## Features

Nemo is a Julia package which contains wrappers of C/C++ libraries. It also reexports all the functionality of AbstractAlgebra.jl, which provides generic structures and algorithms. Below we describe some of the features.

### AbstractAlgebra.jl generics

- Power series and Laurent series
- Univariate and multivariate Polynomials
- Residue rings
- Matrices
- Fraction fields

### Nemo wrappers

#### Flint

- fmpz - Integers
- fmpq - Rationals
- padic - Padics
- fmpz_mat - matrices over the integers
- fmpq_mat - matrices over the rationals
- nmod_mat - matrices over Z/nZ for small n
- fmpz_poly - polynomials over the integers
- fmpq_poly - polynomials over the rationals
- nmod_poly - polynomials over Z/nZ for small n
- fmpz_mod_poly - polynomials over Z/nZ for large n
- fmpz_series - power series over the integers
- fmpq_series - power series over the rationals
- nmod_series - power series over Z/nZ for small n
- fmpz_mod_series - power series over Z/nZ for small n
- fq - finite fields for multiprecision characteristic
- fq_nmod - finite fields for small characteristic
- fq_poly - polynomials over finite fields for multiprecision characteristic
- fq_nmod_poly - polynomials over finite fields for small characteristic
- fq_series - power series over finite fields for multiprecision characteristic
- fq_nmod_series - power series over finite fields for small characteristic

#### Antic

- nf_elem - number fields

#### Arb

- arb - arbitrary precision real balls
- acb - arbitrary precision complex balls
- arb_poly - polynomials over arbitrary precision real balls
- acb_poly - polynomials over arbitrary precision complex balls
- arb_mat - matrices over arbitrary precision real balls
- acb_mat - matrices over arbitrary precision complex balls

### Libraries that use Nemo

#### Hecke.jl

Hecke.jl provides ideals, orders, class groups, sparse linear algebra, class field theory and various other things related to algebraic number theory.

https://github.com/thofma/Hecke.jl#### Singular.jl

Singular.jl provides a wrapper of the Singular kernel, providing access to fast Groebner basis code, multivariates designed for GB's and ideals, modules and the like, over such polynomial rings.

https://github.com/oscar-system/Singular.jl/*Last updated: 2020-01-13 11:04:59 GMT*

*Contact: nemo-devel mailing list.*

Logo background due to Giacomo Merculiano.