Interval Arithmetic Library

Introduction and Overview

As implied by its name, this library is intended to help manipulating mathematical intervals. It consists of a single header <boost/numeric/interval.hpp> and principally a type which can be used as interval<T>. In fact, this interval template is declared as interval<T,Policies> where Policies is a policy class that controls the various behaviours of the interval class; interval<T> just happens to pick the default policies for the type T.

Warning! Guaranteed interval arithmetic for native floating-point format is not supported on every combination of processor, operating system, and compiler. This is a list of systems known to work correctly when using interval<float> and interval<double> with basic arithmetic operators.

• x86-like hardware is supported by the library with GCC, Visual C++ ≥ 7.1, Intel compiler (≥ 8 on Windows), CodeWarrior (≥ 9), as long as the traditional x87 floating-point unit is used for floating-point computations (no -mfpmath=sse2 support).
  • clang (though v9) does not have proper rounding support.
  • clang (10+) requires -frounding-math to be specified.
  • gcc requires -frounding-math to be specified.
  • msvc requires /fp:strict to be specified, which means MSVC 10.0 and earlier will not work properly.
• Sparc hardware is supported with GCC and Sun compiler.
• PowerPC hardware is supported with GCC and CodeWarrior, when floating-point computations are not done with the Altivec unit.
• Alpha hardware is supported with GCC, except maybe for the square root. The options -mfp-rounding-mode=d -mieee have to be used.

The previous list is not exhaustive. And even if a system does not provide guaranteed computations for hardware floating-point types, the interval library is still usable with user-defined types and for doing box arithmetic.

Interval Arithmetic

An interval is a pair of numbers which represents all the numbers between these two. (Intervals are considered closed so the bounds are included.) The purpose of this library is to extend the usual arithmetic functions to intervals. These intervals will be written [a,b] to represent all the numbers between a and b (included). a and b can be infinite (but they can not be the same infinite) and a ≤ b.

The fundamental property of interval arithmetic is the inclusion property:

``if f is a function on a set of numbers, f can be extended to a new function defined on intervals. This new function f takes one interval argument and returns an interval result such as: ∀ x ∈ [a,b], f(x) ∈ f([a,b]).''

Such a property is not limited to functions with only one argument. Whenever possible, the interval result should be the smallest one able to satisfy the property (it is not really useful if the new functions always answer [-∞,+∞]).

There are at least two reasons a user would like to use this library. The obvious one is when the user has to compute with intervals. One example is when input data have some builtin imprecision: instead of a number, an input variable can be passed as an interval. Another example application is to solve equations, by bisecting an interval until the interval width is small enough. A third example application is in computer graphics, where computations with boxes, segments or rays can be reduced to computations with points via intervals.

Another common reason to use interval arithmetic is when the computer doesn't produce exact results: by using intervals, it is possible to quantify the propagation of rounding errors. This approach is used often in numerical computation. For example, let's assume the computer stores numbers with ten decimal significant digits. To the question 1 + 1E-100 - 1, the computer will answer 0 although the correct answer would be 1E-100. With the help of interval arithmetic, the computer will answer [0,1E-9]. This is quite a huge interval for such a little result, but the precision is now known, without having to compute error propagation.

Numbers, rounding, and exceptional behavior

The base number type is the type that holds the bounds of the interval. In order to successfully use interval arithmetic, the base number type must present some characteristics. Firstly, due to the definition of an interval, the base numbers have to be totally ordered so, for instance, complex<T> is not usable as base number type for intervals. The mathematical functions for the base number type should also be compatible with the total order (for instance if x>y and z>t, then it should also hold that x+z > y+t), so modulo types are not usable either.

Secondly, the computations must be exact or provide some rounding methods (for instance, toward minus or plus infinity) if we want to guarantee the inclusion property. Note that we also may explicitely specify no rounding, for instance if the base number type is exact, i.e. the result of a mathematical operation is always computed and represented without loss of precision. If the number type is not exact, we may still explicitely specify no rounding, with the obvious consequence that the inclusion property is no longer guaranteed.

Finally, because heavy loss of precision is always possible, some numbers have to represent infinities or an exceptional behavior must be defined. The same situation also occurs for NaN (Not a Number).

Given all this, one may want to limit the template argument T of the class template interval to the floating point types float, double, and long double, as defined by the IEEE-754 Standard. Indeed, if the interval arithmetic is intended to replace the arithmetic provided by the floating point unit of a processor, these types are the best choice. Unlike std::complex, however, we don't want to limit T to these types. This is why we allow the rounding and exceptional behaviors to be given by the two policies (rounding and checking). We do nevertheless provide highly optimized rounding and checking class specializations for the above-mentioned floating point types.

Operations and functions

It is straightforward to define the elementary arithmetic operations on intervals, being guided by the inclusion property. For instance, if [a,b] and [c,d] are intervals, [a,b]+[c,d] can be computed by taking the smallest interval that contains all the numbers x+y for x in [a,b] and y in [c,d]; in this case, rounding a+c down and b+d up will suffice. Other operators and functions are similarly defined (see their definitions below).

Comparisons

It is also possible to define some comparison operators. Given two intervals, the result is a tri-state boolean type {false,true,indeterminate}. The answers false and true are easy to manipulate since they can directly be mapped on the boolean true and false. But it is not the case for the answer indeterminate since comparison operators are supposed to be boolean functions. So, what to do in order to obtain boolean answers?

One solution consists of deciding to adopt an exceptional behavior, such as a failed assertion or raising an exception. In this case, the exceptional behavior will be triggered when the result is indeterminate.

Another solution is to map indeterminate always to false, or always to true. If false is chosen, the comparison will be called "certain;" indeed, the result of [a,b] < [c,d] will be true if and only if: ∀ x ∈ [a,b] ∀ y ∈ [c,d], x < y. If true is chosen, the comparison will be called "possible;" indeed, the result of [a,b] < [c,d] will be true if and only if: ∃ x ∈ [a,b] ∃ y ∈ [c,d], x < y.

Since any of these solution has a clearly defined semantics, it is not clear that we should enforce either of them. For this reason, the default behavior consists to mimic the real comparisons by throwing an exception in the indeterminate case. Other behaviors can be selected bu using specific comparison namespace. There is also a bunch of explicitely named comparison functions. See comparisons pages for further details.

Overview of the library, and usage

This library provides two quite distinct levels of usage. One is to use the basic class template interval<T> without specifying the policy. This only requires one to know and understand the concepts developed above and the content of the namespace boost. In addition to the class interval<T>, this level of usage provides arithmetic operators (+, -, *, /), algebraic and piecewise-algebraic functions (abs, square, sqrt, pow), transcendental and trigonometric functions (exp, log, sin, cos, tan, asin, acos, atan, sinh, cosh, tanh, asinh, acosh, atanh), and the standard comparison operators (<, <=, >, >=, ==, !=), as well as several interval-specific functions (min, max, which have a different meaning than std::min and std::max; lower, upper, width, median, empty, singleton, equal, in, zero_in, subset, proper_subset, overlap, intersect, hull, bisect).

For some functions which take several parameters of type interval<T>, all combinations of argument types T and interval<T> which contain at least one interval<T>, are considered in order to avoid a conversion from the arguments of type T to a singleton of type interval<T>. This is done for efficiency reasons (the fact that an argument is a singleton sometimes renders some tests unnecessary).

A somewhat more advanced usage of this library is to hand-pick the policies Rounding and Checking and pass them to interval<T, Policies> through the use of Policies := boost::numeric::interval_lib::policies<Rounding,Checking>. Appropriate policies can be fabricated by using the various classes provided in the namespace boost::numeric::interval_lib as detailed in section Interval Support Library. It is also possible to choose the comparison scheme by overloading operators through namespaces.

Synopsis

namespace boost {
namespace numeric {

namespace interval_lib {

/* this declaration is necessary for the declaration of interval */
template <class T> struct default_policies;

/* ... ; the full synopsis of namespace interval_lib can be found here */

} // namespace interval_lib


/* template interval_policies; class definition can be found here */
template<class Rounding, class Checking>
struct interval_policies;

/* template class interval; class definition can be found here */
template<class T, class Policies = typename interval_lib::default_policies<T>::type > class interval;

/* arithmetic operators involving intervals */
template <class T, class Policies>  interval<T, Policies> operator+(const interval<T, Policies>& x);
template <class T, class Policies>  interval<T, Policies> operator-(const interval<T, Policies>& x);

template <class T, class Policies>  interval<T, Policies> operator+(const interval<T, Policies>& x, const interval<T, Policies>& y);
template <class T, class Policies>  interval<T, Policies> operator+(const interval<T, Policies>& x, const T& y);
template <class T, class Policies>  interval<T, Policies> operator+(const T& x, const interval<T, Policies>& y);

template <class T, class Policies>  interval<T, Policies> operator-(const interval<T, Policies>& x, const interval<T, Policies>& y);
template <class T, class Policies>  interval<T, Policies> operator-(const interval<T, Policies>& x, const T& y);
template <class T, class Policies>  interval<T, Policies> operator-(const T& x, const interval<T, Policies>& y);

template <class T, class Policies>  interval<T, Policies> operator*(const interval<T, Policies>& x, const interval<T, Policies>& y);
template <class T, class Policies>  interval<T, Policies> operator*(const interval<T, Policies>& x, const T& y);
template <class T, class Policies>  interval<T, Policies> operator*(const T& x, const interval<T, Policies>& y);

template <class T, class Policies>  interval<T, Policies> operator/(const interval<T, Policies>& x, const interval<T, Policies>& y);
template <class T, class Policies>  interval<T, Policies> operator/(const interval<T, Policies>& x, const T& y);
template <class T, class Policies>  interval<T, Policies> operator/(const T& r, const interval<T, Policies>& x);

/* algebraic functions: sqrt, abs, square, pow, nth_root */
template <class T, class Policies>  interval<T, Policies> abs(const interval<T, Policies>& x);
template <class T, class Policies>  interval<T, Policies> sqrt(const interval<T, Policies>& x);
template <class T, class Policies>  interval<T, Policies> square(const interval<T, Policies>& x);
template <class T, class Policies>  interval<T, Policies> pow(const interval<T, Policies>& x, int y);
template <class T, class Policies>  interval<T, Policies> nth_root(const interval<T, Policies>& x, int y);

/* transcendental functions: exp, log */
template <class T, class Policies>  interval<T, Policies> exp(const interval<T, Policies>& x);
template <class T, class Policies>  interval<T, Policies> log(const interval<T, Policies>& x);

/* fmod, for trigonometric function argument reduction (see below) */
template <class T, class Policies>  interval<T, Policies> fmod(const interval<T, Policies>& x, const interval<T, Policies>& y);
template <class T, class Policies>  interval<T, Policies> fmod(const interval<T, Policies>& x, const T& y);
template <class T, class Policies>  interval<T, Policies> fmod(const T& x, const interval<T, Policies>& y);

/* trigonometric functions */
template <class T, class Policies>  interval<T, Policies> sin(const interval<T, Policies>& x);
template <class T, class Policies>  interval<T, Policies> cos(const interval<T, Policies>& x);
template <class T, class Policies>  interval<T, Policies> tan(const interval<T, Policies>& x);
template <class T, class Policies>  interval<T, Policies> asin(const interval<T, Policies>& x);
template <class T, class Policies>  interval<T, Policies> acos(const interval<T, Policies>& x);
template <class T, class Policies>  interval<T, Policies> atan(const interval<T, Policies>& x);

/* hyperbolic trigonometric functions */
template <class T, class Policies>  interval<T, Policies> sinh(const interval<T, Policies>& x);
template <class T, class Policies>  interval<T, Policies> cosh(const interval<T, Policies>& x);
template <class T, class Policies>  interval<T, Policies> tanh(const interval<T, Policies>& x);
template <class T, class Policies>  interval<T, Policies> asinh(const interval<T, Policies>& x);
template <class T, class Policies>  interval<T, Policies> acosh(const interval<T, Policies>& x);
template <class T, class Policies>  interval<T, Policies> atanh(const interval<T, Policies>& x);

/* min, max external functions (NOT std::min/max, see below) */
template <class T, class Policies>  interval<T, Policies> max(const interval<T, Policies>& x, const interval<T, Policies>& y);
template <class T, class Policies>  interval<T, Policies> max(const interval<T, Policies>& x, const T& y);
template <class T, class Policies>  interval<T, Policies> max(const T& x, const interval<T, Policies>& y);
template <class T, class Policies>  interval<T, Policies> min(const interval<T, Policies>& x, const interval<T, Policies>& y);
template <class T, class Policies>  interval<T, Policies> min(const interval<T, Policies>& x, const T& y);
template <class T, class Policies>  interval<T, Policies> min(const T& x, const interval<T, Policies>& y);

/* bounds-related interval functions */
template <class T, class Policies>  T lower(const interval<T, Policies>& x);
template <class T, class Policies>  T upper(const interval<T, Policies>& x);
template <class T, class Policies>  T width(const interval<T, Policies>& x);
template <class T, class Policies>  T median(const interval<T, Policies>& x);
template <class T, class Policies>  T norm(const interval<T, Policies>& x);

/* bounds-related interval functions */
template <class T, class Policies>  bool empty(const interval<T, Policies>& b);
template <class T, class Policies>  bool singleton(const interval<T, Policies>& x);
template <class T, class Policies>  bool equal(const interval<T, Policies>& x, const interval<T, Policies>& y);
template <class T, class Policies>  bool in(const T& r, const interval<T, Policies>& b);
template <class T, class Policies>  bool zero_in(const interval<T, Policies>& b);
template <class T, class Policies>  bool subset(const interval<T, Policies>& a, const interval<T, Policies>& b);
template <class T, class Policies>  bool proper_subset(const interval<T, Policies>& a, const interval<T, Policies>& b);
template <class T, class Policies>  bool overlap(const interval<T, Policies>& x, const interval<T, Policies>& y);

/* set manipulation interval functions */
template <class T, class Policies>  interval<T, Policies> intersect(const interval<T, Policies>& x, const interval<T, Policies>& y);
template <class T, class Policies>  interval<T, Policies> hull(const interval<T, Policies>& x, const interval<T, Policies>& y);
template <class T, class Policies>  interval<T, Policies> hull(const interval<T, Policies>& x, const T& y);
template <class T, class Policies>  interval<T, Policies> hull(const T& x, const interval<T, Policies>& y);
template <class T, class Policies>  interval<T, Policies> hull(const T& x, const T& y);
template <class T, class Policies>  std::pair<interval<T, Policies>, interval<T, Policies> > bisect(const interval<T, Policies>& x);

/* interval comparison operators */
template<class T, class Policies>  bool operator<(const interval<T, Policies>& x, const interval<T, Policies>& y);
template<class T, class Policies>  bool operator<(const interval<T, Policies>& x, const T& y);
template<class T, class Policies>  bool operator<(const T& x, const interval<T, Policies>& y);

template<class T, class Policies>  bool operator<=(const interval<T, Policies>& x, const interval<T, Policies>& y);
template<class T, class Policies>  bool operator<=(const interval<T, Policies>& x, const T& y);
template<class T, class Policies>  bool operator<=(const T& x, const interval<T, Policies>& y);

template<class T, class Policies>  bool operator>(const interval<T, Policies>& x, const interval<T, Policies>& y);
template<class T, class Policies>  bool operator>(const interval<T, Policies>& x, const T& y);
template<class T, class Policies>  bool operator>(const T& x, const interval<T, Policies>& y);

template<class T, class Policies>  bool operator>=(const interval<T, Policies>& x, const interval<T, Policies>& y);
template<class T, class Policies>  bool operator>=(const interval<T, Policies>& x, const T& y);
template<class T, class Policies>  bool operator>=(const T& x, const interval<T, Policies>& y);

template<class T, class Policies>  bool operator==(const interval<T, Policies>& x, const interval<T, Policies>& y);
template<class T, class Policies>  bool operator==(const interval<T, Policies>& x, const T& y);
template<class T, class Policies>  bool operator==(const T& x, const interval<T, Policies>& y);

template<class T, class Policies>  bool operator!=(const interval<T, Policies>& x, const interval<T, Policies>& y);
template<class T, class Policies>  bool operator!=(const interval<T, Policies>& x, const T& y);
template<class T, class Policies>  bool operator!=(const T& x, const interval<T, Policies>& y);

namespace interval_lib {

template<class T, class Policies>  interval<T, Policies> division_part1(const interval<T, Policies>& x, const interval<T, Policies& y, bool& b);
template<class T, class Policies>  interval<T, Policies> division_part2(const interval<T, Policies>& x, const interval<T, Policies& y, bool b = true);
template<class T, class Policies>  interval<T, Policies> multiplicative_inverse(const interval<T, Policies>& x);

template<class I>  I add(const typename I::base_type& x, const typename I::base_type& y);
template<class I>  I sub(const typename I::base_type& x, const typename I::base_type& y);
template<class I>  I mul(const typename I::base_type& x, const typename I::base_type& y);
template<class I>  I div(const typename I::base_type& x, const typename I::base_type& y);

} // namespace interval_lib

} // namespace numeric
} // namespace boost

Template class interval

template <class T, class Policies = typename interval_lib::default_policies<T>::type>
class interval
{
  public:
  typedef T base_type;
  typedef Policies traits_type;

  interval();
  interval(T const &v);
  template<class T1> interval(T1 const &v);
  interval(T const &l, T const &u);
  template<class T1, class T2> interval(T1 const &l, T2 const &u);
  interval(interval<T, Policies> const &r);
  template<class Policies1> interval(interval<T, Policies1> const &r);
  template<class T1, class Policies1> interval(interval<T1, Policies1> const &r);

  interval &operator=(T const &v);
  template<class T1> interval &operator=(T1 const &v);
  interval &operator=(interval<T, Policies> const &r);
  template<class Policies1> interval &operator=(interval<T, Policies1> const &r);
  template<class T1, class Policies1> interval &operator=(interval<T1, Policies1> const &r);

  void assign(T const &l, T const &u);

  T const &lower() const;
  T const &upper() const;

  static interval empty();
  static interval whole();
  static interval hull(T const &x, T const &y);

  interval& operator+= (T const &r);
  interval& operator-= (T const &r);
  interval& operator*= (T const &r);
  interval& operator/= (T const &r);
  interval& operator+= (interval const &r);
  interval& operator-= (interval const &r);
  interval& operator*= (interval const &r);
  interval& operator/= (interval const &r);
};

The constructors create an interval enclosing their arguments. If there are two arguments, the first one is assumed to be the left bound and the second one is the right bound. Consequently, the arguments need to be ordered. If the property !(l <= u) is not respected, the checking policy will be used to create an empty interval. If no argument is given, the created interval is the singleton zero.

If the type of the arguments is the same as the base number type, the values are directly used for the bounds. If it is not the same type, the library will use the rounding policy in order to convert the arguments (conv_down and conv_up) and create an enclosing interval. When the argument is an interval with a different policy, the input interval is checked in order to correctly propagate its emptiness (if empty).

The assignment operators behave similarly, except they obviously take one argument only. There is also an assign function in order to directly change the bounds of an interval. It behaves like the two-arguments constructors if the bounds are not ordered. There is no assign function that directly takes an interval or only one number as a parameter; just use the assignment operators in such a case.

The type of the bounds and the policies of the interval type define the set of values the intervals contain. E.g. with the default policies, intervals are subsets of the set of real numbers. The static functions empty and whole produce the intervals/subsets that are respectively the empty subset and the whole set. They are static member functions rather than global functions because they cannot guess their return types. Likewise for hull. empty and whole involve the checking policy in order to get the bounds of the resulting intervals.

Operations and Functions

Some of the following functions expect min and max to be defined for the base type. Those are the only requirements for the interval class (but the policies can have other requirements).

Operators + - * / += -= *= /=

The basic operations are the unary minus and the binary + - * /. The unary minus takes an interval and returns an interval. The binary operations take two intervals, or one interval and a number, and return an interval. If an argument is a number instead of an interval, you can expect the result to be the same as if the number was first converted to an interval. This property will be true for all the following functions and operators.

There are also some assignment operators += -= *= /=. There is not much to say: x op= y is equivalent to x = x op y. If an exception is thrown during the computations, the l-value is not modified (but it may be corrupt if an exception is thrown by the base type during an assignment).

The operators / and /= will try to produce an empty interval if the denominator is exactly zero. If the denominator contains zero (but not only zero), the result will be the smallest interval containing the set of division results; so one of its bound will be infinite, but it may not be the whole interval.

lower upper median width norm

lower, upper, median respectively compute the lower bound, the upper bound, and the median number of an interval ((lower+upper)/2 rounded to nearest). width computes the width of an interval (upper-lower rounded toward plus infinity). norm computes an upper bound of the interval in absolute value; it is a mathematical norm (hence the name) similar to the absolute value for real numbers.

min max abs square pow nth_root division_part? multiplicative_inverse

The functions min, max and abs are also defined. Please do not mistake them for the functions defined in the standard library (aka a<b?a:b, a>b?a:b, a<0?-a:a). These functions are compatible with the elementary property of interval arithmetic. For example, max([a,b], [c,d]) = {max(x,y) such that x in [a,b] and y in [c,d]}. They are not defined in the std namespace but in the boost namespace in order to avoid conflict with the other definitions.

The square function is quite particular. As you can expect from its name, it computes the square of its argument. The reason this function is provided is: square(x) is not x*x but only a subset when x contains zero. For example, [-2,2]*[-2,2] = [-4,4] but [-2,2]² = [0,4]; the result is a smaller interval. Consequently, square(x) should be used instead of x*x because of its better accuracy and a small performance improvement.

As for square, pow provides an efficient and more accurate way to compute the integer power of an interval. Please note: when the power is 0 and the interval is not empty, the result is 1, even if the input interval contains 0. nth_root computes the integer root of an interval (nth_root(pow(x,k),k) encloses x or abs(x) depending on whether k is odd or even). The behavior of nth_root is not defined if the integer argument is not positive. multiplicative_inverse computes 1/x.

The functions division_part1 and division_part2 are useful when the user expects the division to return disjoint intervals if necessary. For example, the narrowest closed set containing [2,3] / [-2,1] is not ]-∞,∞[ but the union of ]-∞,-1] and [2,∞[. When the result of the division is representable by only one interval, division_part1 returns this interval and sets the boolean reference to false. However, if the result needs two intervals, division_part1 returns the negative part and sets the boolean reference to true; a call to division_part2 is now needed to get the positive part. This second function can take the boolean returned by the first function as last argument. If this bool is not given, its value is assumed to be true and the behavior of the function is then undetermined if the division does not produce a second interval.

intersect hull overlap in zero_in subset proper_subset empty singleton equal

intersect computes the set intersection of two closed sets, hull computes the smallest interval which contains the two parameters; those parameters can be numbers or intervals. If one of the arguments is an invalid number or an empty interval, the function will only use the other argument to compute the resulting interval (if allowed by the checking policy).

There is no union function since the union of two intervals is not an interval if they do not overlap. If they overlap, the hull function computes the union.

The function overlap tests if two intervals have some common subset. in tests if a number is in an interval; zero_in is a variant which tests if zero is in the interval. subset tests if the first interval is a subset of the second; and proper_subset tests if it is a proper subset. empty and singleton test if an interval is empty or is a singleton. Finally, equal tests if two intervals are equal.

sqrt log exp sin cos tan asin acos atan sinh cosh tanh asinh acosh atanh fmod

The functions sqrt, log, exp, sin, cos, tan, asin, acos, atan, sinh, cosh, tanh, asinh, acosh, atanh are also defined. There is not much to say; these functions extend the traditional functions to the intervals and respect the basic property of interval arithmetic. They use the checking policy to produce empty intervals when the input interval is strictly outside of the domain of the function.

The function fmod(interval x, interval y) expects the lower bound of y to be strictly positive and returns an interval z such as 0 <= z.lower() < y.upper() and such as z is a superset of x-n*y (with n being an integer). So, if the two arguments are positive singletons, this function fmod(interval, interval) will behave like the traditional function fmod(double, double).

Please note that fmod does not respect the inclusion property of arithmetic interval. For example, the result of fmod([13,17],[7,8]) should be [0,8] (since it must contain [0,3] and [5,8]). But this answer is not really useful when the purpose is to restrict an interval in order to compute a periodic function. It is the reason why fmod will answer [5,10].

add sub mul div

These four functions take two numbers and return the enclosing interval for the operations. It avoids converting a number to an interval before an operation, it can result in a better code with poor optimizers.

Constants

Some constants are hidden in the boost::numeric::interval_lib namespace. They need to be explicitely templated by the interval type. The functions are pi<I>(), pi_half<I>() and pi_twice<I>(), and they return an object of interval type I. Their respective values are π, π/2 and 2π.

Exception throwing

The interval class and all the functions defined around this class never throw any exceptions by themselves. However, it does not mean that an operation will never throw an exception. For example, let's consider the copy constructor. As explained before, it is the default copy constructor generated by the compiler. So it will not throw an exception if the copy constructor of the base type does not throw an exception.

The same situation applies to all the functions: exceptions will only be thrown if the base type or one of the two policies throws an exception.

Interval Support Library

The interval support library consists of a collection of classes that can be used and combined to fabricate almost various commonly-needed interval policies. In contrast to the basic classes and functions which are used in conjunction with interval<T> (and the default policies as the implicit second template parameter in this type), which belong simply to the namespace boost, these components belong to the namespace boost::numeric::interval_lib.

We merely give the synopsis here and defer each section to a separate web page since it is only intended for the advanced user. This allows to expand on each topic with examples, without unduly stretching the limits of this document.

Synopsis

namespace boost {
namespace numeric {
namespace interval_lib {

/* built-in rounding policy and its specializations */
template <class T>  struct rounded_math;
template <>         struct rounded_math<float>;
template <>         struct rounded_math<double>;
template <>         struct rounded_math<long double>;

/* built-in rounding construction blocks */
template <class T>  struct rounding_control;

template <class T, class Rounding = rounding_control<T> >  struct rounded_arith_exact;
template <class T, class Rounding = rounding_control<T> >  struct rounded_arith_std;
template <class T, class Rounding = rounding_control<T> >  struct rounded_arith_opp;

template <class T, class Rounding>  struct rounded_transc_dummy;
template <class T, class Rounding = rounded_arith_exact<T> >  struct rounded_transc_exact;
template <class T, class Rounding = rounded_arith_std  <T> >  struct rounded_transc_std;
template <class T, class Rounding = rounded_arith_opp  <T> >  struct rounded_transc_opp;

template <class Rounding> struct save_state;
template <class Rounding> struct save_state_nothing;

/* built-in checking policies */
template <class T> struct checking_base;
template <class T, class Checking = checking_base<T>, class Exception = exception_create_empty>   struct checking_no_empty;
template <class T, class Checking = checking_base<T> >                                            struct checking_no_nan;
template <class T, class Checking = checking_base<T>, class Exception = exception_invalid_number> struct checking_catch_nan;
template <class T> struct checking_strict;

/* some metaprogramming to manipulate interval policies */
template <class Rounding, class Checking> struct policies;
template <class OldInterval, class NewRounding> struct change_rounding;
template <class OldInterval, class NewChecking> struct change_checking;
template <class OldInterval> struct unprotect;

/* constants, need to be explicitly templated */
template<class I> I pi();
template<class I> I pi_half();
template<class I> I pi_twice();

/* interval explicit comparison functions:
 * the mode can be cer=certainly or pos=possibly,
 * the function lt=less_than, gt=greater_than, le=less_than_or_equal_to, ge=greater_than_or_equal_to
 *   eq=equal_to, ne= not_equal_to */
template <class T, class Policies>  bool cerlt(const interval<T, Policies>& x, const interval<T, Policies>& y);
template <class T, class Policies>  bool cerlt(const interval<T, Policies>& x, const T& y);
template <class T, class Policies>  bool cerlt(const T& x, const interval<T, Policies>& y);

template <class T, class Policies>  bool cerle(const interval<T, Policies>& x, const interval<T, Policies>& y);
template <class T, class Policies>  bool cerle(const interval<T, Policies>& x, const T& y);
template <class T, class Policies>  bool cerle(const T& x, const interval<T, Policies>& y);

template <class T, class Policies>  bool cergt(const interval<T, Policies>& x, const interval<T, Policies>& y);
template <class T, class Policies>  bool cergt(const interval<T, Policies>& x, const T& y);
template <class T, class Policies>  bool cergt(const T& x, const interval<T, Policies>& y);

template <class T, class Policies>  bool cerge(const interval<T, Policies>& x, const interval<T, Policies>& y);
template <class T, class Policies>  bool cerge(const interval<T, Policies>& x, const T& y);
template <class T, class Policies>  bool cerge(const T& x, const interval<T, Policies>& y);

template <class T, class Policies>  bool cereq(const interval<T, Policies>& x, const interval<T, Policies>& y);
template <class T, class Policies>  bool cereq(const interval<T, Policies>& x, const T& y);
template <class T, class Policies>  bool cereq(const T& x, const interval<T, Policies>& y);

template <class T, class Policies>  bool cerne(const interval<T, Policies>& x, const interval<T, Policies>& y);
template <class T, class Policies>  bool cerne(const interval<T, Policies>& x, const T& y);
template <class T, class Policies>  bool cerne(const T& x, const interval<T, Policies>& y);

template <class T, class Policies>  bool poslt(const interval<T, Policies>& x, const interval<T, Policies>& y);
template <class T, class Policies>  bool poslt(const interval<T, Policies>& x, const T& y);
template <class T, class Policies>  bool poslt(const T& x, const interval<T, Policies>& y);

template <class T, class Policies>  bool posle(const interval<T, Policies>& x, const interval<T, Policies>& y);
template <class T, class Policies>  bool posle(const interval<T, Policies>& x, const T& y);
template <class T, class Policies>  bool posle(const T& x, const interval<T, Policies>& y);

template <class T, class Policies>  bool posgt(const interval<T, Policies>& x, const interval<T, Policies>& y);
template <class T, class Policies>  bool posgt(const interval<T, Policies>& x, const T& y);
template <class T, class Policies>  bool posgt(const T& x, const interval<T, Policies> & y);

template <class T, class Policies>  bool posge(const interval<T, Policies>& x, const interval<T, Policies>& y);
template <class T, class Policies>  bool posge(const interval<T, Policies>& x, const T& y);
template <class T, class Policies>  bool posge(const T& x, const interval<T, Policies>& y);

template <class T, class Policies>  bool poseq(const interval<T, Policies>& x, const interval<T, Policies>& y);
template <class T, class Policies>  bool poseq(const interval<T, Policies>& x, const T& y);
template <class T, class Policies>  bool poseq(const T& x, const interval<T, Policies>& y);

template <class T, class Policies>  bool posne(const interval<T, Policies>& x, const interval<T, Policies>& y);
template <class T, class Policies>  bool posne(const interval<T, Policies>& x, const T& y);
template <class T, class Policies>  bool posne(const T& x, const interval<T, Policies>& y);

/* comparison namespaces */
namespace compare {
  namespace certain;
  namespace possible;
  namespace lexicographic;
  namespace set;
  namespace tribool;
} // namespace compare

} // namespace interval_lib
} // namespace numeric
} // namespace boost

Each component of the interval support library is detailed in its own page.

• Comparisons
• Rounding
• Checking

Common Pitfalls and Dangers

Comparisons

One of the biggest problems is probably the correct use of the comparison functions and operators. First, functions and operators do not try to know if two intervals are the same mathematical object. So, if the comparison used is "certain", then x != x is always true unless x is a singleton interval; and the same problem arises with cereq and cerne.

Another misleading interpretation of the comparison is: you cannot always expect [a,b] < [c,d] to be !([a,b] >= [c,d]) since the comparison is not necessarily total. Equality and less comparison should be seen as two distincts relational operators. However the default comparison operators do respect this property since they throw an exception whenever [a,b] and [c,d] overlap.

Interval values and references

This problem is a corollary of the previous problem with x != x. All the functions of the library only consider the value of an interval and not the reference of an interval. In particular, you should not expect (unless x is a singleton) the following values to be equal: x/x and 1, x*x and square(x), x-x and 0, etc. So the main cause of wide intervals is that interval arithmetic does not identify different occurrences of the same variable. So, whenever possible, the user has to rewrite the formulas to eliminate multiple occurences of the same variable. For example, square(x)-2*x is far less precise than square(x-1)-1.

Unprotected rounding

As explained in this section, a good way to speed up computations when the base type is a basic floating-point type is to unprotect the intervals at the hot spots of the algorithm. This method is safe and really an improvement for interval computations. But please remember that any basic floating-point operation executed inside the unprotection blocks will probably have an undefined behavior (but only for the current thread). And do not forget to create a rounding object as explained in the example.

Rationale

The purpose of this library is to provide an efficient and generalized way to deal with interval arithmetic through the use of a templatized class boost::numeric::interval. The big contention for which we provide a rationale is the format of this class template.

It would have been easier to provide a class interval whose base type is double. Or to follow std::complex and allow only specializations for float, double, and long double. We decided not to do this to allow intervals on custom types, e.g. fixed-precision bigfloat library types (MPFR, etc), rational numbers, and so on.

Policy design. Although it was tempting to make it a class template with only one template argument, the diversity of uses for an interval arithmetic practically forced us to use policies. The behavior of this class can be fixed by two policies. These policies are packaged into a single policy class, rather than making interval with three template parameters. This is both for ease of use (the policy class can be picked by default) and for readability.

The first policy provides all the mathematical functions on the base type needed to define the functions on the interval type. The second one sets the way exceptional cases encountered during computations are handled.

We could foresee situations where any combination of these policies would be appropriate. Moreover, we wanted to enable the user of the library to reuse the interval class template while at the same time choosing his own behavior. See this page for some examples.

Rounding policy. The library provides specialized implementations of the rounding policy for the primitive types float and double. In order for these implementations to be correct and fast, the library needs to work a lot with rounding modes. Some processors are directly dealt with and some mechanisms are provided in order to speed up the computations. It seems to be heavy and hazardous optimizations for a gain of only a few computer cycles; but in reality, the speed-up factor can easily go past 2 or 3 depending on the computer. Moreover, these optimizations do not impact the interface in any major way (with the design we have chosen, everything can be added by specialization or by passing different template parameters).

Pred/succ. In a previous version, two functions pred and succ, with various corollaries like widen, were supplied. The intent was to enlarge the interval by one ulp (as little as possible), e.g. to ensure the inclusion property. Since making interval a template of T, we could not define ulp for a random parameter. In turn, rounding policies let us eliminate entirely the use of ulp while making the intervals tighter (if a result is a representable singleton, there is no use to widen the interval). We decided to drop those functions.

Specialization of std::less. Since the operator < depends on the comparison namespace locally chosen by the user, it is not possible to correctly specialize std::less. So you have to explicitely provide such a class to all the algorithms and templates that could require it (for example, std::map).

Input/output. The interval library does not include I/O operators. Printing an interval value allows a lot of customization: some people may want to output the bounds, others may want to display the median and the width of intervals, and so on. The example file io.cpp shows some possibilities and may serve as a foundation in order for the user to define her own operators.

Mixed operations with integers. When using and reusing template codes, it is common there are operations like 2*x. However, the library does not provide them by default because the conversion from int to the base number type is not always correct (think about the conversion from a 32bit integer to a single precision floating-point number). So the functions have been put in a separate header and the user needs to include them explicitely if she wants to benefit from these mixed operators. Another point, there is no mixed comparison operators due to the technical way they are defined.

Interval-aware functions. All the functions defined by the library are obviously aware they manipulate intervals and they do it accordingly to general interval arithmetic principles. Consequently they may have a different behavior than the one commonly encountered with functions not interval-aware. For example, max is defined by canonical set extension and the result is not always one of the two arguments (if the intervals do not overlap, then the result is one of the two intervals).

This behavior is different from std::max which returns a reference on one of its arguments. So if the user expects a reference to be returned, she should use std::max since it is exactly what this function does. Please note that std::max will throw an exception when the intervals overlap. This behavior does not predate the one described by the C++ standard since the arguments are not "equivalent" and it allows to have an equivalence between a <= b and &b == &std::max(a,b)(some particular cases may be implementation-defined). However it is different from the one described by SGI since it does not return the first argument even if "neither is greater than the other".

History and Acknowledgments

This library was mostly inspired by previous work from Jens Maurer. Some discussions about his work are reproduced here. Jeremy Siek and Maarten Keijzer provided some rounding control for MSVC and Sparc platforms.

Guillaume Melquiond, Hervé Brönnimann and Sylvain Pion started from the library left by Jens and added the policy design. Guillaume and Sylvain worked hard on the code, especially the porting and mostly tuning of the rounding modes to the different architectures. Guillaume did most of the coding, while Sylvain and Hervé have provided some useful comments in order for this library to be written. Hervé reorganized and wrote chapters of the documentation based on Guillaume's great starting point.

This material is partly based upon work supported by the National Science Foundation under NSF CAREER Grant CCR-0133599. Any opinions, findings and conclusions or recommendations expressed in this material are those of the author(s) and do not necessarily reflect the views of the National Science Foundation (NSF).

Revised 2006-12-25

Copyright © 2002 Guillaume Melquiond, Sylvain Pion, Hervé Brönnimann, Polytechnic University
Copyright © 2003-2006 Guillaume Melquiond, ENS Lyon

Distributed under the Boost Software License, Version 1.0. (See accompanying file LICENSE_1_0.txt or copy at http://www.boost.org/LICENSE_1_0.txt)