• D003AD

  • Referenced in 1 article [sw36310]
  • Subroutine D003AD, Harwell subroutine library.
  • D01ALF

  • Referenced in 1 article [sw36284]
  • NAG Library Routine D01ALF: D01ALF is a general purpose integrator.
  • D01ARF

  • Referenced in 1 article [sw36283]
  • NAG Library Routine D01ARF: D01ARF computes definite and indefinite integrals over a finite range to a specified relative or absolute accuracy, using the method described ...
  • d01bcf

  • Referenced in 1 article [sw30987]
  • NAG Library Routine Document d01bcf (dim1_gauss_wgen): d01bcf returns the weights (normal or adjusted) and abscissae for a Gaussian integration rule with a specified number of ...
  • D01FDF

  • Referenced in 1 article [sw36285]
  • NAG Library Routine d01fdf: d01fdf calculates an approximation to a definite integral in up to 30 dimensions, using the method of Sag and Szekeres (see ...
  • d02

  • Referenced in 1 article [sw36276]
  • N.A.G. Fortran Library D02: Ordinary differential equations.
  • d02bhf

  • Referenced in 1 article [sw36288]
  • NAG Library Routine d02bhf: d02bhf integrates a system of first-order ordinary differential equations over an interval with suitable initial conditions, using a Runge–Kutta–Merson method, until ...
  • d02kef

  • Referenced in 4 articles [sw30969]
  • NAG Library Routine Document d02kef (sl2_breaks_funs): d02kef finds a specified eigenvalue of a regular or singular second-order Sturm–Liouville system on a finite or infinite interval, ...
  • D02NMF

  • Referenced in 1 article [sw12687]
  • NAG code D02NMF. D02NMF is a general purpose routine for integrating the initial value problem for a stiff system of explicit ordinary differential equations.
  • D02NNF

  • Referenced in 1 article [sw20007]
  • NAG Library routine D02NNF. D02NNF is a reverse communication routine for integrating stiff systems of implicit ordinary differential equations coupled with algebraic equations.
  • d03pcf

  • Referenced in 5 articles [sw30985]
  • NAG Library Routine Document d03pcf (dim1_parab_fd_old): d03pcf/d03pca integrates a system of linear or nonlinear parabolic partial differential equations (PDEs) in one space variable. The spatial ...
  • d03pef

  • Referenced in 1 article [sw30986]
  • NAG Library Routine Document d03pef (dim1_parab_keller): d03pef integrates a system of linear or nonlinear, first-order, time-dependent partial differential equations (PDEs) in one space variable. The ...
  • D04AAF

  • Referenced in 2 articles [sw36294]
  • NAG Library Routine D04AAF: D04AAF calculates a set of derivatives (up to order 14 ) of a function of one real variable at a point, ...
  • D05ABF

  • Referenced in 1 article [sw36290]
  • NAG Library Routine D05ABF: D05ABF solves any linear nonsingular Fredholm integral equation of the second kind with a smooth kernel.
  • D0C

  • Referenced in 4 articles [sw10449]
  • D0C: A code to calculate scalar one-loop four-point integrals with complex masses. We present a new Fortran code to calculate the scalar one-loop four-point integral ...
  • d2

  • Referenced in 1 article [sw16172]
  • The Decision Desktop software, or d2 for short, was the first software to be developed in the Decision Deck project. It is a desktop, client/server ...
  • D2C

  • Referenced in 2 articles [sw14323]
  • D2C: Predicting Causal Direction from Dependency Features. The relationship between statistical dependency and causality lies at the heart of all statistical approaches to causal inference. ...
  • d2_cluster

  • Referenced in 5 articles [sw28788]
  • d2_cluster: A Validated Method for Clustering EST and Full-Length cDNA Sequences. Several efforts are under way to condense single-read expressed sequence tags (ESTs) and full-length ...
  • d2lri

  • Referenced in 4 articles [sw20256]
  • d2lri: a nonadaptive algorithm for two-dimensional cubature.
  • D2MOPSO

  • Referenced in 4 articles [sw09958]
  • D 2 MOPSO: Multi-Objective Particle Swarm Optimizer Based on Decomposition and Dominance. D 2 MOPSO is a multi-objective particle swarm optimizer that incorporates the dominance ...