We're trying to do the following in Mathematica - RMagick remove white background from image and make it transparent.

But with actual photos it ends up looking lousy (like having a halo around the image).

Here's what we've tried so far:

unground0[img_] := With[{mask = ChanVeseBinarize[img, TargetColor->{1.,1.,1.}]},
  Rasterize[SetAlphaChannel[img, ImageApply[1-#&, mask]], Background->None]]]

Here's an example of what that does.

Original image:

original image

Image with the white background replaced with no background (or, for demonstration purposes here, a pink background):

image with transparent background -- actually a pink background here, to make the halo problem obvious

Any ideas for getting rid of that halo? Tweaking things like LevelPenalty, I can only get the halo to go away at the expense of losing some of the image.

EDIT: So I can compare solutions for the bounty, please structure your solution like above, namely a self-contained function named unground-something that takes an image and returns an image with transparent background.

  • 1
    Thanks so much for the help so far, everyone! Big bounty coming on this as soon as stackoverflow lets me add one. And, per the spirit of stackoverflow as articulated by the founders, you should feel free to steal from each other to make your answer the definitive one!
    – dreeves
    Commented Nov 8, 2011 at 20:48
  • 3
    First 500 bounty and then "I encourage you all to borrow from each other liberally to improve on it if possible!" -- you want a dog fight, don't you?
    – Mr.Wizard
    Commented Nov 10, 2011 at 1:19
  • @Mr.Wizard, :) I'm not making that up though, that the founders (Jeff and Joel) have said from the beginning that that's encouraged. The idea is for the top answer to be a really complete and definitive one. (And obviously I have ulterior motives as well in this case!)
    – dreeves
    Commented Nov 10, 2011 at 3:05
  • 3
    For the overly curious, this the IKEA's "FREDRIK" computer work station: ikea.com/us/en/catalog/products/60111123 Commented Nov 13, 2011 at 3:22
  • 1
    @dreeves, I used tineye.com. Commented Nov 13, 2011 at 20:43

9 Answers 9


This function implements the reverse blend described by Mark Ransom, for an additional small but visible improvement:

reverseBlend[img_Image, alpha_Image, bgcolor_] :=
  {c = ImageData[img], 
   a = ImageData[alpha] + 0.0001, (* this is to minimize ComplexInfinitys and considerably improve performance *)
   bc = bgcolor},

   Image[Quiet[(c - bc (1 - a))/a, {Power::infy, 
       Infinity::indet}] /. {ComplexInfinity -> 0, Indeterminate -> 0}]

This is the background removal function. The threshold parameter is used for the initial binarization of the image, the minSizeCorrection is for tweaking the size limit of small junk components to be removed after binarization.

removeWhiteBackground[img_, threshold_: 0.05, minSizeCorrection_: 1] :=
  {dim, bigmask, mask, edgemask, alpha},
  dim = ImageDimensions[img];
  bigmask = 
     MorphologicalBinarize[ColorNegate@ImageResize[img, 4 dim], threshold], 
    Round[minSizeCorrection Times @@ dim/5]];
  mask = ColorNegate@
    ImageResize[ColorConvert[bigmask, "GrayScale"], dim];
  edgemask = 
    ImageAdjust@DistanceTransform@Dilation[EdgeDetect[bigmask, 2], 6],
  alpha = 
     ImageMultiply[ColorNegate@ColorConvert[img, "GrayScale"], 
      edgemask], ImageMultiply[mask, edgemask]], mask];
  SetAlphaChannel[reverseBlend[img, alpha, 1], alpha]

Testing the function:

img = Import["https://i.sstatic.net/k7E1F.png"];

background = 
forest2.jpg"], ImageDimensions[img]];

result = removeWhiteBackground[img]

ImageCompose[background, result]
Rasterize[result, Background -> Red]
Rasterize[result, Background -> Black]


Brief explanation of how it works:

  1. Choose your favourite binarization method that produces relatively precise sharp edges

  2. Apply it to an up-scaled image, then downscale the obtained mask to the original size. This gives us antialiasing. Most of the work is done.

  3. For a small improvement, blend the image onto the background using the brightness of its negative as alpha, then blend the obtained image over the original in a thin region around the edges (edgemask) to reduce the visibility of white pixels on the edges. The alpha channel corresponding to these operations is calculated (the somewhat cryptic ImageMultiply/Add expression).

  4. Now we have an estimate of the alpha channel so we can do a reverse blend.

Steps 3 & 4 don't improve that much, but the difference is visible.

  • @belisarius it's not about English, I know my name looks very unusual for most :-)
    – Szabolcs
    Commented Nov 11, 2011 at 14:12
  • Looks like a pretty std. Hungarian surname for me :) Commented Nov 11, 2011 at 14:29
  • @belisarius Actually it's a forename, or a more precisely a given name, as in Hungarian the surname comes first and the given name last.
    – Szabolcs
    Commented Nov 11, 2011 at 14:38
  • 2
    The shadow of the case is still there in the 2nd figure as a grayish band at the bottom... Commented Nov 11, 2011 at 19:24
  • @SjoerdC.deVries That's true, but I think for this task it should be that way ... there's no way to tell it's a shadow and not part of the object. Most picture on Amazon either had shadows or were boringly trivial, so I went with this one.
    – Szabolcs
    Commented Nov 11, 2011 at 22:02

Perhaps, depending on the edge quality you need:

img = Import@"https://i.sstatic.net/k7E1F.png";
mask = ChanVeseBinarize[img, TargetColor -> {1., 1., 1.}, "LengthPenalty" -> 10]
mask1 = Blur[Erosion[ColorNegate[mask], 2], 5]
Rasterize[SetAlphaChannel[img, mask1], Background -> None]

enter image description here


Stealing a bit from @Szabolcs

img2 = Import@"https://i.sstatic.net/k7E1F.png";
(*key point:scale up image to smooth the edges*)
img = ImageResize[img2, 4 ImageDimensions[img2]];
mask = ChanVeseBinarize[img, TargetColor -> {1., 1., 1.}, "LengthPenalty" -> 10];
mask1 = Blur[Erosion[ColorNegate[mask], 8], 10];
f[col_] := Rasterize[SetAlphaChannel[img, mask1], Background -> col, 
                     ImageSize -> ImageDimensions@img2]
GraphicsGrid[{{f@Red, f@Blue, f@Green}}]

enter image description here

Click to enlarge

Edit 2

Just to get an idea of the extent of the halo and background imperfections in the image:

img = Import@"https://i.sstatic.net/k7E1F.png";
Join[{img}, MapThread[Binarize, {ColorSeparate[img, "HSB"], {.01, .01, .99}}]]

enter image description here

ColorNegate@ImageAdd[EntropyFilter[img, 1] // ImageAdjust, ColorNegate@img]

enter image description here

  • Sadly, on my machine your code does not produce at all the same quality of result. Was img the 500x500 image as posted in the question? If yes, perhaps a mac/windows thing... Commented Nov 10, 2011 at 16:32
  • @Matthias Yes, the img is a copy/paste from the original. Mma 8.01 on windows. Commented Nov 10, 2011 at 16:35
  • Oh... perhaps the optimizer produces a different result due to tiny arithmetic noise. Anyway, I am glad it is working well for you using this set of parameters. Commented Nov 10, 2011 at 16:44
  • That doesn't look like it works. It's just blurring the edges.
    – user541686
    Commented Nov 11, 2011 at 7:10

I'm going to speak generically, not specifically in reference to Mathematica. I have no idea whether these operations are difficult or trivial.

The first step is to estimate an alpha (transparency) level for the pixels on the edge of the image. Right now you're using a strict threshold, so the alpha is either 0% totally transparent or 100% totally opaque. You should define a range between the total white of the background and colors that are indisputably part of the image, and set an appropriate proportion - if it's closer in color to the background it's low alpha, and if it's closer to the darker cutoff then it's a high alpha. After that you can make adjustments based on the surrounding alpha values - the more a pixel is surrounded by transparency, the more likely it is to be transparent itself.

Once you have alpha values you need to do a reverse blend to get the proper color. When an image is displayed over a background it is blended according to the alpha value using the formula c = bc*(1-a)+fc*a where bc is the background color and fc is the foreground color. In your case the background is white (255,255,255) and the foreground color is the unknown, so we reverse the formula: fc = (c - bc*(1-a))/a. When a=0 the formula calls for a divide by zero, but the color doesn't matter anyway so just use black or white.

  • 3
    Great answer. Alpha estimation is actually an entire research field, e.g. ai.stanford.edu/~ruzon/alpha
    – mpenkov
    Commented Nov 8, 2011 at 3:53
  • 2
    Agreed, great answer; thanks Mark! For the bounty (when stackoverflow lets me add one) though I plan to go with whichever fully implemented solution looks best. So far belisarius's, I'm thinking.
    – dreeves
    Commented Nov 8, 2011 at 20:43

Here's a try at implementing Mark Ransom's approach, with some help from belisarius's mask generation:

Locate the boundary of the object:

img1 = SetAlphaChannel[img, 1];
mb = ColorNegate@ChanVeseBinarize[img, TargetColor -> {1., 1., 1}, 
      "LengthPenalty" -> 10];
edge = ImageSubtract[Dilation[mb, 2], Erosion[mb, erosionamount]];

ImageApply[{1, 0, 0} &, img, Masking ->edge]

figure edge

Set the alpha values:

edgealpha = ImageMultiply[ImageFilter[(1 - Mean[Flatten[#]]^5) &, 
   ColorConvert[img, "GrayScale"], 2, Masking -> edge], edge];
imagealpha = ImageAdd[edgealpha, Erosion[mb, erosionamount]];
img2 = SetAlphaChannel[img, imagealpha];

Reverse color blend:

img3 = ImageApply[Module[{c, \[Alpha], bc, fc},
   bc = {1, 1, 1};
   c = {#[[1]], #[[2]], #[[3]]};
   \[Alpha] = #[[4]];
   If[\[Alpha] > 0, Flatten[{(c - bc (1 - \[Alpha]))/\[Alpha], \[Alpha]}], {0., 0., 
   0., 0}]] &, img2];

Show[img3, Background -> Pink]

pink background

Notice how some of the edges have white fuzz? Compare that with the red outline in the first image. We need a better edge detector. Increasing the erosion amount helps with the fuzz, but then other sides become too transparent, so there is a tradeoff on the width of the edge mask. It's pretty good, though, considering there is no blur operation, per se.

It would be instructive to run the algorithm on a variety of images to test its robustness, to see how automatic it is.

  • Hmmm, to me img2 looks better (see bottom of table surface) than img3. Maybe the reverse colour blend is unnecessary?
    – JxB
    Commented Nov 11, 2011 at 0:33

Just playing around as a beginner - it's amazing how many tools are available.

b = ColorNegate[
    GaussianFilter[MorphologicalBinarize[i, {0.96, 0.999}], 6]];
c = SetAlphaChannel[i, b];
Show[Graphics[Rectangle[], Background -> Orange, 
     PlotRangePadding -> None], c]


I am completely new to image processing but here is what I get after some playing with new morphological image processing functions of version 8:

mask = DeleteSmallComponents[
    Image[MorphologicalComponents[ColorNegate@img, .062, 
      Method -> "Convex"], "Bit"], 10000];
Show[Graphics[Rectangle[], Background -> Red, 
  PlotRangePadding -> None], SetAlphaChannel[img, ColorNegate@mask]]


  • 3
    I think dreeves is trying to get rid of those jagged lines at the edges. Commented Nov 8, 2011 at 11:48
  • 1
    True, this does a nice job of reducing that halo but the jaggedness might be a deal breaker. @belisarius, your version looks pretty amazing!
    – dreeves
    Commented Nov 8, 2011 at 17:35
  • @dreeves I think the edges can be improved (in my version) by using a distance transform after the blur, but that was already noted by Mr. Wiz , so I leave the experiment to him. Commented Nov 8, 2011 at 17:48
  • What does Method -> "Convex" do? It's not documented.
    – Szabolcs
    Commented Nov 11, 2011 at 10:52
  • I'm sorry! I realize I confused MorphologicalComponents and MorphologicalBinarize which are in fact unrelated functions!
    – Szabolcs
    Commented Nov 11, 2011 at 15:00

I recommend using Photoshop for this and saving as a PNG.

  • 5
    Good point, but what's the algorithm that photoshop uses to do this so well? (And of course we want to automate this, not click around with the magic wand in photoshop for each image.)
    – dreeves
    Commented Nov 7, 2011 at 20:06
  • 3
    By the way, I think this is a helpful thing to point out (I could easily have been that big of a Mathematica nerd that photoshop might not have occurred to me!). And it turns out it's even scriptable in photoshop so this may even be the best possible answer that sense, if photoshop is doing something really clever that can't be duplicated with a small mathematica program.
    – dreeves
    Commented Nov 8, 2011 at 20:40
  • 5
    There is a reason why Adobe can charge 500 smakeroos for their software ;-).
    – Timo
    Commented Nov 10, 2011 at 19:19
  • 7
    Perhaps you could post a version of the image generated by a PhotoShop script (no manual intervention :-) for reference - we would know what we have to beat...
    – cormullion
    Commented Nov 11, 2011 at 10:04

Possible steps you could take:

  • dilate the mask
  • blur it
  • using the mask, set transparency by distance from white
  • using the mask, adjust saturation such that the previously more-white colors are more saturated.
  • Good thoughts; thank you! Would love to get some general-purpose code for this. We'll probably put a big bounty up in a couple days (when stackoverflow lets us) if you want to come back then. In fact, I hereby commit to doing so, if that's any enticement to dive in. :)
    – dreeves
    Commented Nov 7, 2011 at 20:14
  • @dreeves Sounds good to me; I don't have time now, but I'll try to get back to it.
    – Mr.Wizard
    Commented Nov 7, 2011 at 20:19

Just replace any pixel that is "almost close to white" with a pixel of the same RGB color and a Sigmoid gradient on the transparency channel. You can apply linear transition from solid to transparent, but Sinusoid or Sigmoid or Tanh look more natural, depending on the sharpness of edge you are looking for, they rapidly move away from the medium to either solid or transparent, but not in stepwise/binary manner, which is what you have now.

Think of it this way:

Let's say R,G,B are each 0.0-1.0, then let's represent white as a single number as R+G+B=1.0*3=3.0.

Taking a little bit of each color out makes it a little "off-white", but taking a little of all 3 is taking it a lot more off than a little off any one. Let's say that you allow a 10% reduction on any one channel: 1.0*.10 = .1, Now spread this loss across all three and bind it between 0 and 1 for alpha channel, if it's less than .1, such that (loss=0.9)=>0 and (loss=1.0)=>1:

(* linear scaling is used above *)
(* or use 1/(1 + Exp[-10(loss - 0.5maxLoss)/maxLoss]) to set sigmoid alpha *)
(* Log decay: Log[maxLoss]/Log[loss]
      (for loss and maxLoss <1, when using RGB 0-255, divide by 255 to use this one *)


For reference:

maxLoss = .1;
Plot[{ 1/(1 + Exp[-10(loss - 0.5maxLoss)/maxLoss]),
     }, {loss, 0, maxLoss}]

The only danger (or benefit?) you have in this, is that this does not care about whites which actually ARE part of the photo. It removes all whites. So that if you have a picture of white car, it'll end up having transparent patches in it. But from your example, that seems to be a desired effect.

  • I think the idea of ChanVeseBinarize is to be smart about that and not turn white pixels transparent unless they're part of a larger area of white, ie, very likely to be part of the background.
    – dreeves
    Commented Nov 8, 2011 at 3:34
  • Problem with "larger area" is that is could be important, while small area could be unimportant. On a white car, the entire side would be important, but would get tagged as a large patch of white. Space between two people against a white background would be small and with complex edges, but it needs to go. You would have to have a Boltzman Machine-style AI recognize common shapes and see if the white is space or part of the object, but we're not there yet. Commented Dec 6, 2011 at 15:29
  • 1
    You can also take 2 images from slightly different perspectives, and then use dimensionality deduction from stereo imaging to find out which pixels are background based on where occlusions occur. Commented Dec 6, 2011 at 15:31

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