Sage (SageMath) is free, open-source math software that supports research and teaching in algebra, geometry, number theory, cryptography, numerical computation, and related areas. Both the Sage development model and the technology in Sage itself are distinguished by an extremely strong emphasis on openness, community, cooperation, and collaboration: we are building the car, not reinventing the wheel. The overall goal of Sage is to create a viable, free, open-source alternative to Maple, Mathematica, Magma, and MATLAB. Computer algebra system (CAS).

This software is also referenced in ORMS.

References in zbMATH (referenced in 1176 articles , 6 standard articles )

Showing results 1 to 20 of 1176.
Sorted by year (citations)

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  1. East, James; Egri-Nagy, Attila; Mitchell, James D.; Péresse, Yann: Computing finite semigroups (2019-2019)
  2. Gómez-Torrecillas, José; Lobillo, F. J.; Navarro, Gabriel: Computing the bound of an Ore polynomial. Applications to factorization (2019-2019)
  3. Booher, Jeremy: Minimally ramified deformations when $\ell \neq p$ (2019)
  4. Chirvasitu, Alex; Smith, S. Paul: Exotic elliptic algebras (2019)
  5. Cueto, Maria Angelica; Markwig, Hannah: Tropical geometry of genus two curves (2019)
  6. Damir, Mohamed Taoufiq; Karpuk, David: Well-rounded twists of ideal lattices from real quadratic fields (2019)
  7. De Loera, Jesús A.; Petrović, Sonja; Silverstein, Lily; Stasi, Despina; Wilburne, Dane: Random monomial ideals (2019)
  8. Dranichak, Garrett M.; Wiecek, Margaret M.: On highly robust efficient solutions to uncertain multiobjective linear programs (2019)
  9. Fei, Jiarui: Cluster algebras, invariant theory, and Kronecker coefficients. II. (2019)
  10. Forsgård, Jens; Matusevich, Laura Felicia; Mehlhop, Nathan; De Wolff, Timo: Lopsided approximation of amoebas (2019)
  11. Gassert, T. Alden; Smith, Hanson; Stange, Katherine E.: A family of monogenic $S_4$ quartic fields arising from elliptic curves (2019)
  12. Kim, Jang Soo; Yoo, Meesue: Hook length property of $d$-complete posets via $q$-integrals (2019)
  13. Klagsbrun, Zev; Sherman, Travis; Weigandt, James: The Elkies curve has rank 28 subject only to GRH (2019)
  14. Knauer, Kolja; Valicov, Petru: Cuts in matchings of 3-connected cubic graphs (2019)
  15. Loehr, Nicholas A.; Warrington, Gregory S.: Quasisymmetric and Schur expansions of cycle index polynomials (2019)
  16. Moon, Han-Bom; Swinarski, David: On the $S_n$-invariant F-conjecture (2019)
  17. Aalipour, Ghodratollah; Abiad, Aida; Berikkyzy, Zhanar; Hogben, Leslie; Kenter, Franklin H. J.; Lin, Jephian C.-H.; Tait, Michael: Proof of a conjecture of Graham and Lovász concerning unimodality of coefficients of the distance characteristic polynomial of a tree (2018)
  18. Akbari, Saieed; Belardo, Francesco; Dodongeh, Ebrahim; Nematollahi, Mohammad Ali: Spectral characterizations of signed cycles (2018)
  19. Aktaş, Mehmet; Cellat, Serdar; Gurdogan, Hubeyb: A polynomial invariant for plane curve complements: Krammer polynomials (2018)
  20. Alfaro, Carlos A.: Graphs with real algebraic co-rank at most two (2018)

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