MathNet.Numerics 4.14.0

Math.NET Numerics is the numerical foundation of the Math.NET project, aiming to provide methods and algorithms for numerical computations in science, engineering and every day use. Supports .Net Framework 4.0 or higher and .Net Standard 1.3 or higher, on Windows, Linux and Mac.

Showing the top 20 packages that depend on MathNet.Numerics.

Packages Downloads
Akka.Persistence.TCK
Testkit for Persistence actor support for Akka.NET
 3

Optimization: Avoid losing precision in golden section minimizer ~Daniel Fox Interpolation: Monotone-preserving Piecewise Cubic Hermite Polynomial (PCHIP) ~Febin Linear Algebra: Sparse COO format fix handling if not sorted or with duplicates ~Jong Hyun Kim Linear Algebra: Matrix.Resize

.NET Framework 4.0

  • No dependencies.

.NET Framework 4.6.1

  • No dependencies.

.NET Standard 1.3

.NET Standard 2.0

  • No dependencies.

Version Downloads Last updated
6.0.0-beta1 5 11/17/2024
5.0.0 2 11/19/2024
5.0.0-beta02 3 11/19/2024
5.0.0-beta01 4 11/19/2024
5.0.0-alpha16 4 11/19/2024
5.0.0-alpha15 2 11/19/2024
5.0.0-alpha14 3 11/19/2024
5.0.0-alpha13 2 11/19/2024
5.0.0-alpha12 2 11/19/2024
5.0.0-alpha11 2 11/19/2024
5.0.0-alpha10 2 11/19/2024
5.0.0-alpha09 2 11/19/2024
5.0.0-alpha08 2 11/19/2024
5.0.0-alpha07 4 11/19/2024
5.0.0-alpha06 2 11/19/2024
5.0.0-alpha05 2 11/19/2024
5.0.0-alpha04 3 11/19/2024
5.0.0-alpha03 2 11/19/2024
5.0.0-alpha02 2 11/19/2024
5.0.0-alpha01 2 11/19/2024
4.15.0 3 11/19/2024
4.14.0 2 11/19/2024
4.13.0 2 11/19/2024
4.12.0 3 11/19/2024
4.11.0 2 11/19/2024
4.10.0 4 11/19/2024
4.9.1 2 11/19/2024
4.9.0 2 11/19/2024
4.8.1 2 11/19/2024
4.8.0 2 11/19/2024
4.8.0-beta02 3 11/19/2024
4.8.0-beta01 3 11/19/2024
4.7.0 2 11/19/2024
4.6.0 2 11/19/2024
4.5.1 2 11/19/2024
4.5.0 2 11/19/2024
4.4.1 2 11/19/2024
4.4.0 2 11/19/2024
4.3.0 2 11/19/2024
4.2.0 2 11/19/2024
4.1.0 2 11/19/2024
4.0.0 2 11/19/2024
4.0.0-beta07 3 11/19/2024
4.0.0-beta06 3 11/19/2024
4.0.0-beta05 3 11/19/2024
4.0.0-beta04 4 11/19/2024
4.0.0-beta03 3 11/19/2024
4.0.0-beta02 3 11/19/2024
4.0.0-beta01 3 11/19/2024
4.0.0-alpha04 2 11/19/2024
4.0.0-alpha03 2 11/19/2024
4.0.0-alpha02 2 11/19/2024
4.0.0-alpha01 2 11/19/2024
3.20.2 2 11/19/2024
3.20.1 3 11/19/2024
3.20.0 2 11/19/2024
3.20.0-beta01 3 11/19/2024
3.19.0 2 11/19/2024
3.18.0 2 11/19/2024
3.17.0 3 11/19/2024
3.16.0 2 11/19/2024
3.15.0 2 11/19/2024
3.14.0-beta03 3 11/19/2024
3.14.0-beta02 3 11/19/2024
3.14.0-beta01 4 11/19/2024
3.13.1 2 11/19/2024
3.13.0 2 11/19/2024
3.12.0 2 11/19/2024
3.11.1 3 11/19/2024
3.11.0 2 11/19/2024
3.10.0 2 11/19/2024
3.9.0 2 11/19/2024
3.8.0 2 11/19/2024
3.7.1 2 11/19/2024
3.7.0 2 11/19/2024
3.6.0 2 11/19/2024
3.5.0 2 11/19/2024
3.4.0 2 11/19/2024
3.3.0 2 11/19/2024
3.3.0-beta2 3 11/19/2024
3.3.0-beta1 3 11/19/2024
3.2.3 2 11/19/2024
3.2.2 4 11/19/2024
3.2.1 2 11/19/2024
3.2.0 4 11/19/2024
3.1.0 2 11/19/2024
3.0.2 4 11/19/2024
3.0.1 2 11/19/2024
3.0.0 2 11/19/2024
3.0.0-beta05 3 11/19/2024
3.0.0-beta04 4 11/19/2024
3.0.0-beta03 3 11/19/2024
3.0.0-beta02 3 11/19/2024
3.0.0-beta01 3 11/19/2024
3.0.0-alpha9 2 11/19/2024
3.0.0-alpha8 2 11/19/2024
3.0.0-alpha7 2 11/18/2024
3.0.0-alpha6 4 11/19/2024
3.0.0-alpha5 2 11/19/2024
3.0.0-alpha4 2 11/19/2024
3.0.0-alpha1 2 11/19/2024
2.6.2 2 11/19/2024
2.6.1 2 11/19/2024
2.6.0 2 11/19/2024
2.5.0 2 11/19/2024
2.4.0 2 11/19/2024
2.3.0 2 11/19/2024
2.2.1 2 11/19/2024
2.2.0 2 11/19/2024
2.1.2 2 11/19/2024
2.1.1 2 11/19/2024