I've been learning about C++ constexpr
functions, and I implemented a constexpr
recursive function to find the nth fibonacci number.
#include <iostream>
#include <fstream>
#include <cmath>
#include <algorithm>
#include <vector>
constexpr long long fibonacci(int num) {
if (num <= 2) return 1;
return fibonacci(num - 1) + fibonacci(num - 2);
}
int main() {
auto start = clock();
long long num = fibonacci(70);
auto duration = (clock() - start) / (CLOCKS_PER_SEC / 1000.);
std::cout << num << "\n" << duration << std::endl;
}
If I remove the constexpr
identifier from the fibonacci()
function, then fibonacci(70)
takes a very long time to evaluate (more than 5 minutes). When I keep it as-is, however, the program still compiles within 3 seconds and prints out the correct result in less than 0.1
milliseconds.
I've learned that constexpr
functions are evaluated at compile time, so this would mean that fibonacci(70)
is calculated by the compiler in less than 3 seconds! However, it doesn't seem quite right that the C++ compiler would have such better calculation performance than C++ code.
My question is, does the C++ compiler actually evaluate the function between the time I press the "Build" button and the time the compilation finishes? Or am I misunderstanding the keyword constexpr
?
EDIT: This program was compiled with g++ 7.5.0
with --std=c++17
.
-std=c++17
(with or without-O3
). Both compilers decided theconstexpr
was too deeply recursive, compiled it to compute at runtime, then timed out at runtime.long long num = fibonacci(70);
becomeconstexpr long long num = fibonacci(70);
to force compile-time evaluation, they both died complaining about excessive recursion. That's why I asked how the OP compiled their code; I don't think they're wrong, but it's needed to reproduce their result.std::endl
to force pointless flushing of cout between lines, even when the output is a pipe.)