# How to find the max value of unknown integer type

How can I find the maximal integer value of an unknown type? Is there something more efficient than this:

``````template<class T>
T test(T i) {
if (((T)-1) > 0)
return -1;
T max_neg = ~(1 << ((sizeof(T)*8)-1));
T all_ones = -1;
T max_pos = all_ones & max_neg;
return max_pos;
}
``````
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Note: the given code was probably wrong. The early `-1` test and return for unsigned types is OK, but then: for `max_neg`: first `CHAR_BIT` may be more than `8`, and anyway you're shifting a `1` into the sign bit, which I think is undefined; and for `all_ones`: `-1` may not be "all ones", for example on a one's complement or sign-and-magnitude machine. And for the logic: it seems that `max_neg` would already be equal to `max_pos`. –  gx_ Jul 8 '13 at 8:39

Use `std::numeric_limits<T>::max()`. Since C++11, this function is `constexpr` and thus evaluated at compile-time.

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Even pre-C++11, the function was generally inline, and the compiler would evaluate it at compile-time. (But because this wasn't required, you couldn't use it in contexts which required a compile time constant.) –  James Kanze Jul 8 '13 at 9:00

`std::numeric_limits<T>::max()` is a good starting point.

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This is good: `std::numeric_limits<T>::max()` or if you like boost: `boost::integer_traits<T>::max()`.

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"Linear complexity for both." - Huh, linear complexity on what, the non-existent input? It's a simple constant that they return. –  Christian Rau Jul 8 '13 at 8:59
@ChristianRau Pre C++11, the standard didn't impose any complexity, so an implementation could make it linear complexity (say by incrementing until the incrementation resulted in a smaller value). Of course, it's probably safe to say that none were that stupid. –  James Kanze Jul 8 '13 at 9:03
@ChristianRau You're right. –  soerium Jul 8 '13 at 9:29