# Is it safe to sort a container which may contain infinities using quicksort?

I have realized that in order for quicksort to work, all the infinities need to be equal.

In other words, such a criterium is not enough:

``````class Entity
{
public:
float value() const;
bool valueIsInfinite() const;
};

class Criterium
{
bool operator()(Entity left, Entity right)const
{
if (left.valueIsInfinite())
return false;
return left.value() < right.value();
}
}

const Criterium criterium;
QVector<Entity> container;

qSort<container.begin(), container .end(), criterium>
``````

This sorting fails, because not all infinities are equal according to the criterium. The unequalness depends on the order in which the entities enter the operator. I found out, that such a ordering fails.

I need something like this:

``````class Criterium
{
bool operator()(Entity left, Entity right)const
{
if (left.valueIsInfinite() && right.valueIsInfinite())
return false;
if (left.valueIsInfinite() && !right.valueIsInfinite())
return false;
if (!left.valueIsInfinite() && right.valueIsInfinite())
return true;
return left.value() < right.value();
}
}
``````

``````   float Entity::value() const;
bool Entity::valueIsInfinite() const;
``````

methods, I would like to use just

``````   float Entity::value() const;
``````

And have it return

``````std::numeric_limits<float>::infinity();
``````

in cases where

``````bool Entity::valueIsInfinite() const;
``````

would return true.

Now I tested this approach and it seems to work. But I am concerned about other ways in which an infinity may arise. For example:

``````float otherInfinity = exp(std::numeric_limits<float>::infinity());
``````

This infinity seems to be the same. But I want to be sure. I know that C++ standard does not mention details of floating point arithmetic implementation, but if I use gcc, is it safe in all cases? I mean are all infinities created equal in gcc? Is it safe to sort a container of floats, which may contain infinities which have arisen on different occasions?

-
All infinities are equal, but some are more equal than others. –  Mysticial Jul 25 '12 at 1:54

Without the presence of NaNs, infinities are fine with the regular operator `<`:

• +∞ < +∞ is false: `<` is irreflexive;
• if +∞ < x is true then x < +∞ is false for non-infinity values: `<` is antisymmetric;
• if +∞ < x is true and x < y is true, then +∞ < y is true: `<` is transitive;
• if +∞ is incomparable (not less, not greater) with x, and x is incomparable with y, then +∞ is incomparable with y: `<` displays transivity of equivalence.

(similar properties are valid for -∞)

Given those properties `operator<` on floats without NaNs is a strict weak ordering, and thus suitable for standard library style ordering operations.

However, with NaNs, the antisymmetry property is broken: NaN < 1 is false, and 1 < NaN is false too. You can solve this by ordering all NaNs either before or after all non-NaNs, in a manner similar to your proposed strategy:

``````struct Criterion
{
bool operator()(Entity left, Entity right)const
{
// NaNs come before non-NaNs
if (isnan(left.value()) && isnan(right.value()))
return false;
if (!isnan(left.value()) && isnan(right.value()))
return false;
if (isnan(left.value()) && !isnan(right.value()))
return true;
return left.value() < right.value();
}
}
``````

(`isnan` can be found on the C++11 standard library, or implemented quite easily as `return x != x;`)

With this, we get NaN < 1 as true, and 1 < NaN as false, while the other properties still hold.

-

If you use this:

``````bool operator()(Entity left, Entity right)const
{
return !(left.valueIsInfinite() && right.valueIsInfinite())
&& left.value() < right.value();
}
``````

Then the infinites are considered of the same order, since none comes before another one...

-
Thank you, but that is not exactly what I asked. I would like to eliminate the valueIsInfinite() method entirely –  Martin Drozdik Jul 25 '12 at 2:12