# Algorithm to Find Overlapping Line Segments

```n4------------------n3--------------------n2--n1
|                    |                    |    |
|                    |                    | P1 |
|                    |                    |    |
|                    |                    n6--n5
|                    |                    |
|              n11--n10                   |
n17      P4     |    |         P2         |
|               | P3 |                    n7
|              n12---n9                   |
|               |                         n8
|               |                         |
n16------------n15---------n14------------n13
```

In the above ASCII art, there are four polygons (P1, P2, P3, P4) with exactly-overlapping line segments. For example, polygon P2 (formed by line segments between nodes n3, 10, 9, 12, 15, 14, 13, 8, 7, 6, and 2) and P1 (n1, 2, 5, and 6) overlap at the line segment between n2 and n6.

What is the fastest way to find line segments that overlap exactly?

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Your example's description is wrong. P1 has nodes 1,2,5,6 and P2 has nodes 2,3,10,9,12,15,14,13,8,7,6. –  perimosocordiae Sep 15 '09 at 3:35
@perimosocordiae Thanks. I believe I fixed the description. –  magneticMonster Sep 15 '09 at 3:39
Before I answer, you should mention how your shapes are stored. That kind of influences the answer. –  twolfe18 Sep 15 '09 at 3:45
are the line segments only straight lines? Do you want an algorithm that given two polygons finds what line segments they 'overlap' over? –  Joshua Sep 15 '09 at 3:46
@twolfe18 So far the data is stored as an ordered list of nodes. A polygon is actually a ring of nodes where the first and last nodes are the same (in Java: ==, not .equals()) –  magneticMonster Sep 15 '09 at 4:00
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If each shape is a list of edges then:

``````initialize map<edge, list of shapes> map
for each Shape s
for each Edge e in s
list l = map.get(e)
if(l == null)
l = new list()
map.put(e, l)

for each <edge, list> in map.entries
if(list.size > 1)
do something with this common edge
``````

its O(edges), and your not going to do better than that. this solution might not be satisfactory depending on what you want to do specifically though.

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+1. As an additional note, if the shape is stored as a list of points, you can just walk over the points pairwise and have the edge represented by a sorted pair (p1,p2) where p1 < p2 => p1.x < p2.x or p1.x = p2.x and p1.y <= p2.y. –  Ants Aasma Sep 15 '09 at 20:21

twolfe18's algorithm looks good. There may be an added complication, however, if matching edges are not identically described. In your example, P1 and P2 both share the n2-n6 edge. But P2's edge might be described by the segment n2-n7 instead (if n2-n6 and n6-n7 are colinear). You'll then need a more complicated hashing method to determine if two edges overlap. You can tell whether two edges overlap by mapping segments onto lines, looking up the line in a hashtable, then testing whether two segments on a line intersect using an interval tree in parameter space on the line.

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