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## Definitions

Introduction
Types and Values
C++ Arithmetic Types
Numeric Types
Range and Precision
Exact, Correctly Rounded and Out-Of-Range Representations
Standard (numeric) Conversions
Subranged Conversion Direction, Subtype and Supertype

### Introduction

This section provides definitions of terms used in the Numeric Conversion library.

Notation underlined text denotes terms defined in the C++ standard.

bold face denotes terms defined here but not in the standard.

### Types and Values

As defined by the C++ Object Model (§1.7) the storage or memory on which a C++ program runs is a contiguous sequence of bytes where each byte is a contiguous sequence of bits.

An object is a region of storage (§1.8) and has a type (§3.9).

A type is a discrete set of values.

An object of type T has an object representation which is the sequence of bytes stored in the object (§3.9/4)

An object of type T has a value representation which is the set of bits that determine the value of an object of that type (§3.9/4). For POD types (§3.9/10), this bitset is given by the object representation, but not all the bits in the storage need to participate in the value representation (except for character types): for example, some bits might be used for padding or there may be trap-bits.

The typed value that is held by an object is the value which is determined by its value representation.

An abstract value (untyped) is the conceptual information that is represented in a type (i.e. the number π).

The intrinsic value of an object is the binary value of the sequence of unsigned characters which form its object representation.

Abstract values can be represented in a given type.

To represent an abstract value V in a type T is to obtain a typed value v which corresponds to the abstract value V.

The operation is denoted using the rep() operator, as in: v=rep(V). v is the representation of V in the type T.

For example, the abstract value π can be represented in the type double as the double value M_PI and in the type int as the int value 3

Conversely, typed values can be abstracted.

To abstract a typed value v of type T is to obtain the abstract value V whose representation in T is v.

The operation is denoted using the abt() operator, as in: V=abt(v).

V is the abstraction of v of type T.

Abstraction is just an abstract operation (you can't do it); but it is defined nevertheless because it will be used to give the definitions in the rest of this document.

### C++ Arithmetic Types

The C++ language defines fundamental types (§3.9.1). The following subsets of the fundamental types are intended to represent numbers:

signed integer types (§3.9.1/2):

{signed char, signed short int, signed int, signed long int} Can be used to represent general integer numbers (both negative and positive).

unsigned integer types (§3.9.1/3):

{unsigned char, unsigned short int, unsigned int, unsigned long int} Can be used to represent positive integer numbers with modulo-arithmetic.

floating-point types (§3.9.1/8):

{float,double,long double} Can be used to represent real numbers.

integral or integer types (§3.9.1/7):

{{signed integers},{unsigned integers}, bool, char and wchar_t}

arithmetic types (§3.9.1/8):

{{integer types},{floating types}}

The integer types are required to have a binary value representation.

Additionally, the signed/unsigned integer types of the same base type (short, int or long) are required to have the same value representation, that is:

int i = -3 ; // suppose value representation is: 10011 (sign bit + 4 magnitude bits)
unsigned int u =  i ; // u is required to have the same 10011 as its value representation.

In other words, the integer types signed/unsigned X use the same value representation but a different interpretation of it; that is, their typed values might differ.

Another consequence of this is that the range for signed X is always a smaller subset of the range of unsigned X, as required by §3.9.1/3.

Note Always remember that unsigned types, unlike signed types, have modulo-arithmetic; that is, they do not overflow. This means that: - Always be extra careful when mixing signed/unsigned types - Use unsigned types only when you need modulo arithmetic or very very large numbers. Don't use unsigned types just because you intend to deal with positive values only (you can do this with signed types as well).

### Numeric Types

This section introduces the following definitions intended to integrate arithmetic types with user-defined types which behave like numbers. Some definitions are purposely broad in order to include a vast variety of user-defined number types.

Within this library, the term number refers to an abstract numeric value.

A type is numeric if:

• It is an arithmetic type, or,
• It is a user-defined type which
• Represents numeric abstract values (i.e. numbers).
• Can be converted (either implicitly or explicitly) to/from at least one arithmetic type.
• Has range (possibly unbounded) and precision (possibly dynamic or unlimited).
• Provides an specialization of std::numeric_limits.

A numeric type is signed if the abstract values it represent include negative numbers.

A numeric type is unsigned if the abstract values it represent exclude negative numbers.

A numeric type is modulo if it has modulo-arithmetic (does not overflow).

A numeric type is integer if the abstract values it represent are whole numbers.

A numeric type is floating if the abstract values it represent are real numbers.

An arithmetic value is the typed value of an arithmetic type

A numeric value is the typed value of a numeric type

These definitions simply generalize the standard notions of arithmetic types and values by introducing a superset called numeric. All arithmetic types and values are numeric types and values, but not vice versa, since user-defined numeric types are not arithmetic types.

The following examples clarify the differences between arithmetic and numeric types (and values):

// A numeric type which is not an arithmetic type (is user-defined)
// and which is intended to represent integer numbers (i.e., an 'integer' numeric type)
class MyInt
{
MyInt ( long long v ) ;
long long to_builtin();
} ;
namespace std {
template<> numeric_limits<MyInt> { ... } ;
}

// A 'floating' numeric type (double) which is also an arithmetic type (built-in),
// with a float numeric value.
double pi = M_PI ;

// A 'floating' numeric type with a whole numeric value.
// NOTE: numeric values are typed valued, hence, they are, for instance,
// integer or floating, despite the value itself being whole or including
// a fractional part.
double two = 2.0 ;

// An integer numeric type with an integer numeric value.
MyInt i(1234);

### Range and Precision

Given a number set N, some of its elements are representable in a numeric type T.

The set of representable values of type T, or numeric set of T, is a set of numeric values whose elements are the representation of some subset of N.

For example, the interval of int values [INT_MIN,INT_MAX] is the set of representable values of type int, i.e. the int numeric set, and corresponds to the representation of the elements of the interval of abstract values [abt(INT_MIN),abt(INT_MAX)] from the integer numbers.

Similarly, the interval of double values [-DBL_MAX,DBL_MAX] is the double numeric set, which corresponds to the subset of the real numbers from abt(-DBL_MAX) to abt(DBL_MAX).

Let next(x) denote the lowest numeric value greater than x.

Let prev(x) denote the highest numeric value lower then x.

Let v=prev(next(V)) and v=next(prev(V)) be identities that relate a numeric typed value v with a number V.

An ordered pair of numeric values x,y s.t. x<y are consecutive iff next(x)==y.

The abstract distance between consecutive numeric values is usually referred to as a Unit in the Last Place, or ulp for short. A ulp is a quantity whose abstract magnitude is relative to the numeric values it corresponds to: If the numeric set is not evenly distributed, that is, if the abstract distance between consecutive numeric values varies along the set -as is the case with the floating-point types-, the magnitude of 1ulp after the numeric value x might be (usually is) different from the magnitude of a 1ulp after the numeric value y for x!=y.

Since numbers are inherently ordered, a numeric set of type T is an ordered sequence of numeric values (of type T) of the form:

REP(T)={l,next(l),next(next(l)),...,prev(prev(h)),prev(h),h}

where l and h are respectively the lowest and highest values of type T, called the boundary values of type T.

A numeric set is discrete. It has a size which is the number of numeric values in the set, a width which is the abstract difference between the highest and lowest boundary values: [abt(h)-abt(l)], and a density which is the relation between its size and width: density=size/width.

The integer types have density 1, which means that there are no unrepresentable integer numbers between abt(l) and abt(h) (i.e. there are no gaps). On the other hand, floating types have density much smaller than 1, which means that there are real numbers unrepresented between consecutive floating values (i.e. there are gaps).

The interval of abstract values [abt(l),abt(h)] is the range of the type T, denoted R(T).

A range is a set of abstract values and not a set of numeric values. In other documents, such as the C++ standard, the word range is sometimes used as synonym for numeric set, that is, as the ordered sequence of numeric values from l to h. In this document, however, a range is an abstract interval which subtends the numeric set.

For example, the sequence [-DBL_MAX,DBL_MAX] is the numeric set of the type double, and the real interval [abt(-DBL_MAX),abt(DBL_MAX)] is its range.

Notice, for instance, that the range of a floating-point type is continuous unlike its numeric set.

This definition was chosen because:

• (a) The discrete set of numeric values is already given by the numeric set.
• (b) Abstract intervals are easier to compare and overlap since only boundary values need to be considered.

This definition allows for a concise definition of subranged as given in the last section.

The width of a numeric set, as defined, is exactly equivalent to the width of a range.

The precision of a type is given by the width or density of the numeric set.

For integer types, which have density 1, the precision is conceptually equivalent to the range and is determined by the number of bits used in the value representation: The higher the number of bits the bigger the size of the numeric set, the wider the range, and the higher the precision.

For floating types, which have density <<1, the precision is given not by the width of the range but by the density. In a typical implementation, the range is determined by the number of bits used in the exponent, and the precision by the number of bits used in the mantissa (giving the maximum number of significant digits that can be exactly represented). The higher the number of exponent bits the wider the range, while the higher the number of mantissa bits, the higher the precision.

### Exact, Correctly Rounded and Out-Of-Range Representations

Given an abstract value V and a type T with its corresponding range [abt(l),abt(h)]:

If V < abt(l) or V > abt(h), V is not representable (cannot be represented) in the type T, or, equivalently, it's representation in the type T is out of range, or overflows.

• If V < abt(l), the overflow is negative.
• If V > abt(h), the overflow is positive.

If V >= abt(l) and V <= abt(h), V is representable (can be represented) in the type T, or, equivalently, its representation in the type T is in range, or does not overflow.

Notice that a numeric type, such as a C++ unsigned type, can define that any V does not overflow by always representing not V itself but the abstract value U = [ V % (abt(h)+1) ], which is always in range.

Given an abstract value V represented in the type T as v, the roundoff error of the representation is the abstract difference: (abt(v)-V).

Notice that a representation is an operation, hence, the roundoff error corresponds to the representation operation and not to the numeric value itself (i.e. numeric values do not have any error themselves)

• If the roundoff is 0, the representation is exact, and V is exactly representable in the type T.
• If the roundoff is not 0, the representation is inexact, and V is inexactly representable in the type T.

If a representation v in a type T -either exact or inexact-, is any of the adjacents of V in that type, that is, if v==prev or v==next, the representation is faithfully rounded. If the choice between prev and next matches a given rounding direction, it is correctly rounded.

All exact representations are correctly rounded, but not all inexact representations are. In particular, C++ requires numeric conversions (described below) and the result of arithmetic operations (not covered by this document) to be correctly rounded, but batch operations propagate roundoff, thus final results are usually incorrectly rounded, that is, the numeric value r which is the computed result is neither of the adjacents of the abstract value R which is the theoretical result.

Because a correctly rounded representation is always one of adjacents of the abstract value being represented, the roundoff is guaranteed to be at most 1ulp.

The following examples summarize the given definitions. Consider:

• A numeric type Int representing integer numbers with a numeric set: {-2,-1,0,1,2} and range: [-2,2]
• A numeric type Cardinal representing integer numbers with a numeric set: {0,1,2,3,4,5,6,7,8,9} and range: [0,9] (no modulo-arithmetic here)
• A numeric type Real representing real numbers with a numeric set: {-2.0,-1.5,-1.0,-0.5,-0.0,+0.0,+0.5,+1.0,+1.5,+2.0} and range: [-2.0,+2.0]
• A numeric type Whole representing real numbers with a numeric set: {-2.0,-1.0,0.0,+1.0,+2.0} and range: [-2.0,+2.0]

First, notice that the types Real and Whole both represent real numbers, have the same range, but different precision.

• The integer number 1 (an abstract value) can be exactly represented in any of these types.
• The integer number -1 can be exactly represented in Int, Real and Whole, but cannot be represented in Cardinal, yielding negative overflow.
• The real number 1.5 can be exactly represented in Real, and inexactly represented in the other types.
• If 1.5 is represented as either 1 or 2 in any of the types (except Real), the representation is correctly rounded.
• If 0.5 is represented as +1.5 in the type Real, it is incorrectly rounded.
• (-2.0,-1.5) are the Real adjacents of any real number in the interval [-2.0,-1.5], yet there are no Real adjacents for x < -2.0, nor for x > +2.0.

### Standard (numeric) Conversions

The C++ language defines Standard Conversions (§4) some of which are conversions between arithmetic types.

These are Integral promotions (§4.5), Integral conversions (§4.7), Floating point promotions (§4.6), Floating point conversions (§4.8) and Floating-integral conversions (§4.9).

In the sequel, integral and floating point promotions are called arithmetic promotions, and these plus integral, floating-point and floating-integral conversions are called arithmetic conversions (i.e, promotions are conversions).

Promotions, both Integral and Floating point, are value-preserving, which means that the typed value is not changed with the conversion.

In the sequel, consider a source typed value s of type S, the source abstract value N=abt(s), a destination type T; and whenever possible, a result typed value t of type T.

Integer to integer conversions are always defined:

• If T is unsigned, the abstract value which is effectively represented is not N but M=[ N % ( abt(h) + 1 ) ], where h is the highest unsigned typed value of type T.
• If T is signed and N is not directly representable, the result t is implementation-defined, which means that the C++ implementation is required to produce a value t even if it is totally unrelated to s.

Floating to Floating conversions are defined only if N is representable; if it is not, the conversion has undefined behavior.

• If N is exactly representable, t is required to be the exact representation.
• If N is inexactly representable, t is required to be one of the two adjacents, with an implementation-defined choice of rounding direction; that is, the conversion is required to be correctly rounded.

Floating to Integer conversions represent not N but M=trunc(N), were trunc() is to truncate: i.e. to remove the fractional part, if any.

• If M is not representable in T, the conversion has undefined behavior (unless T is bool, see §4.12).

Integer to Floating conversions are always defined.

• If N is exactly representable, t is required to be the exact representation.
• If N is inexactly representable, t is required to be one of the two adjacents, with an implementation-defined choice of rounding direction; that is, the conversion is required to be correctly rounded.

### Subranged Conversion Direction, Subtype and Supertype

Given a source type S and a destination type T, there is a conversion direction denoted: S->T.

For any two ranges the following range relation can be defined: A range X can be entirely contained in a range Y, in which case it is said that X is enclosed by Y.

Formally: R(S) is enclosed by R(T) iif (R(S) intersection R(T)) == R(S).

If the source type range, R(S), is not enclosed in the target type range, R(T); that is, if (R(S) & R(T)) != R(S), the conversion direction is said to be subranged, which means that R(S) is not entirely contained in R(T) and therefore there is some portion of the source range which falls outside the target range. In other words, if a conversion direction S->T is subranged, there are values in S which cannot be represented in T because they are out of range. Notice that for S->T, the adjective subranged applies to T.

Examples:

Given the following numeric types all representing real numbers:

• X with numeric set {-2.0,-1.0,0.0,+1.0,+2.0} and range [-2.0,+2.0]
• Y with numeric set {-2.0,-1.5,-1.0,-0.5,0.0,+0.5,+1.0,+1.5,+2.0} and range [-2.0,+2.0]
• Z with numeric set {-1.0,0.0,+1.0} and range [-1.0,+1.0]

For:

(a) X->Y:

R(X) & R(Y) == R(X), then X->Y is not subranged. Thus, all values of type X are representable in the type Y.

(b) Y->X:

R(Y) & R(X) == R(Y), then Y->X is not subranged. Thus, all values of type Y are representable in the type X, but in this case, some values are inexactly representable (all the halves). (note: it is to permit this case that a range is an interval of abstract values and not an interval of typed values)

(b) X->Z:

R(X) & R(Z) != R(X), then X->Z is subranged. Thus, some values of type X are not representable in the type Z, they fall out of range (-2.0 and +2.0).

It is possible that R(S) is not enclosed by R(T), while neither is R(T) enclosed by R(S); for example, UNSIG=[0,255] is not enclosed by SIG=[-128,127]; neither is SIG enclosed by UNSIG. This implies that is possible that a conversion direction is subranged both ways. This occurs when a mixture of signed/unsigned types are involved and indicates that in both directions there are values which can fall out of range.

Given the range relation (subranged or not) of a conversion direction S->T, it is possible to classify S and T as supertype and subtype: If the conversion is subranged, which means that T cannot represent all possible values of type S, S is the supertype and T the subtype; otherwise, T is the supertype and S the subtype.

For example:

R(float)=[-FLT_MAX,FLT_MAX] and R(double)=[-DBL_MAX,DBL_MAX]

If FLT_MAX < DBL_MAX:

• double->float is subranged and supertype=double, subtype=float.
• float->double is not subranged and supertype=double, subtype=float.

Notice that while double->float is subranged, float->double is not, which yields the same supertype,subtype for both directions.

Now consider:

R(int)=[INT_MIN,INT_MAX] and R(unsigned int)=[0,UINT_MAX]

A C++ implementation is required to have UINT_MAX > INT_MAX (§3.9/3), so:

• 'int->unsigned' is subranged (negative values fall out of range) and supertype=int, subtype=unsigned.
• 'unsigned->int' is also subranged (high positive values fall out of range) and supertype=unsigned, subtype=int.

In this case, the conversion is subranged in both directions and the supertype,subtype pairs are not invariant (under inversion of direction). This indicates that none of the types can represent all the values of the other.

When the supertype is the same for both S->T and T->S, it is effectively indicating a type which can represent all the values of the subtype. Consequently, if a conversion X->Y is not subranged, but the opposite (Y->X) is, so that the supertype is always Y, it is said that the direction X->Y is correctly rounded value preserving, meaning that all such conversions are guaranteed to produce results in range and correctly rounded (even if inexact). For example, all integer to floating conversions are correctly rounded value preserving.