# Finding a set of targets that overlap a point in time

At a point in time, I need to find all Targets that have points earlier and later than that time.

Currently I am doing the following:

``````for current_time = sorted_set_of_times;
target_set = find([Targets.First_Time] <= current_time ...
& [Targets.Last_Time] >= current_time);
% Using target_set here. Targets are not modified within this loop
end
``````

MATLAB profiler is telling me that this line takes about 40 minutes with 40,000 calls.

Is there a way that I can do this more efficiently?

`current_time` is incremented in a for_loop in order. I was thinking that the fact that this is always increasing could be used to shortcut some of the testing. For example `Targets.First_Time <= current_time` will be a subset of `Targets.First_Time <= current_time+n`.

`numel(sorted_set_of_times)` is approximately 40,000

`numel(Targets)` is more than 10 million

• 1. struct could be causing it to be slower. 2. logical indexing might help remove find and thus get some performance improvement. Is `current_time` incremented with constant stepsize? Could you share more of the related code, the loop code maybe? – Divakar Aug 4 '14 at 5:35
• Hi Divakar, sorry I can't share the actual code because it is on an air-gapped system. `current_time` does not increment evenly, but it is sorted. – Samuel O'Malley Aug 4 '14 at 5:43
• Do `Targets.First_Time` or `Targets.Last_Time` change within that loop? – Divakar Aug 4 '14 at 5:44
• No, Targets is unmodified – Samuel O'Malley Aug 4 '14 at 5:44
• `numel(sorted_set_of_times)`? – Divakar Aug 4 '14 at 5:52

Approach #1

Vectorized solution with `bsxfun` -

``````eqcond = bsxfun(@le,Targets.First_Time,sorted_set_of_times) & bsxfun(@ge,Targets.Last_Time,sorted_set_of_times);
[r,c] = find(eqcond);
for k =1:numel(sorted_set_of_times)
target_set = r(c==k);
end
``````

Suggestion to use logical indexing (if applicable): If you are using `target_set` to index into one of the dimensions of some variable named `target`, which is of length same as `Targets.First_Time` for that dimension, then instead of calculating `target_set` you can directly index into that dimension of `target` using `eqcond(:,ind)`, where `ind` would be the index to `sorted_set_of_times` in that loop. Thus, as an example, if you were indexing into the rows of `target` using `target_set` in your original code like `target(target_set,..)`, then you can do `target(eqcond(:,ind),..)` instead.

Approach #2

Reduced data approach -

``````vind = find(Targets.First_Time <= Targets.Last_Time); %//Indices to reduce Targets datasize
Targets.First_Time = Targets.First_Time(vind);
Targets.Last_Time = Targets.Last_Time(vind);
for current_time = sorted_set_of_times;
target_set = vind([Targets.First_Time] <= current_time & [Targets.Last_Time] >= current_time);
end
``````

Approach #3 (Hybrid of Approaches #1,2)

``````vind = find(Targets.First_Time <= Targets.Last_Time);
Targets.First_Time = Targets.First_Time(vind);
Targets.Last_Time = Targets.Last_Time(vind);
eqcond = bsxfun(@le,Targets.First_Time,sorted_set_of_times) & bsxfun(@ge,Targets.Last_Time,sorted_set_of_times);
[r,c] = find(eqcond);
for k =1:numel(sorted_set_of_times)
target_set = vind(r(c==k));
end
``````

Suggestion to use logical indexing (if applicable): On a similar discussion as stated for approach #1, you could perform logical indexing for this one too. Thus, using the same notations as for that discussion, instead of doing `target(target_set,..)`, you can do `target(vind(eqcond(:,ind)),..)`.

• Do `Targets.First_Time` and `sorted_set_of_times` have to be the same length here? – Samuel O'Malley Aug 4 '14 at 6:05
• Woops, sorry. There are 10 million+ Targets, each with a First_Time and Last_Time. – Samuel O'Malley Aug 4 '14 at 6:10
• @SamuelO'Malley Ops my bad! I am assuming `Targets.First_Time` to be a column vector and `sorted_set_of_times` to be a row vector and also they don't have to be of the same lengths! Please ignore my previous comment! – Divakar Aug 4 '14 at 6:10
• No problem. Let me get back to you with the timing, it could still take a couple of hours to run through. Thanks for your help :) – Samuel O'Malley Aug 4 '14 at 6:17
• @SamuelO'Malley Check out the just added `Approach #2`! – Divakar Aug 4 '14 at 7:12

I don't know specific MATLAB instructions, but you can try following, trading memory for CPU:

1. Iterate over all targets as TARGET.
2. Find `min_time >= TARGET.First_Time` and `max_time <= TARGET.Last_Time` - using binary search.
3. Add TARGET to target_set for each time between min_time and max_time.
4. Iterate times as before, but use precomputed target_sets.
• How does this save time? – Dennis Jaheruddin Aug 4 '14 at 13:14
• O(n*m) -> O(n (ln m+result)) – kilotaras Aug 4 '14 at 13:20

I was just looking at the problem description, and I think the use of an Interval Tree or KD Tree might be a better choice of data structure to the type of query you are doing.( Search based on ranges).

As in, let's say you build an interval tree with (startTime, EndTime), then you can execute the query on the ranges. Here's a very good thread on Stackoverflow about such range querying data structures

I don't know matlab, but it does seem to have support for KD-TREES. I couldn't find information about Interval trees in matlab, but here's a good tutorial on the same.

I think that a brute force approach will never get much faster with these numbers. (Not by taking out structs or using logical indexing).

If you want a fast algorithm, I think the following can work:

1. Sort `current_time` (already done)
2. Sort target by `First_Time`
3. Find for all targets the starting point `S`
4. Sort by `Last_Time`
5. Find for all targets the endpoint `E`

If you have two sorted lists you just need to loop through each once to find the relevant point, significantly reducing the complexity of the operation.

Now you can just call your function for each target and use `current_time(S:E)`