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I can plot the curve corresponding to an implicit equation:

ContourPlot[x^2 + (2 y)^2 == 1, {x, -1, 1}, {y, -1, 1}]

But I cannot find a way to color the contour line depending on the location of the point. More precisely, I want to color the curve in 2 colors, depending on whether x² + y² < k or not.

I looked into ColorFunction but this is only for coloring the region between the contour lines. And I was not able to get ContourStyle to accept a location-dependent expression.

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4 Answers 4

up vote 7 down vote accepted

you could use RegionFunction to split the plot in two:

Show[{
  ContourPlot[x^2 + (2 y)^2 == 1, {x, -1, 1}, {y, -1, 1}, 
  RegionFunction -> Function[{x, y, z}, x^2 + y^2 < .5], 
  ContourStyle -> Red], 
  ContourPlot[x^2 + (2 y)^2 == 1, {x, -1, 1}, {y, -1, 1}, 
  RegionFunction -> Function[{x, y, z}, x^2 + y^2 >= .5], 
  ContourStyle -> Green]
}]

Mathematica graphics

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+1 I removed my solution (almost identical to yours) after I realized that you had solved it a full hour earlier than me. –  David Carraher Jan 22 '12 at 22:08

For some of the less adept, less information is more. Time was wasted browsing for a way to set the color of contour lines until I chanced onto Roelig's edited answer. I just needed ContourStyle[].

Show[{ContourPlot[
     x^2 + 2 x y Tan[2 # ] - y^2 == 1, {x, -3, 3}, {y, -3.2, 3.2}, 
     ContourStyle -> Green] & /@ Range[-Pi/4, Pi/4, .1]}, 
 Background -> Black]
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This does not provide a direct solution to your question but I believe it is of interest.

It is possible to color a line progressively from within ContourPlot using what I think is an undocumented format, namely a Function that surrounds the Line object. Internally this is similar to what Heike did, but her solution uses the vertex numbers to then find the matching coordinates allowing styling by spacial position, rather than position along the line.

ContourPlot[
  x^2 + (2 y)^2 == 1, {x, -1, 1}, {y, -1, 1},
  BaseStyle -> {12, Thickness[0.01]},
  ContourStyle ->
   (Line[#, VertexColors -> ColorData["DeepSeaColors"] /@ Rescale@#] & @@ # &)
]

Mathematica graphics

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Maybe something like this

pl = ContourPlot[x^2 + (2 y)^2 == 1, {x, -1, 1}, {y, -1, 1}]
points = pl[[1, 1]];
colorf[{x_, y_}] := ColorData["Rainbow"][Rescale[x, {-1, 1}]]
pl /. {Line[a_] :> {Line[a, VertexColors -> colorf /@ points[[a]]]}}

which produces

Mathematica graphics

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Thank you for this useful answer. It enables the user use a continuum of colors, which is a nice complement to the other answers. –  tos Jan 22 '12 at 21:58
    
+1 For nice post processing. –  Mr.Wizard Jan 23 '12 at 8:21

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