# C++ STL Algorithms Series - Part 4

## Topic

This week we’ll be looking at where algorithms can lead us into trouble and how we can avoid falling into these traps. (This article is a little longer than usual, normal programming will resume next week).

## Motivation

This came from a real-world example where rigid adherence to trying to use an algorithm at all costs lead to an unexpected outcome. By taking a step back and thinking through the problem again, an alternative approach presented itself, but served as a stark reminder to check ones thinking and never assume.

## Example

Imagine we have some entity data split into two separate arrays. This is some code we’ve identified as ripe for optimization so we’ve split up our struct to keep the hot and cold fields separate. In this example we have an entity position and whether or not it’s currently visible.

AZStd::vector<AZ::Vector3> positions = ...;
AZStd::vector<bool> visibility = ...;


Before we process the entities we’d like to filter them so we’re only drawing the visible ones. The for loop version might look something like this:

AZStd::vector<AZ::Vector3> positions_to_draw_loop;
for (size_t i = 0; i < element_count; ++i)
{
if (visibility[i])
{
positions_to_draw_loop.push_back(positions[i]);
}
}


We can’t use a range-based for loop here as we need a view into another range. std::transform is no good as we want to filter elements. What we really want is a technique popularized in functional programming languages called zip_with. This takes two ranges and combines them together (so we could have a temporary value of our position and visible state). Frustratingly zip_with doesn’t exist in C++, but there’s something very close.

We can use std::inner_product to perform a transform-reduce operation on our two collections (we actually do need inner_product for this and not C++17’s transform_reduce, as it has strict requirements about the operands the reduce step needs for parallel execution reasons). What we do is first transform our two ranges (positions and visibility) into a std::pair containing both values (the zip operation) and then perform a reduction by pushing back the position if it’s visible (the accumulator value is a std::vector of positions). The algorithm is presented below (somewhat confusingly the transform step is the second lambda and the reduction step is the first).

const auto positions_to_draw_algo =
AZStd::inner_product(
AZStd::begin(positions), AZStd::end(positions),
AZStd::begin(visibility), AZStd::vector<AZ::Vector3>{},
[](AZStd::vector<Vector3> acc, const AZStd::pair<Vector3, bool>& combined)
{
if (combined.second)
{
acc.push_back(combined.first);
}

return acc;
},
[](const Vector3& position, bool visible)
{
return std::make_pair(position, visible);
});


This appeared to neatly solve the problem but quickly showed up as a hotspot. Recreating the example in a simple benchmark and comparing with the for loop version gave some surprising results.

The algorithm version was 380x slower than the regular for loop version. The initial horror was alleviated somewhat after switching to C++20 where inner_product has been updated to move the accumulator value in each iteration of the loop instead of copying it (but remember this is only in C++20, so it’s going to be very slow unless we add our own version to AZStd in the meantime). With that performance bug fixed the algorithm version still came in roughly 3x slower than the for loop.

At this point it would have been fine to just revert to the for loop and call it a day, but is there still an algorithm that’s a better fit? Unfortunately the algorithm headers didn’t seem to have a solution (please let me know if there is!). After a while, taking inspiration from the standard library itself (the cppreference example implementations are incredibly helpful here), this solution presented itself:

template<class InputIt1, class InputIt2, class OutputIt, class UnaryPredicate>
InputIt1 first, InputIt1 last, InputIt2 firstMask,
OutputIt d_first, UnaryPredicate pred)
{
...
}


copy_if_mask is pretty much a carbon copy of copy_if, but now a separate mask can be passed into use as the unary predicate for each element. The calling code now looks like this:

auto position_to_draw_algo_new = std::vector<Vec3>{};
positions.begin(), positions.end(), visibility.begin(),
AZStd::back_inserter(position_to_draw_algo_new),
[](const auto& visible)
{
return visible;
});


This arguably looks the most succinct out of all three, and the even better news is it’s as fast as the for loop version (in testing them there was at most a 1.1x difference). The takeaway here is that it’s perfectly fine and sometimes necessary to write your own algorithms if the standard is missing something useful. Don’t be afraid to try this (just remember to write some unit tests to go along with it).

## Deliberation

As with everything in C++, there’s a hundred and one ways to shoot yourself in the foot. The best defense we have against this is to slow down and test our thinking. There’s no silver bullet and algorithms alone won’t make your code better or your programs faster. They’re just another tool that we as software engineers should be aware of and know when to reach for.

I hope this series has been useful and given a taste of what is available in the numeric and algorithm headers. We’ve really only just scratched the surface and the plethora of new algorithms and techniques coming in the std::ranges library will give us even more to learn.