P1467R2
Extended floating-point types

Published Proposal,

This version:
https://wg21.link/P1467
Issue Tracking:
Inline In Spec
Authors:
(NVIDIA)
(NVIDIA)
Audience:
EWG, LEWG
Toggle Diffs:
Project:
ISO/IEC JTC1/SC22/WG21 14882: Programming Language — C++

1. Abstract

This proposal allows implementations to define extended floating-point types in addition to the three standard floating-point types. It defines the rules for how the extended floating-point types interact with each other and with other types without changing the behavior of the existing standard floating-point types. It specifies the rules for type conversions, arithmetic conversions, promotions, and narrowing conversions. It specifies the necessary standard library support for the extended floating-point types.

The companion paper, [P1468], defines some standard names for commonly used floating-point formats. The end goal of these two papers is to enable the use of newer floating-point types, such as IEEE 16-bit, in standard conforming code.

2. Revision history

2.1. R0 -> R1 (pre-Cologne)

Applied guidance from SG6 in Kona 2019:

  1. Make the floating-point conversion rank not ordered between types with overlapping (but not subsetted) ranges of finite values. This makes the ranking a partial order.

  2. Narrowing conversions are now based on floating-point conversion rank instead of ranges of finite values, which preservesthe current narrowing conversions relations between standard floating-point types; it also interacts favorably with the rank being a partial ordering.

  3. Operations that deal with floating-point types whose conversion ranks are unordered are now ill-formed.

  4. The relevant parts of the guidance have been applied to the library wording section as well.

Afterwards, applied suggestions from EWGI in Kona 2019 (this modifies some of the points above):

  1. Apply the suggestion to make types where one has a wider range of finite values, but a lower precision than the other, unordered in their conversion rank, and therefore make operations that mix them ill-formed. The motivating example was IEEE-754 binary16 and bfloat16; see Floating-point conversion rank for more details. This change also caused this paper to drop the term "range of finite values", since the modified semantics are better expressed in terms of sets of values of the types.

  2. Add a change to narrowing conversions, to only allow exact conversions to happen.

  3. Explicitly list parts of the language that are not changed by this paper; provide a more detailed analysis of the standard library impact.

2.2. R1 -> R2 (pre-Belfast)

Changes based on feedback in Cologne from SG6, LEWGI, and EWGI. Further changes came from further development of the paper by the authors, especially the overload resolution section.

3. Motivation

16-bit floating-point support is becoming more widely available in both hardware (ARM CPUs and NVIDIA GPUs) and software (OpenGL, CUDA, and LLVM IR). Programmers wanting to take advantage of 16-bit floating-point support have been stymied by the lack of built-in compiler support for the type. A common workaround is to define a class type with all of the conversion operators and overloaded arithmetic operators to make it behave as much as possible like a built-in type. But that approach is cumbersome and incomplete, requiring inline assembly or other compiler-specific magic to generate efficient code.

The problem of efficiently using newer floating-point types that haven’t traditionally been supported can’t be solved through user-defined libraries. A possible solution of an implementation changing float to be a 16-bit type would be unpopular because users want support for newer floating-point types in addition to the standard types, and because users have come to expect float and double to be 32- and 64-bit types and have lots of existing code written with that assumption.

This problem is worth solving, and there is no viable solution under the current standard. So changing the core language in an extensible and backward-compatible way is appropriate. Providing a standard way for implementations to support 16-bit floating-point types will result in better code, more portable code, and wider use of those types.

This paper changes the language so that implementations can support 16-bit and other non-standard floating-point types. [P1468] gives well-known names to 16-bit and other commonly used floating-point types.

The motivation for the current approach of extended floating-point types comes from discussion of the previous paper [P0192]. That proposal’s single new standard type of short float was considered insufficient, preventing the use of both IEEE-754 16-bit and bfloat16 in the same application. When that proposal was rejected, the current, more expansive, proposal was developed. It is not feasible to predict which floating-point types, or even how many different types, will be used in the future, so this proposal allows for as many types as the implementation sees fit.

4. Proposal summary

In a nutshell:

  1. Introduce extended floating-point types.

  2. Define floating-point conversion rank, which governs how floating-point types interact with each other.

  3. Adjust the rules for promotion, standard conversions, usual arithmetic conversions, narrowing conversions, and overload resolution to make use of conversion rank.

  4. Add function overloads and template specializations for extended floating-point types to <cmath>, <charconv>, <format>, <complex> and <atomic>.

5. Core language changes

5.1. Things that aren’t changing

It is currently implementation-defined whether or not the floating-point types support infinity and NaN. That is not changing. That feature will still be implementation-defined, even for extended floating-point types.

The radix of the exponent of each floating-point type is currently implementation-defined. That is not changing. This paper will make it easier for the radix of extended floating-point types to be different from the radix of the standard types.

5.2. Extended floating-point types

In addition to the three standard floating-point types, float, double, and long double, implementations may define any number of extended floating-point types, similar to how implementations may define extended integer types.

5.2.1. Reasoning

The set of floating-point types that have hardware support is not possible to accurately predict years into the future. The standard needs to provide an extensible solution that can adapt to changing hardware without having to modify the standard.

5.2.2. Wording

Modify 6.7.1 "Fundamental types" [basic.fundamental] paragraph 12:

There are three standard floating-point types: float, double, and long double. The type double provides at least as much precision as float, and the type long double provides at least as much precision as double. The set of values of the type float is a subset of the set of values of the type double; the set of values of the type double is a subset of the set of values of the type long double. There may also be implementation-defined extended floating-point types. The standard and extended floating-point types are collectively called floating-point types. The value representation of floating-point types is implementation-defined. [...]

5.3. Conversion rank

Define floating-point conversion rank to mimic in some ways the existing integer conversion rank. Floating-point conversion rank is defined in terms of the sets of values that the types can represent. If the set of values of type T is a strict superset of the set of values of type U, then T has a higher conversion rank than U. If two types have the exact same sets of values, they still have different conversion ranks; see the wording below for the exact rules. If the sets of values of two types are neither a subset nor a superset of each other, then the conversion ranks of the two types are unordered. Floating-point conversion rank forms a partial order, not a total order; this is the biggest difference from integer conversion rank.

5.3.1. Reasoning

Earlier versions of this proposal used the range of finite values to define conversion rank, and had the conversion rank be a total ordering. Discussions in SG6 in Kona pointed out that that definition resulted in undesirable interactions between IEEE binary16 with 5-bit exponent and 10-bit mantissa, and bfloat16 with 8-bit exponent and 7-bit mantissa. bfloat16 has a much larger finite range, so it would have a higher conversion rank under the old rules. Mixing binary16 and bfloat16 in an arithmetic operation would result in the binary16 value being converted to bfloat16 despite the loss of three bits of precision. This implicit loss of precision was worrisome, so the definition of conversion rank was changed so that the usual arithmetic conversions between two floating-point values always preserves the value exactly.

For the purposes of conversion rank, infinity and NaN are treated just like any other values. If type T supports infinity and type U does not, then U can never have a higher conversion rank than T, even if U has a bigger range and a longer mantissa.

5.3.2. Wording

Change the title of section 6.7.4 [conv.rank] from " Integer conversion rank " to " Conversion ranks ", but leave the stable name unchanged. Insert a new paragraph at the end of the subclause:

Every floating-point type has a floating-point conversion rank defined as follows:

[ Note: The conversion ranks of extended floating-point types T1 and T2 will be unordered if the set of values of T1 is neither a subset nor a superset of the set of values of T2. This can happen when one type has both a larger range and a lower precision than the other. -- end note ] [ Note: The floating-point conversion rank is used in the definition of the usual arithmetic conversions ([expr.arith.conv]). -- end note ]

5.4. Promotion

Floating-point promotions are unchanged, except when passing an argument to a varargs functions. When a function argument is bound to the ellipsis of a varargs function, any type whose conversion rank is smaller than that of double is promoted to double. In all other situations, only float is promoted to double.

5.4.1. Reasoning

The overload resolution rules work best if there are no floating-point promotions, only standard conversions. For backwards compatibility, float still promotes to double. But no other floating-point conversions are considered promotions.

But this rule prevents smaller extended floating-point types from being promoted to double when passed to a varargs function. Therefore, some wording is added to the ellipsis conversion rules to perform that promotion.

5.4.2. Wording

No changes are necessary to 7.3.7 "Floating-point promotion" [conv.fpprom].

Add a new sentence just before the last sentence in paragraph 12 of 7.6.1.2 "Function call" [expr.call]:

[...] If the argument has integral or enumeration type that is subject to the integral promotions (7.3.6), or a floating-point type that is subject to the floating-point promotion (7.3.7), the value of the argument is converted to the promoted type before the call. If the argument has floating-point type that is not subject to floating-point promotion, and if the argument type has a floating-point conversion rank ([conv.rank]) that is less than the rank of double, then the value of the argument is converted to double before the call. These promotions are referred to as the default argument promotions.

5.5. Implicit conversions

The standard currently allows implicit conversions between any arithmetic types, even if the conversion could result in a loss of information. This can’t be changed for any existing arithmetic types, but it is possible to choose a different behavior for the new extended floating-point types. A reasonable rule would be to allow implicit conversions between floating-point types only when converting to a type with a higher conversion rank (or when converting between two standard floating-point types, for backward compatibility).

This part of the proposal is new and hasn’t been discussed in any of the study groups, so it is not yet known what the opinion of the committee is on the matter. The authors of the paper are undecided on which choice is best and would like EWG’s opinion.

If implicit conversions are always allowed, that most closely matches existing behavior and will likely lead to fewer surprises. If potentially lossy conversions are not implicit, that will lead to safer code. Since explicit conversions between all floating-point types would still be allowed, potentially lossy conversions would be more verbose rather than forbidden.

Should implicit conversions be allowed from larger floating-point types to smaller floating-point types?

5.5.1. Example

Assuming that extended floating-point conversions are restricted as proposed:

double f64 = 1.0;
float f32 = 2.0;
__fp16 f16 = 3.0;
fp64 = fp32; // okay
fp32 = fp64; // okay, standard types for backward compatibility
fp64 = fp16; // okay
fp16 = fp64; // error, implicit conversion not allowed
fp16 = static_cast<__fp16>(fp64); // okay, explicit cast

5.5.2. Wording

If it is decided that implicit conversions are always allowed, then no wording changes are necessary. 7.3.9 [conv.double] already does the right thing.

If it is decided that implicit conversions should be restricted, then the following wording changes are necessary:

Modify section 7.3.9 "Floating-point conversions" [conv.double] as follows:

A prvalue of floating-point type can be converted to a prvalue of another floating-point type with a higher conversion rank or with the same set of values, or a prvalue of standard floating-point type can be converted to a prvalue of another standard floating-point type . If the source value can be exactly represented in the destination type, the result of the conversion is that exact representation. If the source value is between two adjacent destination values, the result of the conversion is an implementation-defined choice of either of those values. Otherwise, the behavior is undefined.

The conversions allowed as floating-point promotions are excluded from the set of floating-point conversions.

In section 7.6.1.8 "Static cast" [expr.static.cast], add a new paragraph after paragraph 10 ("A value of integral or enumeration type can [...]"):

A value of floating-point type can be explicitly converted to any other floating-point type. If the source value can be exactly represented in the destination type, the result of the conversion is that exact representation. If the source value is between two adjacent destination values, the result of the conversion is an implementation-defined choice of either of those values. Otherwise, the behavior is undefined.

Note: A static_cast from a higher floating-point conversion rank to a lower conversion rank is already covered by [expr.static.cast] p7, which talks about inverses of standard conversions. The new paragraph is necessary to allow explicit conversions between types with unordered conversion ranks. The wording about what to do with the value is stolen from the floating-point conversions section [conv.double].

5.6. Usual arithmetic conversions

The proposed usual arithmetic conversions for floating-point types are based on the floating-point conversion rank, similar to integer arithmetic conversions. But because floating-point conversions are a partial ordering, there may be some expressions where neither operand will be converted to the other’s type. It is proposed that these situations are ill-formed.

5.6.1. Example

In this implementation, let float be IEEE binary32, __fp16 be IEEE binary16, and __bfloat be 16-bit bfloat.

float f32 = 1.0;
__fp16 f16 = 2.0;
__bfloat b16 = 3.0;
f32 + f16; // okay, f16 converted to float, result type is float
f32 + b16; // okay, b16 converted to float, result type is float
f16 + b16; // error, neither type can convert to the other via arithmetic conversions

5.6.2. Wording

Modify section 7.4 Usual arithmetic conversions [expr.arith.conv] as follows:

Many binary operators that expect operands of arithmetic or enumeration type cause conversions and yield result types in a similar way. The purpose is to yield a common type, which is also the type of the result. This pattern is called the usual arithmetic conversions, which are defined as follows:
  • If either operand is of scoped enumeration type ([dcl.enum]), no conversions are performed; if the other operand does not have the same type, the expression is ill-formed.

  • If either operand is of type long double, the other shall be converted to long double.
  • Otherwise, if either operand is double, the other shall be converted to double.
  • Otherwise, if either operand is float, the other shall be converted to float.
  • Otherwise, if either operand has a floating-point type, the following rules shall be applied:
    • If both operands have the same type, no further conversion is needed.
    • Otherwise, if one of the operands has a type that is not a floating-point type, that operand shall be converted to the type of the operand with the floating-point type.
    • Otherwise, if the floating-point conversion ranks ([conv.rank]) of the types of the operands are ordered, then the operand with the type of the lower floating-point conversion rank shall be converted to the type of the other operand.
    • Otherwise, the expression is ill-formed.
  • Otherwise, the integral promotions ([conv.prom]) shall be performed on both operands.(59) Then the following rules shall be applied to the promoted operands:

    • If both operands have the same type, no further conversion is needed.

    • Otherwise, if both operands have signed integer types or both have unsigned integer types, the operand with the type of lesser integer conversion rank shall be converted to the type of the operand with greater rank.

    • Otherwise, if the operand that has unsigned integer type has rank greater than or equal to the rank of the type of the other operand, the operand with signed integer type shall be converted to the type of the operand with unsigned integer type.

    • Otherwise, if the type of the operand with signed integer type can represent all of the values of the type of the operand with unsigned integer type, the operand with unsigned integer type shall be converted to the type of the operand with signed integer type.

    • Otherwise, both operands shall be converted to the unsigned integer type corresponding to the type of the operand with signed integer type.

If one operand is of enumeration type and the other operand is of a different enumeration type or a floating-point type, this behavior is deprecated (D.1).

5.7. Narrowing conversions

A narrowing conversion is a conversion from a type with a higher floating-point conversion rank to a type with a lower conversion rank, or a conversion between two types with unordered conversion rank.

5.7.1. Same representation

When two different floating-point types have the same representation, one of the types has a higher conversion rank than the other. Which means that a conversion between the two types will be a narrowing conversion in one of the directions even though the value will be preserved. For example, on some implementations, double and long double have the same representation, but long double always has a higher conversion rank than double, so a conversion from long double to double is considered a narrowing conversion.

An earlier version of this paper defined narrowing conversions in terms of sets of representable values, not in terms of conversion rank. With that definition, conversions between types with the same representation would never be a narrowing conversion. SG6 in Kona preferred using conversion rank over sets of values, so the proposal was changed to the current definition. One argument against the old definition was that it changed the behavior for standard floating-point types, as in the example of double and long double above.

It would be possible to have different rules for standard floating-point types and extended floating-point types, but the authors feel it is best to maintain consistency between standard and extended types, and to not change the behavior of standard types.

5.7.2. Constant values

This proposal preserves the existing wording in [dcl.init.list] p7.2, "except where the source is a constant expression and the actual value after conversion is within the range of values that can be represented (even if it cannot be represented exactly)." A reasonable argument could be made that this constant value exception should not apply to extended floating-point types. But the authors are not in favor of that change. It would introduce an inconsistency between standard and extended types. It would cause __fp16 x{2.1}; to be a narrowing conversion because 2.1 cannot be represented exactly in binary floating-point representations (assuming that __fp16 is the name of an extended floating-point type with a conversion rank lower than double).

5.7.3. Wording

Modify the definition of narrowing conversions in 9.3.4 "List-initialization" [dcl.init.list] paragraph 7 item 2:

  • from long double to double or float, or from double to float from a floating-point type T to another floating-point type whose floating-point conversion rank is not greater than that of T , except where the source is a constant expression and the actual value after conversion is within the range of values that can be represented (even if it cannot be represented exactly), or

5.8. Overload resolution

When comparing conversion sequences that involve floating-point conversions, prefer conversions that are value-preserving, and prefer conversions to lower conversion ranks over conversions to higher conversion ranks.

5.8.1. Reasoning

One of the goals of this proposal is to allow code that overloads a function on some of the floating-point types and have calls to that function be well-formed as long as the argument is of a floating-point type that can be safely converted to at least one of the possible parameter types.

For example, let float be IEEE 32-bit, double be IEEE 64-bit, and long double be X87 80-bit. And let __fp16, __fp32, and __fp64 be extended floating-point types that represent IEEE 16-bit, 32-bit, and 64-bit respectively. Then given a function overloaded on the 32-bit and 64-bit extended floating-point types:

void f(__fp32);
void f(__fp64);

The following functions calls should be well-formed:

f((__fp16)1.0); // calls f(__fp32)
f((__fp32)2.0); // calls f(__fp32)
f((__fp64)3.0); // calls f(__fp64)
f((float)4.0);  // calls f(__fp32)
f((double)5.0); // calls f(__fp64)

But the function call f((long double)6.0); would be an ambiguous function call.

Achieving this behavior is not possible by tweaking the definitions of floating-point promotions and floating-point conversions. There needs to be changes to the overload resolution rules so that certain floating-point conversions are preferred over others.

This change will result in one change to existing behavior, allowing currently ill-formed programs to become well-defined (or changing the result of an overload resolution that depends on SFINAE). Given a function that is overloaded on float and long double (but not double):

void g(float);
void g(long double);

Then the call g((double)1.0); is ill-formed in C++20, but will result in void g(long double); being called if this proposal is adopted. This is a very small change. The only existing well-defined programs whose behaviors would change are those that are SFINAEing away an overload based on a function call similar to the example being ill-formed. The authors believe that situation is rare enough that this change is acceptable.

5.8.2. Wording

In 12.3.3.2 "Ranking implicit conversion sequences" [over.ics.rank] paragraph 4, add a new bullet between (4.2) and (4.3):

5.9. Feature test macro

Should there be a feature test macro to indicate that the implementation supports at least one extended floating-point type?

Implementations could support extended floating-point types without supporting any of the aliases defined in [P1468]. So it might be useful to have a feature test macro that indicates support for extended floating-point types listed in 15.10 [cpp.predefined]. But it would likely have to be one of the conditionally-defined macros, and not listed in Table 17, since a conforming compiler might choose to not define any extended floating-point types. If the macro is defined, it would not indicate which extended floating-point types are supported, only that there exists at least one extended floating-point type in the implementation.

6. Library changes

Making extended floating-point types easy to use does not require introducing any new names to the standard library. But it does require adding new overloads or new template specializations in several places. (The companion paper, [P1468], does add new names related to floating-point types to the standard library. But those names are not necessary to make extended floating-point types useful.)

To handle I/O of extended floating-point types, changes are proposed to <charconv> and <format>, but not to <iostream> or <cstdio>.

Implementations will have to change std::numeric_limits and std::is_floating_point to give correct answers for extended floating-point types. The existing wording in the standard already covers that (by referring to all floating-point types without listing them explicitly), so no wording changes are needed.

Most of the standard functions that operate on floating-point types need wording changes to add overloads or template specializations for the extended floating-point types. These classes and functions are in <cmath>, <complex>, and <atomic>.

No changes are proposed to the following parts of the standard library:

6.1. Possible new names

While no new names need to be added to the standard library for extended floating-point types to be useful, there are some new things that could be useful. The authors are undecided if these are useful enough to be worth adding, and would appreciate LEWG feedback on the matter.

6.1.1. Standard/extended floating-point traits

std::is_floating_point_v<T> is true for both standard and extended floating-point types. Should the standard also provide std::is_standard_floating_point and/or std::is_extended_floating_point? Will users need to distinguish between standard and extended types often enough that std::is_same_v<T, float> || std::is_same_v<T, double> || std::is_same_v<T, long double> becomes too unwieldy?

Should the new type traits std::is_standard_floating_point and/or std::is_extended_floating_point be introduced?

6.1.2. Conversion rank trait

Should there be a type trait that reports whether or not one floating-point type has a higher conversion rank than another? This could be useful when writing function templates to figure out which conversions between different floating-point types are safe. See the constructors for std::complex as an example of where this trait would be useful.

Should a new type trait be introduced that can be used to query the floating-point conversion rank relationship?

6.2. <charconv>

Add overloads for all extended floating-point types for the functions to_chars and from_chars.

6.2.1. Wording

Add a new paragraph to the beginning of 20.19.1 "Header <charconv> synopsis" [charconv.syn], before the start of the synopsis:

When a function has a parameter of type integral, the implementation provides overloads for all signed and unsigned integer types and char as the parameter type. When a function has a parameter of type floating-point, the implementation provides overloads for all floating-point types as the parameter type.

Change the header synopsis in [charconv.syn] as follows:

  to_chars_result to_chars(char* first, char* last, see-belowintegral value, int base = 10);
  to_chars_result to_chars(char* first, char* last, floatfloating-point value);
  to_chars_result to_chars(char* first, char* last, double value);
  to_chars_result to_chars(char* first, char* last, long double value);
  to_chars_result to_chars(char* first, char* last, floatfloating-point value,
                           chars_format fmt);
  to_chars_result to_chars(char* first, char* last, double value, chars_format fmt);
  to_chars_result to_chars(char* first, char* last, long double value, chars_format fmt);
  to_chars_result to_chars(char* first, char* last, floatfloating-point value,
                           chars_format fmt, int precision);
  to_chars_result to_chars(char* first, char* last, double value,
                           chars_format fmt, int precision);
  to_chars_result to_chars(char* first, char* last, long double value,
                           chars_format fmt, int precision);

  // ...
  
  from_chars_result from_chars(const char* first, const char* last,
                               see belowintegral& value, int base = 10);

  from_chars_result from_chars(const char* first, const char* last, floatfloating-point& value,
                               chars_format fmt = chars_format::general);
  from_chars_result from_chars(const char* first, const char* last, double value,
                               chars_format fmt = chars_format::general);
  from_chars_result from_chars(const char* first, const char* last, long double value,
                               chars_format fmt = chars_format::general);

In 20.19.2 "Primitive numeric output conversion" [charconv.to.chars], leave the first three paragraphs unchanged, but modify the rest of the section as follows:

to_chars_result to_chars(char* first, char* last, see belowintegral value, int base = 10);
Requires Expects : base has a value between 2 and 36 (inclusive).

Effects: The value of value is converted to a string of digits in the given base (with no redundant leading zeroes). Digits inthe range 10..35 (inclusive) are represented as lowercase characters a..z. If value isless than zero, the representation starts with '-'.

Throws: Nothing.

Remarks: [ Note: The implementation shall provide provides overloads for all signed and unsigned integer types and char as the type of the parameter value. - end note ]
to_chars_result to_chars(char* first, char* last, floatfloating-point value);
to_chars_result to_chars(char* first, char* last, double value);
to_chars_result to_chars(char* first, char* last, long double value);

Effects: value is converted to a string in the style of printf in the "C" locale. The conversion specifier is f or e, chosen according to the requirement for a shortest representation (see above); a tie is resolved in favor of f.

Throws: Nothing.

[ Note: The implementation provides overloads for all floating-point types as the type of the parameter value. - end note ]
to_chars_result to_chars(char* first, char* last, floatfloating-point value, chars_format fmt);
to_chars_result to_chars(char* first, char* last, double value, chars_format fmt);
to_chars_result to_chars(char* first, char* last, long double value, chars_format fmt);
Requires Expects : fmt has the value of one of the enumerators of chars_format.

Effects: value is converted to a string in the style of printf in the "C" locale.

Throws: Nothing.

[ Note: The implementation provides overloads for all floating-point types as the type of the parameter value. - end note ]
to_chars_result to_chars(char* first, char* last, floatfloating-point value,
                         chars_format fmt, int precision);
to_chars_result to_chars(char* first, char* last, double value,
                         chars_format fmt, int precision);
to_chars_result to_chars(char* first, char* last, long double value,
                         chars_format fmt, int precision);
Requires Expects : fmt has the value of one of the enumerators of chars_format.

Effects: value is converted to a string in the style of printf in the "C" locale with the given precision.

Throws: Nothing.

[ Note: The implementation provides overloads for all floating-point types as the type of the parameter value. - end note ]

See also: ISO C 7.21.6.1

Modify 20.19.3 "Primitive numeric input conversion" [charconv.from.chars] as follows:

All functions named from_chars analyze the string [first, last) for a pattern, where [first, last) is required to be a valid range. If no characters match the pattern, value is unmodified, the member ptr of the return value is first and the member ec is equal to errc::invalid_argument. [ Note: If the pattern allows for an optional sign, but the string has no digit characters following the sign, no characters match the pattern. — end note ] Otherwise, the characters matching the pattern are interpreted as a representation of a value of the type of value. The member ptr of the return value points to the first character not matching the pattern, or has the value last if all characters match. If the parsed value is not in the range representable by the type of value, value is unmodified and the member ec of the return value is equal to errc::result_out_of_range. Otherwise, value is set to the parsed value, after rounding according to round_to_nearest, and the member ec is value-initialized.
from_chars_result from_chars(const char* first, const char* last,
                             see belowintegral& value, int base = 10);
Requires Expects : base has a value between 2 and 36 (inclusive).
Effects: The pattern is the expected form of the subject sequence in the "C" locale for the given nonzero base, as described for strtol, except that no "0x" or "0X" prefix shall appear if the value of base is 16, and except that '-' is the only sign that may appear, and only if value has a signed type.
Throws: Nothing.
Remarks: [ Note: The implementation shall provide provides overloads for all signed and unsigned integer types and char as the referenced type of the parameter value. - end note ]
from_chars_result from_chars(const char* first, const char* last, floatfloating-point& value,
                             chars_format fmt = chars_format::general);
from_chars_result from_chars(const char* first, const char* last, double& value,
                             chars_format fmt = chars_format::general);
from_chars_result from_chars(const char* first, const char* last, long double& value,
                             chars_format fmt = chars_format::general);
Requires Expects : fmt has the value of one of the enumerators of chars_format.
Effects: The pattern is the expected form of the subject sequence in the "C" locale, as described for strtod, except that
  • the sign '+' may only appear in the exponent part;

  • if fmt has chars_format::scientific set but not chars_format::fixed, the otherwise optional exponent part shall appear;

  • if fmt has chars_format::fixed set but not chars_format::scientific, the optional exponent part shall not appear; and

  • if fmt is chars_format::hex, the prefix "0x" or "0X" is assumed. [ Example: The string 0x123 is parsed to have the value 0 with remaining characters x123. - end example ]

In any case, the resulting value is one of at most two floating-point values closest to the value of the string matching the pattern.

Throws: Nothing.
[ Note: The implementation provides overloads for all floating-point types as the referenced type of the parameter value. - end note ]

See also: ISO C 7.22.1.3, 7.22.1.4

6.3. <format>

Change std::format to support extended floating-point types.

6.3.1. Wording

... to be determined ...

6.4. <cmath>

Add overloads for extended floating-point types to the functions in <cmath>. It is expected that this will be the most used part of the library changes.

6.4.1. Wording

Modify 26.8.1 "Header <cmath> synopsis" [cmath.syn] paragraph 2 as follows:

For each set of overloaded functions within <cmath>, with the exception of abs, there shall be additional overloads sufficient to ensure:

[ Note: abs is exempted from these rules in order to stay compatible with C. -- end note ]

Modify section 26.8.2 "Absolute values" [c.math.abs] as follows:

[ Note: The headers <cstdlib> and <cmath> declare the functions described in this subclause. — end note ]
int abs(int j);
long int abs(long int j);
long long int abs(long long int j);
float abs(float j);
double abs(double j);
long double abs(long double j);
Effects: The abs functions that take integer arguments have the semantics specified in the C standard library for the functions abs, labs, and llabs , fabsf, fabs, and fabsl .
Remarks: If abs() is called with an argument of type X for which is_unsigned_v<X> is true and if X cannot be converted to int by integral promotion, the program is ill-formed. [ Note: Arguments that can be promoted to int are permitted for compatibility with C. — end note ]
floating-point abs(floating-point x);
Returns: The absolute value of x.
Remarks: The implementation provides overloads for all floating-point types as the type of parameter x, with the same floating-point type as the return type.

See also: ISO C 7.12.7.2, 7.22.6.1

6.5. <complex>

Make std::complex<T> be well-defined when T is an extended floating-point type. The explicit specializations of std::complex<T> are removed. The only differences between the explicit specializations was the explicit-ness of the constructors that take a complex number of a different type. This behavior is incorporated into the main template through explicit(bool).

6.5.1. Wording

Modify 26.4 "Complex numbers" [complex.numbers] paragraph 2 as follows:

The effect of instantiating the template complex for any type other than float, double, or long double that is not a floating-point type is unspecified. The specializations complex<float>, complex<double>, and complex<long double> of complex for floating-point types are literal types ([basic.types]).

Delete the explicit specializations from 26.4.1 "Header <complex> synopsis" [complex.syn]:

namespace std {
  // 26.4.2, class template complex
  template class complex;
  
  // 26.4.3, specializations
  template<> class complex;
  template<> class complex;
  template<> class complex;
  
  // ...

In 26.4.2 "Class template complex" [complex], modify the synopsis of the constructors as follows:

constexpr complex(const T& re = T(), const T& im = T());
constexpr complex(const complex&) = default;
template<class X> constexpr explicit(see below) complex(const complex<X>&);

Remove section 26.4.3 "Specializations" [complex.special] in its entirety.

In 26.4.4 "Member functions" [complex.members], add the following after paragraph 2:

template<class X> constexpr explicit(see below) complex(const complex<X>& other);

Ensures: real() == other.real() && imag() == other.imag().

Remarks: The expression inside explicit evaluates to false if and only if the floating-point conversion rank of T is greater than the floating-point conversion rank of X.

In 26.4.6 "Non-member operations" [complex.ops], change the streaming operators as follows:

template<class T, class CharT, class traits>
  basic_istream<charT, traits>& operator>>(basic_istream<charT, traits>& is, complex<T>& x);
Constraints: T is a standard floating-point type.

Requires Expects : The input values shall be are convertible to T.

Effects: Extracts a complex number x of the form: u, (u), or (u,v), where u is the real part and v is the imaginary part (29.7.4.2).

If bad input is encountered, calls is.setstate(ios_base::failbit) (which may throw ios::failure (29.5.5.4)).

Returns: is.

Remarks: This extraction is performed as a series of simpler extractions. Therefore, the skipping of whitespace is specified to be the same for each of the simpler extractions.

template<class T, class charT, class traits>
  basic_ostream<charT, traits>& operator<<(basic_ostream<charT, traits>& o, const complex<T>& x);
Constraints: T is a standard floating-point type.

Effects: Inserts the complex number x ...

Modify 26.4.9 "Additional overloads" [cmplx.over] paragraphs 2 and 3 as follows:

The additional overloads shall be sufficient to ensure:

Function template pow shall have additional overloads sufficient to ensure, for a call with at least one argument of type complex<T>:

Note: No literal suffixes are defined for complex numbers of extended floating-point types. Subclause [complex.literals] is unchanged.

6.6. <atomic>

Change the wording so that the specializations of std::atomic for floating-point types apply to all floating-point types, not just the standard floating-point types listed.

The specializations of std::atomic for integral types are not required to include specializations for all extended integral types, only for the extended types that are used in <cstdint>. It would be reasonable for this proposal to adopt a similar approach. If we take that approach, there are no wording changes to <atomic> in this paper. Instead, there would be some changes to <atomic> as part of [P1468], requiring specializations only for the floating-point aliases that name extended floating-point types.

Should std::atomic have specializations for all floating-point types, or only for extended floating-point types with well-known aliases (see [P1468])?

6.6.1. Wording

Modify 31.8.3 "Specializations for floating-point types" [atomics.types.float] paragraph 1 as follows:

There are specializations of the atomic class template for the all floating-point types float, double, and long double . For each such type floating-point, the specialization atomic<floating-point> provides additional atomic operations appropriate to floating-point types.

6.7. Feature test macro

No feature test macro is being proposed for the library changes in this paper. The library changes would be covered by the core language feature test macro, if there is one.

References

Informative References

[P0192]
Michał Dominiak; et al. `short float` and fixed-size floating point types. URL: https://wg21.link/P0192
[P1468]
Michał Dominiak; Boris Fomitchev; Sergei Nikolaev. Fixed-layout floating-point type aliasess. URL: https://wg21.link/P1468

Issues Index

Should implicit conversions be allowed from larger floating-point types to smaller floating-point types?
Should there be a feature test macro to indicate that the implementation supports at least one extended floating-point type?
Should the new type traits std::is_standard_floating_point and/or std::is_extended_floating_point be introduced?
Should a new type trait be introduced that can be used to query the floating-point conversion rank relationship?
Should std::atomic have specializations for all floating-point types, or only for extended floating-point types with well-known aliases (see [P1468])?