Given two functions in PHP, say
function f($n) {
return $n;
}
function g($n) {
return pow($n, (2/3));
}
How to check if a function f(n) is in Ω(g(n)), Θ(g(n)) or O(g(n)) in PHP?
What I tried so far:
$n = INF;
$A = f($n) / g($n);
if ($A == 0) {
echo "f(n) = O(g(n))";
} elseif (is_infinite($A)) {
echo "f(n) = Ω(g(n))";
} elseif ($A != 0) {
echo "f(n) = Θ(g(n))";
}
Shouldn't that work?
Your basic idea is correct: you have to find the limit of f(n)/g(n) as n grows without bound. Unfortunately there is no easy way to compute the exact limit in PHP, since that requires symbolic computations which is best left to a computer algebra system such as Mathematica or Maxima.
You can approximate the limit by computing f(n)/g(n) for increasing values of n and seeing if you get a sequence that approaches a fixed value. For example:
$n=1;
while ($n < 1e300) {
$A = f($n)/g($n);
echo $A, "\n";
$n *= 1e12;
}
In this particular case the sequence of f(n)/g(n) seems to grow without bound, so the numerical evidence suggests that f(n) is in Ω(g(n)). This is not a proof though; symbolic methods are needed for that.
Both the time and space requirements for both f() and g() are in Ω(1), Θ(1) and O(1).
f($n) / g($n)just divide the result of each function