MathNet.Numerics.Signed 3.15.0

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 4.0.

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

Packages Downloads
NPOI
.NET port of Apache POI
 2
NPOI
.NET port of Apache POI
 12
NPOI
.NET port of Apache POI
 23
NPOI
.NET port of Apache POI | Contact us on telegram: https://t.me/npoidevs
 19
NPOI
.NET port of Apache POI | Contact us on telegram: https://t.me/npoidevs
 21
NPOI
.NET port of Apache POI | Contact us on telegram: https://t.me/npoidevs
 22
NPOI
.NET port of Apache POI | Contact us on telegram: https://t.me/npoidevs
 23
NPOI
.NET port of Apache POI | Contact us on telegram: https://t.me/npoidevs
 25
NPOI
.NET port of Apache POI | Contact us on telegram: https://t.me/npoidevs
 33

FFT: MKL native provider backend. FFT: 2D and multi-dimensional FFT (only supported by MKL provider, managed provider pending). FFT: real conjugate-even FFT (only leveraging symmetry in MKL provider). FFT: managed provider significantly faster on x64. Linear Algebra: pointwise trigonometric and basic functions ~Albert Pang Linear Algebra: better support for F# built-in operators (sqrt, sin, exp, ..) ~Albert Pang Linear Algebra: pointwise power operator (F#) Linear Algebra: enable experimental matrix product implementation Linear Algebra: better support for matrix to/from row-major arrays and enumerables Linear Algebra: transport allows specifying a result matrix to transpose into, inplace if square Linear Algebra: vector and matrix AsArray and similar to access internal arrays if applicable Linear Algebra: vector and matrix pointwise min/max and absmin/absmax Linear Algebra: dot-power on vectors and matrices, supporting native providers. Linear Algebra: matrix Moore-Penrose pseudo-inverse (SVD backed). Provider Control: separate Control classes for LA and FFT Providers. Provider Control: avoid internal exceptions on provider discovery. Distributions: fix misleading inline docs on Negative-Binomial. Generate: linear integer ranges Root Finding: extend zero-crossing bracketing in derivative-free algorithms. Window: periodic versions of Hamming, Hann, Cosine and Lanczos windows. Special Functions: more robust GammaLowerRegularizedInv (and Gamma.InvCDF). BUG: ODE Solver: fix bug in Runge-Kutta second order routine ~Ksero

This package has no dependencies.

Version Downloads Last updated
5.0.0 27 02/14/2024
5.0.0-beta02 37 02/14/2024
5.0.0-beta01 31 02/14/2024
5.0.0-alpha16 40 02/04/2024
5.0.0-alpha15 39 02/04/2024
5.0.0-alpha14 29 02/04/2024
5.0.0-alpha11 39 02/04/2024
5.0.0-alpha10 24 02/04/2024
5.0.0-alpha09 43 02/04/2024
5.0.0-alpha08 43 02/04/2024
5.0.0-alpha07 40 02/04/2024
5.0.0-alpha06 43 02/04/2024
5.0.0-alpha05 24 02/04/2024
5.0.0-alpha04 44 02/04/2024
5.0.0-alpha03 26 02/04/2024
5.0.0-alpha02 31 02/04/2024
5.0.0-alpha01 26 02/04/2024
4.15.0 28 02/14/2024
4.14.0 15 02/14/2024
4.13.0 35 02/14/2024
4.12.0 18 02/14/2024
4.11.0 35 02/14/2024
4.10.0 19 02/14/2024
4.9.1 31 02/14/2024
4.9.0 19 02/14/2024
4.8.1 24 02/14/2024
4.8.0 17 02/14/2024
4.8.0-beta02 16 02/14/2024
4.8.0-beta01 15 02/14/2024
4.7.0 32 02/14/2024
4.6.0 24 02/14/2024
4.5.0 27 02/14/2024
4.4.1 25 02/14/2024
3.20.2 23 02/14/2024
3.20.1 44 02/14/2024
3.20.0 38 02/14/2024
3.20.0-beta01 30 02/04/2024
3.19.0 33 02/14/2024
3.18.0 28 02/14/2024
3.17.0 26 02/14/2024
3.16.0 34 02/14/2024
3.15.0 45 02/14/2024
3.14.0-beta03 37 02/04/2024
3.14.0-beta02 36 02/04/2024
3.14.0-beta01 20 02/04/2024
3.13.1 27 02/14/2024
3.13.0 28 02/14/2024
3.12.0 34 02/14/2024
3.11.1 23 02/14/2024
3.11.0 28 02/14/2024
3.10.0 37 02/14/2024
3.9.0 41 02/14/2024
3.8.0 40 02/14/2024
3.7.1 34 02/14/2024
3.7.0 38 02/14/2024
3.6.0 41 02/14/2024
3.5.0 44 02/14/2024
3.4.0 31 02/14/2024
3.3.0 26 02/14/2024
3.3.0-beta2 33 02/12/2024
3.3.0-beta1 36 02/12/2024
3.2.3 34 02/14/2024
3.2.2 36 02/14/2024
3.2.1 33 02/14/2024
3.2.0 24 02/14/2024
3.1.0 25 02/14/2024
3.0.2 24 02/14/2024
3.0.1 35 02/14/2024
3.0.0 40 02/14/2024
3.0.0-beta05 19 02/14/2024
3.0.0-beta04 30 02/14/2024
3.0.0-beta03 41 02/14/2024
3.0.0-beta02 40 02/14/2024
3.0.0-beta01 40 02/14/2024
3.0.0-alpha9 20 02/14/2024
3.0.0-alpha8 19 02/14/2024
3.0.0-alpha7 31 02/14/2024
3.0.0-alpha6 35 02/14/2024
3.0.0-alpha5 32 02/14/2024
2.6.1 28 02/14/2024
2.6.0 30 02/14/2024
2.5.0 32 02/14/2024
2.4.0 32 02/14/2024
2.3.0 32 02/14/2024
2.2.1 27 02/14/2024