This library is divided into several interconnected parts:
Utility functions for dealing with floating-point arithmetic, includes functions for floating point classification (fpclassify, isnan, isinf etc), sign manipulation, rounding, comparison, and computing the distance between floating point numbers.
A set of typedefs similar to those provided by
but for floating-point types.
A wide range of constants ranging from various multiples of π, fractions, through to euler's constant etc.
These are of course usable from template code, or as non-templates with a simplified interface if that is more appropriate.
Provides a reasonably comprehensive set of statistical distributions, upon which higher level statistical tests can be built.
Provides a small number of high quality special functions, initially these were concentrated on functions used in statistical applications along with those in the Technical Report on C++ Library Extensions.
The function families currently implemented are the gamma, beta & erf functions along with the incomplete gamma and beta functions (four variants of each) and all the possible inverses of these, plus digamma, various factorial functions, Bessel functions, elliptic integrals, sinus cardinals (along with their hyperbolic variants), inverse hyperbolic functions, Legrendre/Laguerre/Hermite polynomials and various special power and logarithmic functions.
All the implementations are fully generic and support the use of arbitrary
"real-number" types, including Boost.Multiprecision,
although they are optimised for use with types with known-about significand
(or mantissa) sizes: typically
These functions also provide the basis of support for the TR1 special functions.
A comprehensive set of root finding algorithms over the real-line, both with and without derivative support.
Also function minimisation via Brent's Method.
Tools for manipulating polynomials and for efficient evaluation of rationals or polynomials.
Function interpolation via Barycentric or cubic B_spline approximations.
A reasonably comprehensive set of routines for integration (trapezoidal, Gauss-Legendre, Gauss-Kronrod and double-exponential) and differentiation.
The integration routines are all usable for functions returning complex results - and as a result for contour integrals as well.
Quaternion and Octonians as class templates similar to