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I would like to create an STL map to find whether an item is close enough to another item in 3 dimensional space. So far, my "less-than-functor" has worked quite well, pasted to the following link.

Now this problem isn't quite the "nearest neighbor" problem. Rather it is a problem of "is there a neighbor within some distance."

My example just shows a single dimension. I've skipped the Y/Z dimensions for clarity.

My attempt so far :

class ApproximateLessFunctor {
  ApproximateLessFunctor( float fudgeFactor ) :
    mFudgeFactor( fudgeFactor ) {};

  bool operator()( float a, float b ) const {
    return (a < (b - mFudgeFactor) );

  float mFudgeFactor;

typedef map<float, int, ApproximateLessFunctor> XAxisMap;

class XAxis {
  XAxisMap vMap;

  XAxis(ApproximateLessFunctor functor, float x, int v)
  : vMap( functor )
    vMap.insert(make_pair(x, v));

On rare occasions, and I mean- really rare- the maps don't find a matching entry when positions overlap.

Is there something I can do better to implement this, still using STL containers?

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So this is the nearest neighbor problem with a search radius, right? Your might want to have a look at the FLANN library, it implements radius search. I guess other libraries as well. –  Tim Mar 26 '12 at 15:28
Your functor must define a strict weak ordering. Yours doesn't. –  Oliver Charlesworth Mar 26 '12 at 15:34
Actually, on a second look, I think it does define a SWO, but I don't think the multi-dimensional version will. Why not post it? –  Oliver Charlesworth Mar 26 '12 at 15:41
@OliCharlesworth His function doesn't define a SWO, since if b - a < fudge and c - b < fudge, his function may return true for a, c, but false for a, b and b, c. –  James Kanze Mar 26 '12 at 15:53
@OliCharlesworth There is a requirement that it work both ways. That !(a < b) || !(b < c)) => !(a < c). (Think about it for a moment, and I think you'll agree.) –  James Kanze Mar 26 '12 at 16:18

1 Answer 1

up vote 1 down vote accepted

Now this problem isn't quite the "nearest neighbor" problem. Rather it is a problem of "is there a neighbor within some distance."

The latter is phrased pretty simply in terms of the former, though. Find the nearest neighbor, then determine if it's close enough. This seems like a reasonable route to go considering the number of data structures available to you for the task.

Namely, a kd-tree is extremely common and not too hard to implement. Also relevant is an R-tree, though I haven't implemented that and cannot comment on its difficulty.

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Using a grid of regions will go a long way IF your points are somewhat evenly distributed. –  Mooing Duck Mar 26 '12 at 17:44
@MooingDuck: Hm? Neither of those use grids. –  GManNickG Mar 26 '12 at 17:46
No, I was just thinking of yet another option. kd-trees are definitely win if points are clumped, but grids might be better for some data. You have a good answer, I was mostly musing. –  Mooing Duck Mar 26 '12 at 17:47
@MooingDuck: Oh, gotcha. A kd-tree will generate a grid if the points are uniformly distributed. :) (Though you're right, hard-coding for a grid, like an oct-tree, could save space. But the generality of a kd-tree wins to me.) –  GManNickG Mar 26 '12 at 17:50
This is not an even distribution problem. –  macetw Mar 26 '12 at 17:52

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