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 1011 articles , 6 standard articles )

Showing results 1 to 20 of 1011.
Sorted by year (citations)

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  1. Aktaş, Mehmet; Cellat, Serdar; Gurdogan, Hubeyb: A polynomial invariant for plane curve complements: Krammer polynomials (2018)
  2. Angella, Daniele; Otiman, Alexandra; Tardini, Nicoletta: Cohomologies of locally conformally symplectic manifolds and solvmanifolds (2018)
  3. Angella, Daniele; Tomassini, Adriano: Hermitian ranks of compact complex manifolds (2018)
  4. Ashley, Caleb; Burelle, Jean-Philippe; Lawton, Sean: Rank 1 character varieties of finitely presented groups (2018)
  5. Benkart, Georgia; Colmenarejo, Laura; Harris, Pamela E.; Orellana, Rosa; Panova, Greta; Schilling, Anne; Yip, Martha: A minimaj-preserving crystal on ordered multiset partitions (2018)
  6. Brádler, Kamil: A novel approach to perturbative calculations for a large class of interacting boson theories (2018)
  7. Brandfonbrener, David; Devlin, Pat; Friedenberg, Netanel; Ke, Yuxuan; Marcus, Steffen; Reichard, Henry; Sciamma, Ethan: Two-vertex generators of Jacobians of graphs (2018)
  8. Bruin, Peter; Ferraguti, Andrea: On $L$-functions of quadratic $\mathbbQ$-curves (2018)
  9. Burns, David; Macias Castillo, Daniel; Wuthrich, Christian: On Mordell-Weil groups and congruences between derivatives of twisted Hasse-Weil $L$-functions (2018)
  10. Dickson, Martin; Neururer, Michael: Products of Eisenstein series and Fourier expansions of modular forms at cusps (2018)
  11. Dieker, A.B.; Saliola, F.V.: Spectral analysis of random-to-random Markov chains (2018)
  12. Drungilas, P.; Jankauskas, J.; Šiurys, J.: On Littlewood and Newman polynomial multiples of Borwein polynomials (2018)
  13. Fasi, Massimiliano; Higham, Nicholas J.: Multiprecision algorithms for computing the matrix logarithm (2018)
  14. Geetha, T.; Prasad, Amritanshu: Comparison of Gelfand-tsetlin bases for alternating and symmetric groups (2018)
  15. Gerard, Jane; Washington, Lawrence C.: Sums of powers of primes (2018)
  16. Gómez-Torrecillas, José; Lobillo, F.J.; Navarro, Gabriel; Neri, Alessando: Hartmann-Tzeng bound and skew cyclic codes of designed Hamming distance (2018)
  17. Gross, Elizabeth; Obatake, Nida; Youngs, Nora: Neural ideals and stimulus space visualization (2018)
  18. Hackl, Benjamin; Heuberger, Clemens; Prodinger, Helmut: Reductions of binary trees and lattice paths induced by the register function (2018)
  19. Krenn, Daniel; Ziegler, Volker: Non-minimality of the width-$w$ non-adjacent form in conjunction with trace one $\tau$-adic digit expansions and Koblitz curves in characteristic two (2018)
  20. Kuszmaul, William: Fast algorithms for finding pattern avoiders and counting pattern occurrences in permutations (2018)

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