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algebra | nimber | |
---|---|---|

- | - | |

101 | 2 | |

- | - | |

0.0 | 0.0 | |

about 4 years ago | about 5 years ago | |

Haskell | Haskell | |

BSD 3-clause "New" or "Revised" License | BSD 3-clause "New" or "Revised" License |

**mentions**indicates the total number of mentions that we've tracked plus the number of user suggested alternatives.

**Stars**- the number of stars that a project has on GitHub.

**Growth**- month over month growth in stars.

**Activity**is a relative number indicating how actively a project is being developed. Recent commits have higher weight than older ones.

For example, an activity of

**9.0**indicates that a project is amongst the top 10% of the most actively developed projects that we are tracking.

## algebra

**reviews of algebra**. We have used some of these posts to build our list of alternatives and similar projects.

We haven't tracked posts mentioning algebra yet.

Tracking mentions began in Dec 2020.

## nimber

**reviews of nimber**. We have used some of these posts to build our list of alternatives and similar projects.

We haven't tracked posts mentioning nimber yet.

Tracking mentions began in Dec 2020.

## What are some alternatives?

**linear-algebra-cblas**
- Haskell BLAS bindings

**hmatrix**
- Linear algebra and numerical computation

**simplex-basic**
- A trivial implementation of the simplex algorithm.

**linear**
- Low-dimensional linear algebra primitives for Haskell.

**computational-algebra**
- General-Purpose Computer Algebra System as an EDSL in Haskell

**hblas**
- haskell bindings for blas and lapack

**magma**
- magma algebraic library

**diagrams-solve**
- Miscellaneous solver code for diagrams (low-degree polynomials, tridiagonal matrices)

**metamorphic**
- metamorphisms (aka playing with: (fold, (.), unfold)

**nats**
- Haskell 98 Natural Numbers

**eigen**
- Haskel binding for Eigen library. Eigen is a C++ template library for linear algebra: matrices, vectors, numerical solvers, and related algorithms.

**hTensor**
- Multidimensional arrays and simple tensor computations