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Given two events with integer start and end times, E1 = (s1, e1), E2 = (s2, e2), implement a quick boolean check to see if the events overlap.

I have the solution, but I'm curious to see what others come up with.

EDIT: OK, here's my solution:

e1 > s2 || (s1 > s2 && e2 < s1)
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7  
"I have the solution" - yeah, right. This sounds like a counterpart to the famous FizzBuzz problem. –  Mark Ransom Jan 17 '11 at 21:20
    
Is it a school question? Why do you ask if you know the answer. Most ppl who knows it are not going to answer you. –  Elalfer Jan 17 '11 at 21:22
    
posted my solution... –  jasonbogd Jan 17 '11 at 21:26
    
why did this get downvoted? –  jasonbogd Jan 17 '11 at 21:28
3  
Wrt your solution: e1 > s2 is incorrect if s1 > s2 as well. –  BalusC Jan 17 '11 at 21:29

9 Answers 9

up vote 15 down vote accepted

bool overlap = (s1 <= e2) && (s2 <= e1)

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@nightcracker: Get yours right before you criticize. –  Fred Larson Jan 17 '11 at 21:28
    
True. (15 chars) –  nightcracker Jan 17 '11 at 21:29
    
Should be <= in both comparisons. –  Sven Marnach Jan 17 '11 at 21:39
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@caf: If you don't consider that overlapping, you can replace "<=" with "<". –  Fred Larson Jan 17 '11 at 22:45
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@Mark: Yeah, airplanes going thump in the night is not good. –  Fred Larson Jan 17 '11 at 23:43

(S2-S1)<(e1-s1) || (S1-S2)<(e2-s2)

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2  
Any chance you could explain why this works? Helps the less clever like me to learn from you! –  Neil Townsend Mar 19 '13 at 17:36

You can check In which cases It will not overlap

Condition for no overlap is :: (s2 > e1 ) || ( e2 > s1) so overlap is !((s2 > e1 ) || ( e2 > s1))

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Fred's answer is both concise and correct.

I prefer:

bool overlap = !(e1 < s2 || e2 < s1);

I think this is clearer, but it is a very small difference.

Converted to english:

They overlap if neither ends before the other starts.


This is similar to the overlapping rectangles problem. There are two good ways to write that test. They correspond to the statements:

Two rectangles overlap if the left edge of both is to the left of the right edge of the other, and the top edge of both is above the bottom edge of the other.


Two rectangles overlap if neither is to the left or above the other.

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1  
+1 - Nicely written. –  duffymo Jan 18 '11 at 0:24

This will also work:

max(s1, s2) < min(e1, e2)
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Slick. I like this one the best. –  rlotun Jan 17 '11 at 23:31

I would do it like this:

return s1 < s2 ? s2 <= e1 : s1 <= e2;
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1  
Unlike some of the other solutions, this one does not allow a compiler to optimize away the first branch. –  finnw Jan 17 '11 at 22:38
    
@finnw: This compiles actually with the same number of branches as the solutions that use the short cutting boolean operators (|| or &&), although these could be changed to use the non sort cutting versions of these operators (| or &) which would then indeed result in less branching. But I agree that i.e. Fred Larsons new suggestion is more effecient than mine as it can either have a shorter code path in some cases or can be modified to have less branching if & is used instead of &&. –  x4u Jan 18 '11 at 9:52
    
this is the kind of optimization I had in mind: www-graphics.stanford.edu/~seander/… –  finnw Jan 18 '11 at 12:19
(s2 < s1 && s1 < e2) || (s1 < s2 && s2 < e1)

or, equivalently:

(s2 < s1 && s1 < e2) || (s2 < e1 && e1 < e2)
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/* return true if intervals overlap */
bool overlap(unsigned int s1, unsigned int e1, unsigned int s2, unsigned int e2) {
    return (s1 >= s2 && s1 <= e2) ||
            (e1 >= s2 && e1 <= e2) ||
            (s2 >= s1 && s2 <= e1) ||
            (e2 >= s1 && e2 <= e1);
}
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This is nowhere near the most efficient solution. See my answer. –  nightcracker Jan 17 '11 at 21:24

They overlap if:

  • e1 between (inclusive of both endpoints) s2 and e2 OR
  • e2 between (inclusive of both endpoints) s1 and e1
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nice one daniel! –  jasonbogd Jan 17 '11 at 21:32

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