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I can get a colored ListLinePlot by doing something like

ListLinePlot[Range[420, 680, 20], ColorFunction -> "VisibleSpectrum", ColorFunctionScaling -> False]

Mathematica graphics

However, as indicated by the help file ("ColorFunction requires at least one dataset to be Joined"), if I do the equivalent

ListPlot[Range[420, 680, 20], ColorFunction -> "VisibleSpectrum", ColorFunctionScaling -> False]

Mathematica graphics

all my points are blue. Is there a nice way to get ColorFunction to work for ListPlot with Joined -> False?

That is, is there a nicer way to get something like

 List /@ Transpose[{Range[(680 - 420)/20 + 1], Range[420, 680, 20]}], 
 PlotMarkers -> ({Graphics[{#, Disk[]}], 0.05} & /@ ColorData["VisibleSpectrum"] /@ Range[420, 680, 20])


Mathematica graphics

(Also, does anyone have an explanation of why Mathematica requires Joined -> True in order to make use of ColorFunction?)

Edit: I'm also looking for a way to do a similar coloring with ErrorListPlot in the ErrorBarPlots package.

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3 Answers 3

up vote 6 down vote accepted

The problem is, that Joined->True draws a Line[] which can be given VertexColors for each containing point. I assume doing the same for the points when setting Joined->False leads to situations where it does not work. Nevertheless, Line[] and Point[] work pretty much the same in your case. So what is about

ListLinePlot[Range[420, 680, 20], ColorFunction -> "VisibleSpectrum", 
  ColorFunctionScaling -> False] /. Line[arg___] :> Point[arg]

Mathematica graphics

And, by the way, if your using a ListLinePlot only, where the only Line[] directives arising are the one from your data, this should work even if you have more datasets and {x,y} coordinates

data = Transpose[Table[{{x, Sin[x]}, {x, Cos[x]}}, {x, 0, 2 Pi, 0.2}]];
ListLinePlot[data, ColorFunction -> Hue] /. Line[arg___] :> Point[arg]

Mathematica graphics

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Is there a similarly nice solution for ErrorListPlot in the ErrorBarPlots package? –  Jason Gross Dec 31 '11 at 13:19
And you can add something like PlotStyle -> AbsolutePointSize[5] in the code -- i.e. the code that draws the lines -- to control the eventual point size. –  Mike Honeychurch Dec 31 '11 at 22:42
@Jason, an ErrorListPlot can not be colorized with a short trick like the above for at least two reasons: The objects which should have the same color are split up into several Graphics-directives. You would have to find corresponding lines and points. The second reason is, that one point has one position which is used for the color. An ErrorBar has several different positions. So it's not clear which one you like to use for the color. Check the InputForm of your ErrorListPlot. –  halirutan Jan 2 '12 at 5:57
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You can use DiscretePlot:

data = Range[420, 680, 20];
DiscretePlot[data[[i]], {i, Length[data]},
   ColorFunction -> "VisibleSpectrum", ColorFunctionScaling -> False,
   Filling -> None]

Mathematica graphics

If you're plotting a list of x,y points, it gets a little trickier:

data = Transpose[{Range[420, 680, 20], Range[400, 530, 10]}];
mapping = Apply[Rule, data, 2];
DiscretePlot[i/.mapping, {i, data[[;;,1]]},
   ColorFunction -> "VisibleSpectrum", ColorFunctionScaling -> False,
   Filling -> None]

Mathematica graphics

It does seem rather odd that DiscretePlot will let you color the points differently whereas ListPlot won't. I'm sure it must have something to do with the implementation details, but I can't think of a reason why that would be the case.

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I came across this problem in my work too. I assign a colour to each point in the following manner:

data = ...
ListPlot[data] /. Point[args___] :> Point[args, VertexColors -> {c1, c2, ...}]

where c1 is the colour for the first data point, and so on. The colour list may be programmatically generated, eg

ColorData["Rainbow"] /@ (Range@Length@data / Length@data)

Here is the result.

The good points of this method are as follows.

  • It's straightforward: we have a list of pairs, then we create a corresponding list of colours.
  • Our original ListPlot code needs not be modified (eg, changed into ListLinePlot).
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