
    
@Sjoerd "Assured" is a strong word. I tried several max-min sets, and it seems to perform as Ticks->Automatic does. That is clearly the intention in providing this function. WRT the Function of the Day, I'd rather prefer a serious doc reorganization, as a lot of features are almost unreachable by navigating the help. –  belisarius Apr 15 '11 at 11:34
    
@belisarius I'd expect a provision for logarithmic ticks to be used in logplots, but it seems FindDivisions[] doesn't have that. As to the 2nd remark: I agree that the help could be better, but I usually find my way around it. As long as I know there is a function to do my task I can usually find it. Problem is knowing that such function exists. Perhaps you should assume that every function you'd want exists... –  Sjoerd C. de Vries Apr 15 '11 at 12:11
2  
@Sjoerd I (humbly) think that the doc problem is far greater than "I can find my way". I keep finding things like this reference.wolfram.com/mathematica/TetGenLink/guide/… that are buried somewhere behind obscure links, and could save me months of work. –  belisarius Apr 15 '11 at 18:21
    
@belisarius Indeed, this is amazing. Never knew we had this under the hood. I wonder what's more is in there. –  Sjoerd C. de Vries Apr 15 '11 at 21:37

If you use the same function for FrameTicks and Gridlines, they'll line up.

See FrameTicks, and GridLines. I think you'll need ImageMargins for the border.

share|improve this answer
    
-1 He already got Frame->true. He was also using GridLines. And FrameMargins is not an option of Plot –  Sjoerd C. de Vries Apr 14 '11 at 15:29
    
@Sjoerd I read his answer too quickly, it seems. But my point is really that he needed to coordinate FrameTicks with GridLines. I don't see any reference to FrameTicks. –  David Carraher Apr 14 '11 at 15:40
    
OK, I removed the -1. Are you sure about ImageMargins? I have a hunch that it might be PlotRangePadding. –  Sjoerd C. de Vries Apr 14 '11 at 15:50
    
@Sjoerd Just before receiving your (justified) criticism about FrameMargins, I tried out both FrameMargins and ImageMargins, finding that the former does not work but the latter does. So I revised my original advice, recommending, instead, ImageMargins. –  David Carraher Apr 14 '11 at 15:53
    
I can not use FrameTicks -> GetGrid, but it would be interesting to see, if that works for some cases. –  Margus Apr 14 '11 at 16:32

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