Q
Function
Purpose Statement
Integrates a function on a hyper-rectangle.
Computes a sequence from its cosine Fourier coefficients with only odd wave numbers.
Computes the coefficients of the cosine Fourier transform with only odd wave numbers.
Computes parameters needed by QCOSF and QCOSB.
Evaluates the derivative of a function defined on a rectangular grid using quadratic interpolation.
Evaluates a function defined on a rectangular grid using quadratic interpolation.
Evaluates the derivative of a function defined on a rectangular three-dimensional grid using quadratic interpolation.
Evaluates a function defined on a rectangular three-dimensional grid using quadratic interpolation.
Integrates a function using a globally adaptive scheme based on Gauss-Kronrod rules.
Integrates a function over an infinite or semi-infinite interval.
Integrates a function with singularity points given.
Integrates a function with a possible internal or endpoint singularity.
Integrates a function of two variables with a possible internal or end point singularity.
Integrates a function of three variables with a possible internal or endpoint singularity.
Integrates a function (which may have endpoint singularities).
Integrates a function F(X)/(X  C) in the Cauchy principal value sense.
Computes a Fourier integral.
Integrates a function containing a sine or a cosine.
Integrates a function with algebraic-logarithmic singularities.
Evaluates the derivative of a function defined on a set of points using quadratic interpolation.
Integrates a smooth function using a nonadaptive rule.
Evaluates a function defined on a set of points using quadratic interpolation.
Integrates a function over a hyperrectangle using a quasi-Monte Carlo method.
Solves a quadratic programming problem subject to linear equality/inequality constraints.
Computes a sequence from its sine Fourier coefficients with only odd wave numbers.
Computes the coefficients of the sine Fourier transform with only odd wave numbers.
Computes parameters needed by QSINF and QSINB.
Published date: 03/19/2020
Last modified date: 03/19/2020