| //! Port of LLVM's APFloat software floating-point implementation from the |
| //! following C++ sources (please update commit hash when backporting): |
| //! <https://github.com/llvm-mirror/llvm/tree/23efab2bbd424ed13495a420ad8641cb2c6c28f9> |
| //! |
| //! * `include/llvm/ADT/APFloat.h` -> `Float` and `FloatConvert` traits |
| //! * `lib/Support/APFloat.cpp` -> `ieee` and `ppc` modules |
| //! * `unittests/ADT/APFloatTest.cpp` -> `tests` directory |
| //! |
| //! The port contains no unsafe code, global state, or side-effects in general, |
| //! and the only allocations are in the conversion to/from decimal strings. |
| //! |
| //! Most of the API and the testcases are intact in some form or another, |
| //! with some ergonomic changes, such as idiomatic short names, returning |
| //! new values instead of mutating the receiver, and having separate method |
| //! variants that take a non-default rounding mode (with the suffix `_r`). |
| //! Comments have been preserved where possible, only slightly adapted. |
| //! |
| //! Instead of keeping a pointer to a configuration struct and inspecting it |
| //! dynamically on every operation, types (e.g., `ieee::Double`), traits |
| //! (e.g., `ieee::Semantics`) and associated constants are employed for |
| //! increased type safety and performance. |
| //! |
| //! On-heap bigints are replaced everywhere (except in decimal conversion), |
| //! with short arrays of `type Limb = u128` elements (instead of `u64`), |
| //! This allows fitting the largest supported significands in one integer |
| //! (`ieee::Quad` and `ppc::Fallback` use slightly less than 128 bits). |
| //! All of the functions in the `ieee::sig` module operate on slices. |
| //! |
| //! # Note |
| //! |
| //! This API is completely unstable and subject to change. |
| |
| #![doc(html_root_url = "https://doc.rust-lang.org/nightly/")] |
| #![no_std] |
| #![forbid(unsafe_code)] |
| #![feature(nll)] |
| |
| #[macro_use] |
| extern crate alloc; |
| |
| use core::cmp::Ordering; |
| use core::fmt; |
| use core::ops::{Add, Div, Mul, Neg, Rem, Sub}; |
| use core::ops::{AddAssign, DivAssign, MulAssign, RemAssign, SubAssign}; |
| use core::str::FromStr; |
| |
| bitflags::bitflags! { |
| /// IEEE-754R 7: Default exception handling. |
| /// |
| /// UNDERFLOW or OVERFLOW are always returned or-ed with INEXACT. |
| #[must_use] |
| pub struct Status: u8 { |
| const OK = 0x00; |
| const INVALID_OP = 0x01; |
| const DIV_BY_ZERO = 0x02; |
| const OVERFLOW = 0x04; |
| const UNDERFLOW = 0x08; |
| const INEXACT = 0x10; |
| } |
| } |
| |
| #[must_use] |
| #[derive(Copy, Clone, PartialEq, Eq, PartialOrd, Ord, Debug)] |
| pub struct StatusAnd<T> { |
| pub status: Status, |
| pub value: T, |
| } |
| |
| impl Status { |
| pub fn and<T>(self, value: T) -> StatusAnd<T> { |
| StatusAnd { status: self, value } |
| } |
| } |
| |
| impl<T> StatusAnd<T> { |
| pub fn map<F: FnOnce(T) -> U, U>(self, f: F) -> StatusAnd<U> { |
| StatusAnd { status: self.status, value: f(self.value) } |
| } |
| } |
| |
| #[macro_export] |
| macro_rules! unpack { |
| ($status:ident|=, $e:expr) => { |
| match $e { |
| $crate::StatusAnd { status, value } => { |
| $status |= status; |
| value |
| } |
| } |
| }; |
| ($status:ident=, $e:expr) => { |
| match $e { |
| $crate::StatusAnd { status, value } => { |
| $status = status; |
| value |
| } |
| } |
| }; |
| } |
| |
| /// Category of internally-represented number. |
| #[derive(Copy, Clone, PartialEq, Eq, Debug)] |
| pub enum Category { |
| Infinity, |
| NaN, |
| Normal, |
| Zero, |
| } |
| |
| /// IEEE-754R 4.3: Rounding-direction attributes. |
| #[derive(Copy, Clone, PartialEq, Eq, Debug)] |
| pub enum Round { |
| NearestTiesToEven, |
| TowardPositive, |
| TowardNegative, |
| TowardZero, |
| NearestTiesToAway, |
| } |
| |
| impl Neg for Round { |
| type Output = Round; |
| fn neg(self) -> Round { |
| match self { |
| Round::TowardPositive => Round::TowardNegative, |
| Round::TowardNegative => Round::TowardPositive, |
| Round::NearestTiesToEven | Round::TowardZero | Round::NearestTiesToAway => self, |
| } |
| } |
| } |
| |
| /// A signed type to represent a floating point number's unbiased exponent. |
| pub type ExpInt = i16; |
| |
| // \c ilogb error results. |
| pub const IEK_INF: ExpInt = ExpInt::max_value(); |
| pub const IEK_NAN: ExpInt = ExpInt::min_value(); |
| pub const IEK_ZERO: ExpInt = ExpInt::min_value() + 1; |
| |
| #[derive(Copy, Clone, PartialEq, Eq, Debug)] |
| pub struct ParseError(pub &'static str); |
| |
| /// A self-contained host- and target-independent arbitrary-precision |
| /// floating-point software implementation. |
| /// |
| /// `apfloat` uses significand bignum integer arithmetic as provided by functions |
| /// in the `ieee::sig`. |
| /// |
| /// Written for clarity rather than speed, in particular with a view to use in |
| /// the front-end of a cross compiler so that target arithmetic can be correctly |
| /// performed on the host. Performance should nonetheless be reasonable, |
| /// particularly for its intended use. It may be useful as a base |
| /// implementation for a run-time library during development of a faster |
| /// target-specific one. |
| /// |
| /// All 5 rounding modes in the IEEE-754R draft are handled correctly for all |
| /// implemented operations. Currently implemented operations are add, subtract, |
| /// multiply, divide, fused-multiply-add, conversion-to-float, |
| /// conversion-to-integer and conversion-from-integer. New rounding modes |
| /// (e.g., away from zero) can be added with three or four lines of code. |
| /// |
| /// Four formats are built-in: IEEE single precision, double precision, |
| /// quadruple precision, and x87 80-bit extended double (when operating with |
| /// full extended precision). Adding a new format that obeys IEEE semantics |
| /// only requires adding two lines of code: a declaration and definition of the |
| /// format. |
| /// |
| /// All operations return the status of that operation as an exception bit-mask, |
| /// so multiple operations can be done consecutively with their results or-ed |
| /// together. The returned status can be useful for compiler diagnostics; e.g., |
| /// inexact, underflow and overflow can be easily diagnosed on constant folding, |
| /// and compiler optimizers can determine what exceptions would be raised by |
| /// folding operations and optimize, or perhaps not optimize, accordingly. |
| /// |
| /// At present, underflow tininess is detected after rounding; it should be |
| /// straight forward to add support for the before-rounding case too. |
| /// |
| /// The library reads hexadecimal floating point numbers as per C99, and |
| /// correctly rounds if necessary according to the specified rounding mode. |
| /// Syntax is required to have been validated by the caller. |
| /// |
| /// It also reads decimal floating point numbers and correctly rounds according |
| /// to the specified rounding mode. |
| /// |
| /// Non-zero finite numbers are represented internally as a sign bit, a 16-bit |
| /// signed exponent, and the significand as an array of integer limbs. After |
| /// normalization of a number of precision P the exponent is within the range of |
| /// the format, and if the number is not denormal the P-th bit of the |
| /// significand is set as an explicit integer bit. For denormals the most |
| /// significant bit is shifted right so that the exponent is maintained at the |
| /// format's minimum, so that the smallest denormal has just the least |
| /// significant bit of the significand set. The sign of zeros and infinities |
| /// is significant; the exponent and significand of such numbers is not stored, |
| /// but has a known implicit (deterministic) value: 0 for the significands, 0 |
| /// for zero exponent, all 1 bits for infinity exponent. For NaNs the sign and |
| /// significand are deterministic, although not really meaningful, and preserved |
| /// in non-conversion operations. The exponent is implicitly all 1 bits. |
| /// |
| /// `apfloat` does not provide any exception handling beyond default exception |
| /// handling. We represent Signaling NaNs via IEEE-754R 2008 6.2.1 should clause |
| /// by encoding Signaling NaNs with the first bit of its trailing significand |
| /// as 0. |
| /// |
| /// Future work |
| /// =========== |
| /// |
| /// Some features that may or may not be worth adding: |
| /// |
| /// Optional ability to detect underflow tininess before rounding. |
| /// |
| /// New formats: x87 in single and double precision mode (IEEE apart from |
| /// extended exponent range) (hard). |
| /// |
| /// New operations: sqrt, nexttoward. |
| /// |
| pub trait Float: |
| Copy |
| + Default |
| + FromStr<Err = ParseError> |
| + PartialOrd |
| + fmt::Display |
| + Neg<Output = Self> |
| + AddAssign |
| + SubAssign |
| + MulAssign |
| + DivAssign |
| + RemAssign |
| + Add<Output = StatusAnd<Self>> |
| + Sub<Output = StatusAnd<Self>> |
| + Mul<Output = StatusAnd<Self>> |
| + Div<Output = StatusAnd<Self>> |
| + Rem<Output = StatusAnd<Self>> |
| { |
| /// Total number of bits in the in-memory format. |
| const BITS: usize; |
| |
| /// Number of bits in the significand. This includes the integer bit. |
| const PRECISION: usize; |
| |
| /// The largest E such that 2<sup>E</sup> is representable; this matches the |
| /// definition of IEEE 754. |
| const MAX_EXP: ExpInt; |
| |
| /// The smallest E such that 2<sup>E</sup> is a normalized number; this |
| /// matches the definition of IEEE 754. |
| const MIN_EXP: ExpInt; |
| |
| /// Positive Zero. |
| const ZERO: Self; |
| |
| /// Positive Infinity. |
| const INFINITY: Self; |
| |
| /// NaN (Not a Number). |
| // FIXME(eddyb) provide a default when qnan becomes const fn. |
| const NAN: Self; |
| |
| /// Factory for QNaN values. |
| // FIXME(eddyb) should be const fn. |
| fn qnan(payload: Option<u128>) -> Self; |
| |
| /// Factory for SNaN values. |
| // FIXME(eddyb) should be const fn. |
| fn snan(payload: Option<u128>) -> Self; |
| |
| /// Largest finite number. |
| // FIXME(eddyb) should be const (but FloatPair::largest is nontrivial). |
| fn largest() -> Self; |
| |
| /// Smallest (by magnitude) finite number. |
| /// Might be denormalized, which implies a relative loss of precision. |
| const SMALLEST: Self; |
| |
| /// Smallest (by magnitude) normalized finite number. |
| // FIXME(eddyb) should be const (but FloatPair::smallest_normalized is nontrivial). |
| fn smallest_normalized() -> Self; |
| |
| // Arithmetic |
| |
| fn add_r(self, rhs: Self, round: Round) -> StatusAnd<Self>; |
| fn sub_r(self, rhs: Self, round: Round) -> StatusAnd<Self> { |
| self.add_r(-rhs, round) |
| } |
| fn mul_r(self, rhs: Self, round: Round) -> StatusAnd<Self>; |
| fn mul_add_r(self, multiplicand: Self, addend: Self, round: Round) -> StatusAnd<Self>; |
| fn mul_add(self, multiplicand: Self, addend: Self) -> StatusAnd<Self> { |
| self.mul_add_r(multiplicand, addend, Round::NearestTiesToEven) |
| } |
| fn div_r(self, rhs: Self, round: Round) -> StatusAnd<Self>; |
| /// IEEE remainder. |
| // This is not currently correct in all cases. |
| fn ieee_rem(self, rhs: Self) -> StatusAnd<Self> { |
| let mut v = self; |
| |
| let status; |
| v = unpack!(status=, v / rhs); |
| if status == Status::DIV_BY_ZERO { |
| return status.and(self); |
| } |
| |
| assert!(Self::PRECISION < 128); |
| |
| let status; |
| let x = unpack!(status=, v.to_i128_r(128, Round::NearestTiesToEven, &mut false)); |
| if status == Status::INVALID_OP { |
| return status.and(self); |
| } |
| |
| let status; |
| let mut v = unpack!(status=, Self::from_i128(x)); |
| assert_eq!(status, Status::OK); // should always work |
| |
| let status; |
| v = unpack!(status=, v * rhs); |
| assert_eq!(status - Status::INEXACT, Status::OK); // should not overflow or underflow |
| |
| let status; |
| v = unpack!(status=, self - v); |
| assert_eq!(status - Status::INEXACT, Status::OK); // likewise |
| |
| if v.is_zero() { |
| status.and(v.copy_sign(self)) // IEEE754 requires this |
| } else { |
| status.and(v) |
| } |
| } |
| /// C fmod, or llvm frem. |
| fn c_fmod(self, rhs: Self) -> StatusAnd<Self>; |
| fn round_to_integral(self, round: Round) -> StatusAnd<Self>; |
| |
| /// IEEE-754R 2008 5.3.1: nextUp. |
| fn next_up(self) -> StatusAnd<Self>; |
| |
| /// IEEE-754R 2008 5.3.1: nextDown. |
| /// |
| /// *NOTE* since nextDown(x) = -nextUp(-x), we only implement nextUp with |
| /// appropriate sign switching before/after the computation. |
| fn next_down(self) -> StatusAnd<Self> { |
| (-self).next_up().map(|r| -r) |
| } |
| |
| fn abs(self) -> Self { |
| if self.is_negative() { -self } else { self } |
| } |
| fn copy_sign(self, rhs: Self) -> Self { |
| if self.is_negative() != rhs.is_negative() { -self } else { self } |
| } |
| |
| // Conversions |
| fn from_bits(input: u128) -> Self; |
| fn from_i128_r(input: i128, round: Round) -> StatusAnd<Self> { |
| if input < 0 { |
| Self::from_u128_r(input.wrapping_neg() as u128, -round).map(|r| -r) |
| } else { |
| Self::from_u128_r(input as u128, round) |
| } |
| } |
| fn from_i128(input: i128) -> StatusAnd<Self> { |
| Self::from_i128_r(input, Round::NearestTiesToEven) |
| } |
| fn from_u128_r(input: u128, round: Round) -> StatusAnd<Self>; |
| fn from_u128(input: u128) -> StatusAnd<Self> { |
| Self::from_u128_r(input, Round::NearestTiesToEven) |
| } |
| fn from_str_r(s: &str, round: Round) -> Result<StatusAnd<Self>, ParseError>; |
| fn to_bits(self) -> u128; |
| |
| /// Converts a floating point number to an integer according to the |
| /// rounding mode. In case of an invalid operation exception, |
| /// deterministic values are returned, namely zero for NaNs and the |
| /// minimal or maximal value respectively for underflow or overflow. |
| /// If the rounded value is in range but the floating point number is |
| /// not the exact integer, the C standard doesn't require an inexact |
| /// exception to be raised. IEEE-854 does require it so we do that. |
| /// |
| /// Note that for conversions to integer type the C standard requires |
| /// round-to-zero to always be used. |
| /// |
| /// The *is_exact output tells whether the result is exact, in the sense |
| /// that converting it back to the original floating point type produces |
| /// the original value. This is almost equivalent to `result == Status::OK`, |
| /// except for negative zeroes. |
| fn to_i128_r(self, width: usize, round: Round, is_exact: &mut bool) -> StatusAnd<i128> { |
| let status; |
| if self.is_negative() { |
| if self.is_zero() { |
| // Negative zero can't be represented as an int. |
| *is_exact = false; |
| } |
| let r = unpack!(status=, (-self).to_u128_r(width, -round, is_exact)); |
| |
| // Check for values that don't fit in the signed integer. |
| if r > (1 << (width - 1)) { |
| // Return the most negative integer for the given width. |
| *is_exact = false; |
| Status::INVALID_OP.and(-1 << (width - 1)) |
| } else { |
| status.and(r.wrapping_neg() as i128) |
| } |
| } else { |
| // Positive case is simpler, can pretend it's a smaller unsigned |
| // integer, and `to_u128` will take care of all the edge cases. |
| self.to_u128_r(width - 1, round, is_exact).map(|r| r as i128) |
| } |
| } |
| fn to_i128(self, width: usize) -> StatusAnd<i128> { |
| self.to_i128_r(width, Round::TowardZero, &mut true) |
| } |
| fn to_u128_r(self, width: usize, round: Round, is_exact: &mut bool) -> StatusAnd<u128>; |
| fn to_u128(self, width: usize) -> StatusAnd<u128> { |
| self.to_u128_r(width, Round::TowardZero, &mut true) |
| } |
| |
| fn cmp_abs_normal(self, rhs: Self) -> Ordering; |
| |
| /// Bitwise comparison for equality (QNaNs compare equal, 0!=-0). |
| fn bitwise_eq(self, rhs: Self) -> bool; |
| |
| // IEEE-754R 5.7.2 General operations. |
| |
| /// Implements IEEE minNum semantics. Returns the smaller of the 2 arguments if |
| /// both are not NaN. If either argument is a NaN, returns the other argument. |
| fn min(self, other: Self) -> Self { |
| if self.is_nan() { |
| other |
| } else if other.is_nan() { |
| self |
| } else if other.partial_cmp(&self) == Some(Ordering::Less) { |
| other |
| } else { |
| self |
| } |
| } |
| |
| /// Implements IEEE maxNum semantics. Returns the larger of the 2 arguments if |
| /// both are not NaN. If either argument is a NaN, returns the other argument. |
| fn max(self, other: Self) -> Self { |
| if self.is_nan() { |
| other |
| } else if other.is_nan() { |
| self |
| } else if self.partial_cmp(&other) == Some(Ordering::Less) { |
| other |
| } else { |
| self |
| } |
| } |
| |
| /// IEEE-754R isSignMinus: Returns whether the current value is |
| /// negative. |
| /// |
| /// This applies to zeros and NaNs as well. |
| fn is_negative(self) -> bool; |
| |
| /// IEEE-754R isNormal: Returns whether the current value is normal. |
| /// |
| /// This implies that the current value of the float is not zero, subnormal, |
| /// infinite, or NaN following the definition of normality from IEEE-754R. |
| fn is_normal(self) -> bool { |
| !self.is_denormal() && self.is_finite_non_zero() |
| } |
| |
| /// Returns `true` if the current value is zero, subnormal, or |
| /// normal. |
| /// |
| /// This means that the value is not infinite or NaN. |
| fn is_finite(self) -> bool { |
| !self.is_nan() && !self.is_infinite() |
| } |
| |
| /// Returns `true` if the float is plus or minus zero. |
| fn is_zero(self) -> bool { |
| self.category() == Category::Zero |
| } |
| |
| /// IEEE-754R isSubnormal(): Returns whether the float is a |
| /// denormal. |
| fn is_denormal(self) -> bool; |
| |
| /// IEEE-754R isInfinite(): Returns whether the float is infinity. |
| fn is_infinite(self) -> bool { |
| self.category() == Category::Infinity |
| } |
| |
| /// Returns `true` if the float is a quiet or signaling NaN. |
| fn is_nan(self) -> bool { |
| self.category() == Category::NaN |
| } |
| |
| /// Returns `true` if the float is a signaling NaN. |
| fn is_signaling(self) -> bool; |
| |
| // Simple Queries |
| |
| fn category(self) -> Category; |
| fn is_non_zero(self) -> bool { |
| !self.is_zero() |
| } |
| fn is_finite_non_zero(self) -> bool { |
| self.is_finite() && !self.is_zero() |
| } |
| fn is_pos_zero(self) -> bool { |
| self.is_zero() && !self.is_negative() |
| } |
| fn is_neg_zero(self) -> bool { |
| self.is_zero() && self.is_negative() |
| } |
| |
| /// Returns `true` if the number has the smallest possible non-zero |
| /// magnitude in the current semantics. |
| fn is_smallest(self) -> bool { |
| Self::SMALLEST.copy_sign(self).bitwise_eq(self) |
| } |
| |
| /// Returns `true` if the number has the largest possible finite |
| /// magnitude in the current semantics. |
| fn is_largest(self) -> bool { |
| Self::largest().copy_sign(self).bitwise_eq(self) |
| } |
| |
| /// Returns `true` if the number is an exact integer. |
| fn is_integer(self) -> bool { |
| // This could be made more efficient; I'm going for obviously correct. |
| if !self.is_finite() { |
| return false; |
| } |
| self.round_to_integral(Round::TowardZero).value.bitwise_eq(self) |
| } |
| |
| /// If this value has an exact multiplicative inverse, return it. |
| fn get_exact_inverse(self) -> Option<Self>; |
| |
| /// Returns the exponent of the internal representation of the Float. |
| /// |
| /// Because the radix of Float is 2, this is equivalent to floor(log2(x)). |
| /// For special Float values, this returns special error codes: |
| /// |
| /// NaN -> \c IEK_NAN |
| /// 0 -> \c IEK_ZERO |
| /// Inf -> \c IEK_INF |
| /// |
| fn ilogb(self) -> ExpInt; |
| |
| /// Returns: self * 2<sup>exp</sup> for integral exponents. |
| /// Equivalent to C standard library function `ldexp`. |
| fn scalbn_r(self, exp: ExpInt, round: Round) -> Self; |
| fn scalbn(self, exp: ExpInt) -> Self { |
| self.scalbn_r(exp, Round::NearestTiesToEven) |
| } |
| |
| /// Equivalent to C standard library function with the same name. |
| /// |
| /// While the C standard says exp is an unspecified value for infinity and nan, |
| /// this returns INT_MAX for infinities, and INT_MIN for NaNs (see `ilogb`). |
| fn frexp_r(self, exp: &mut ExpInt, round: Round) -> Self; |
| fn frexp(self, exp: &mut ExpInt) -> Self { |
| self.frexp_r(exp, Round::NearestTiesToEven) |
| } |
| } |
| |
| pub trait FloatConvert<T: Float>: Float { |
| /// Converts a value of one floating point type to another. |
| /// The return value corresponds to the IEEE754 exceptions. *loses_info |
| /// records whether the transformation lost information, i.e., whether |
| /// converting the result back to the original type will produce the |
| /// original value (this is almost the same as return `value == Status::OK`, |
| /// but there are edge cases where this is not so). |
| fn convert_r(self, round: Round, loses_info: &mut bool) -> StatusAnd<T>; |
| fn convert(self, loses_info: &mut bool) -> StatusAnd<T> { |
| self.convert_r(Round::NearestTiesToEven, loses_info) |
| } |
| } |
| |
| macro_rules! float_common_impls { |
| ($ty:ident<$t:tt>) => { |
| impl<$t> Default for $ty<$t> |
| where |
| Self: Float, |
| { |
| fn default() -> Self { |
| Self::ZERO |
| } |
| } |
| |
| impl<$t> ::core::str::FromStr for $ty<$t> |
| where |
| Self: Float, |
| { |
| type Err = ParseError; |
| fn from_str(s: &str) -> Result<Self, ParseError> { |
| Self::from_str_r(s, Round::NearestTiesToEven).map(|x| x.value) |
| } |
| } |
| |
| // Rounding ties to the nearest even, by default. |
| |
| impl<$t> ::core::ops::Add for $ty<$t> |
| where |
| Self: Float, |
| { |
| type Output = StatusAnd<Self>; |
| fn add(self, rhs: Self) -> StatusAnd<Self> { |
| self.add_r(rhs, Round::NearestTiesToEven) |
| } |
| } |
| |
| impl<$t> ::core::ops::Sub for $ty<$t> |
| where |
| Self: Float, |
| { |
| type Output = StatusAnd<Self>; |
| fn sub(self, rhs: Self) -> StatusAnd<Self> { |
| self.sub_r(rhs, Round::NearestTiesToEven) |
| } |
| } |
| |
| impl<$t> ::core::ops::Mul for $ty<$t> |
| where |
| Self: Float, |
| { |
| type Output = StatusAnd<Self>; |
| fn mul(self, rhs: Self) -> StatusAnd<Self> { |
| self.mul_r(rhs, Round::NearestTiesToEven) |
| } |
| } |
| |
| impl<$t> ::core::ops::Div for $ty<$t> |
| where |
| Self: Float, |
| { |
| type Output = StatusAnd<Self>; |
| fn div(self, rhs: Self) -> StatusAnd<Self> { |
| self.div_r(rhs, Round::NearestTiesToEven) |
| } |
| } |
| |
| impl<$t> ::core::ops::Rem for $ty<$t> |
| where |
| Self: Float, |
| { |
| type Output = StatusAnd<Self>; |
| fn rem(self, rhs: Self) -> StatusAnd<Self> { |
| self.c_fmod(rhs) |
| } |
| } |
| |
| impl<$t> ::core::ops::AddAssign for $ty<$t> |
| where |
| Self: Float, |
| { |
| fn add_assign(&mut self, rhs: Self) { |
| *self = (*self + rhs).value; |
| } |
| } |
| |
| impl<$t> ::core::ops::SubAssign for $ty<$t> |
| where |
| Self: Float, |
| { |
| fn sub_assign(&mut self, rhs: Self) { |
| *self = (*self - rhs).value; |
| } |
| } |
| |
| impl<$t> ::core::ops::MulAssign for $ty<$t> |
| where |
| Self: Float, |
| { |
| fn mul_assign(&mut self, rhs: Self) { |
| *self = (*self * rhs).value; |
| } |
| } |
| |
| impl<$t> ::core::ops::DivAssign for $ty<$t> |
| where |
| Self: Float, |
| { |
| fn div_assign(&mut self, rhs: Self) { |
| *self = (*self / rhs).value; |
| } |
| } |
| |
| impl<$t> ::core::ops::RemAssign for $ty<$t> |
| where |
| Self: Float, |
| { |
| fn rem_assign(&mut self, rhs: Self) { |
| *self = (*self % rhs).value; |
| } |
| } |
| }; |
| } |
| |
| pub mod ieee; |
| pub mod ppc; |
