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We have constexpr functions since C++11, and they have been getting less restricted since with every new standard (14, 1z).
Yet, the most obvious functions in STL which could be made constexpr, the cmath/math.h functions, still have no constexpr version in any standard library implementation AFAIK.
Is this just in the backlog of the C++ standard, or is there any other reason why we still don't have constexpr versions of these functions?
It hasn't been standardized yet. An initial proposal was submitted just last week, but only covering utility and linear operations and not any transcendental functions. Math is hard and floating-point math is complicated. For example, implementations don't allow overflows to infinity in constexpr, but this isn't yet clearly standardized.
The compiler's constexpr interpreter would have to special-case the math library interface, since unlike the rest of the standard library, it can't see its implementation.
GCC does offer constant evaluation of math functions as a nonconforming extension.
constexpr doesn't guarantee compile-time success. Constant math can bail out on overflow or errno, which is just what GCC does.
– Potatoswatter
Feb 12 '17 at 16:32
constexpr parts of the standard library have their implementation in the headers. That's what would make the math a special case. (And in GCC, it's already a special case, implemented in their C constant folding engine and utilized for C++ constexpr.)
– Potatoswatter
Feb 12 '17 at 23:33
pow function which I was specifically interested in is implemented as constexpr-ish __builtin_pow.
– Danra
Feb 13 '17 at 10:59
mathtag is appropriate here, at least according to the tag wiki. I suggest you remove it. – tambre Feb 12 '17 at 15:09sincos,... asconstexpr, and while it was not impossible it did pose a big challenge at least using c++11. A big part of the issue is that it would be hard to guarantee that the algorithms that they could use to generate aconstexprversion of the functions would be of the same quality as the runtime versions. And that doesn't even account for the need for error handling... – Alex Zywicki Feb 12 '17 at 15:48constexprversions of<cmath>functions equally is a matter of fact, not opinion. Please do not close questions about the ISO standardization process if you personally aren't familiar with it. – MSalters Feb 12 '17 at 22:25