# Color Plot by order of points in list - Mathematica

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.

-

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]]]}]]}]
``````

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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]
``````

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.

-

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 ]
}]
``````

(acl's data)

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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])
``````

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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
``````

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]}
``````

or with

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

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