Asymptote

Asymptote is a powerful descriptive 2D and 3D vector graphics language for technical drawing, inspired by MetaPost but with an improved C++-like syntax. It provides for figures the same high-quality level of typesetting that LaTeX does for scientific text. Asymptote is a programming language as opposed to just a graphics program. It can exploit the best features of script (command-driven) and graphical user interface (GUI) methods. High-level graphics commands are implemented in the language itself, allowing them to be easily tailored to specific applications. (Source: http://freecode.com/)

Keywords for this software

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References in zbMATH (referenced in 13 articles )

Showing results 1 to 13 of 13.
Sorted by year (citations)

  1. Caliò, Franca; Marchetti, Elena: Two architectures: two compared geometries (2019)
  2. Kisil, Vladimir V.: An extension of Möbius-Lie geometry with conformal ensembles of cycles and its implementation in a GiNaC library (2018)
  3. Vladimir V. Kisil: Lectures on Moebius-Lie Geometry and its Extension (2018) arXiv
  4. Lambe, Larry A.: An algebraic study of the Klein bottle (2016)
  5. Bowman, John C.; Yassaei, Mohammad Ali; Basu, Anup: A fully Lagrangian advection scheme (2015)
  6. Christophe Genolini; Xavier Alacoque; Mariane Sentenac; Catherine Arnaud: kml and kml3d: R Packages to Cluster Longitudinal Data (2015) not zbMATH
  7. Vladimir V. Kisil: An Extension of Moebius--Lie Geometry with Conformal Ensembles of Cycles and Its Implementation in a GiNaC Library (2015) arXiv
  8. Müller, Thomas; Boblest, Sebastian: Visual appearance of wireframe objects in special relativity (2014)
  9. Kisil, Vladimir V.: Geometry of Möbius transformations. Elliptic, parabolic and hyperbolic actions of SL(_2(\mathbbR)). With DVD-ROM (2012)
  10. Pavičić, Mladen; McKay, Brendan D.; Megill, Norman D.; Fresl, Krešimir: Graph approach to quantum systems (2010)
  11. Heuberger, Clemens; Wagner, Stephan G.: On a class of extremal trees for various indices (2009)
  12. Kisil, Vladimir V.: Starting with the group (\mathrmSL_2(\mathbbR)) (2007)
  13. Kisil, Vladimir V.: Fillmore-Springer-Cnops construction implemented in GiNaC (2007)