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FindDivisions[ ] was added in Mma v7, and seems a nice way to get flexible ticks for plots. See for example this question and its answers.

Usage example:

f[fd_] := Join[
   {#, #, {.07, 0}, Directive[Black, Thickness[.01]]} & /@ fd[[1]],
   {#, #, {.05, 0}, Directive[Black, Thin]}           & /@ Flatten[fd[[2]]]];
plot[pr_List] :=  
     Plot[Sin[x], Evaluate@Join[{x}, pr], Ticks -> {f[FindDivisions[pr, {2,5}]]}]

plot[{0, 10}]

enter image description here

And everything seems right.
But there is a glitch:

f[fd_] := Join[
   {#, #, {.03, 0}, Directive[Red, Thickness[.01]]} & /@  fd[[1]], 
   {#, #, {.05, 0}, Directive[Black, Thin]}         & /@  Flatten[fd[[2]]]];
plot[pr_List] :=
  Plot[Sin[x], Evaluate@Join[{x}, pr], Ticks -> {f[FindDivisions[pr, {2,5}]]}]
plot[{0, 10}]

enter image description here

As you can see, the red and black ticks are superimposed. That is because

FindDivisions[{0, 2}, {2, 4}]
(*
-> {{0, 1, 2}, {{0, 1/4, 1/2, 3/4, 1}, {1, 5/4, 3/2, 7/4, 2}}}
*)

and you can see that the numbers in the first list (the main ticks) are repeated in the second list.
However, the FindDivisions[] documentation states:

enter image description here

So, two questions:

  1. Is this a bug, or am I doing (or understanding) something wrong?
  2. Any easy way to delete the repeated ticks in a multilevel structure?
share|improve this question

1 Answer 1

up vote 5 down vote accepted

It is a bug, probably in implementation, although having the duplicated values might be useful at times. (It is certainly useful for constructing the different levels of divisions.)

For ticks, I'd probably use code like:

{major, minor} = FindDivisions[{0, 2}, {2, 4}];
minor = Complement[Flatten[minor], major];

to flatten the hierarchy and remove duplicates.


Generalized, for more levels than just two:

divs = Flatten /@ FindDivisions[{0, 2}, {2, 4, 2}];
Complement[#2, #1] & @@@ Partition[divs, 2, 1, -1, {{}}]
share|improve this answer
    
Thanks @Brett. How does it work for FindDivisions[{0, 2}, {2, 4, 2}]? –  belisarius Jun 16 '11 at 15:40
    
Answer updated, although I don't care for the divisions it found for the third level in this case... –  Brett Champion Jun 16 '11 at 16:08
    
Seems that with FindDivisions[{0, 1}, {3, 3, 3}], the value 1/2 gets repeated in the third list –  belisarius Jun 16 '11 at 16:35
    
Yes, because the second level divisions share an interval (2/5,3/5) from straddling the 1/2 in the first division. This is a result of the "The first and last numbers may be slightly outside the range x_min to x_max" note in the documentation. –  Brett Champion Jun 16 '11 at 17:08
2  
You could try FindDivisions[{0, 1}, {3, 3, 3}, Method -> "Legacy"] although it might introduce undesirable gaps in the ticks. –  Brett Champion Jun 16 '11 at 17:55

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