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I've got a list of three dimensional points, ordered by time. Is there a way to plot the points so that I can get a visual representation that also includes information on where in the list the point occurred? My initial thought is to find a way to color the points by the order in which they were plotted.

ListPlot3D drapes a sheet over the points, with no regard to the order which they were plotted.

ListPointPlot just shows the points, but gives no indication as to the order in which they were plotted. It's here that I am thinking of coloring the points according to the order in which they appear in the list.

ListLinePlot doesn't seem to have a 3D cousin, unlike a lot of the other plotting functions.

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5 Answers 5

up vote 11 down vote accepted

You could also do something like

lst = RandomReal[{0, 3}, {20, 3}];
Graphics3D[{Thickness[0.005], 
  Line[lst, 
   VertexColors -> 
    Table[ColorData["BlueGreenYellow"][i], {i, 
      Rescale[Range[Length[lst]]]}]]}]

line with gradient

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so I was right that there was a simpler way... I'm honoured to push you over 1000 reputation points then :) –  acl Aug 20 '11 at 3:02
    
Everyone had great suggestions; it's nice that Mathematica provides so many ways to accomplish this, but you sir (or madame) receive the green check because of the simplicity of your solution. –  Alec Aug 22 '11 at 2:12

As you did not provide examples, I made up some by creating a 3d self-avoiding random walk:

Clear[saRW3d]
saRW3d[steps_]:=
    Module[{visited},
        visited[_]=False;
        NestList[
            (Function[{randMove},
                If[
                    visited[#+randMove]==False,
                    visited[#+randMove]=True;
                    #+randMove,
                    #
                ]
            ][RandomChoice[{{1,0,0},{-1,0,0},{0,1,0},{0,-1,0},{0,0,1},{0,0,-1}}]])&,
            {0,0,0},
            steps
        ]//DeleteDuplicates
]

(this is sort of buggy but does the job; it produces a random walk in 3d which avoids itself, ie, avoids revisiting the same place in subsequent steps).

Then we produce 100000 steps like this

dat = saRW3d[100000];

this is like I understood your data points to be. We then make these change color depepnding on which step it is:

datpairs = Partition[dat, 2, 1];
len = Length@datpairs;
dressPoints[pts_, lspec_] := {RGBColor[(N@First@lspec)/len, 0, 0], 
   Line@pts};
datplt = MapIndexed[dressPoints, datpairs];

This can also be done all at once like the other answers

datplt=MapIndexed[
    {RGBColor[(N@First@#2)/Length@dat, 0, 0], Line@#1} &,
    Partition[dat, 2, 1]
]

but I tend to avoid this sort of constructions because I find them harder to read and modify.

Finally plot the result:

Graphics3D[datplt]

enter image description here

The path gets redder as time advances.

If this is the sort of thing you're after, I can elaborate.

EDIT: There might well be easier ways to do this...

EDIT2: Show a large set of points to demonstrate that this is very useful to see the qualitative trend in time in cases where arrows won't scale easily.

EDIT3: Added the one-liner version.

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I think Heike's method is best, but she made it overly complex, IMHO. I would use:

Graphics3D[{
  Thickness[0.005], 
  Line[lst, 
   VertexColors -> 
    ColorData["SolarColors"] /@ Rescale@Range@Length@lst ]
}]

enter image description here

(acl's data)

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2  
You're right Mr. Wizard, this way is a lot more elegant (and it's she, by the way). –  Heike Aug 20 '11 at 7:48
    
@Heike - duly noted. That I might assuage my ignorance, should I have been able to deduce that from your name/nickname? –  Mr.Wizard Aug 20 '11 at 8:00
    
You weren't to know. Heike is actually my given name but it's not very common (at least not where I'm from) and is used for both boys and girls. –  Heike Aug 20 '11 at 8:14
    
@Heike Okay. I feel less foolish now. How is it pronounced? –  Mr.Wizard Aug 20 '11 at 8:43
    
Wizard: written in the International Phonetic Alphabet it would be something like ɦɛikə. –  Heike Aug 20 '11 at 14:53
Graphics3D@(Arrow /@ Partition[RandomInteger[{0, 10}, {10, 3}], 2, 1])

enter image description here

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1  
That is the obvious approach; the problem with this sort of thing is that it doesn't scale. Try it with 10000 points, for instance. Anyway, +1 –  acl Aug 19 '11 at 22:19

As to your last question: If you want to have a kind of ListLinePlot3D instead of a ListPointPlot you could simply do the following:

pointList = 
  Table[{t, Sin[t] + 5 Sin[t/10], Cos[t] + 5 Cos[t/10], 
    t + Cos[t/10]}, {t, 0, 100, .5}];

ListPointPlot3D[pointList[[All, {2, 3, 4}]]] /. Point -> Line

enter image description here

Of course, in this way you can't set line properties so you have to change the rule a bit if you want that:

ListPointPlot3D[pointList[[All, {2, 3, 4}]]] /. 
       Point[a___] :> {Red, Thickness[0.02], Line[a]}

enter image description here

or with

ListPointPlot3D[pointList[[All, {2, 3, 4}]]] /. 
 Point[a___] :> {Red, Thickness[0.002], Line[a], Black, Point[a]}

enter image description here

But then, why don't you use just Graphics3D and a few graphics primitives?

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BTW I used a 4D array because it was my original understanding time was to be used for coloring. On closer reading of the question this may not be the case. So, pointList[[All, {2, 3, 4}]] can be written as pointList for a list with 3D coords. –  Sjoerd C. de Vries Aug 20 '11 at 6:42

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