MathNet.Numerics.FSharp.Signed 3.14.0-beta01

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.

This is a prerelease version of MathNet.Numerics.FSharp.Signed.
There is a newer version of this package available.
See the version list below for details.
Install-Package MathNet.Numerics.FSharp.Signed -Version 3.14.0-beta01
dotnet add package MathNet.Numerics.FSharp.Signed --version 3.14.0-beta01
<PackageReference Include="MathNet.Numerics.FSharp.Signed" Version="3.14.0-beta01" />
For projects that support PackageReference, copy this XML node into the project file to reference the package.
paket add MathNet.Numerics.FSharp.Signed --version 3.14.0-beta01
The NuGet Team does not provide support for this client. Please contact its maintainers for support.

Release Notes

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.
Provider Control: separate Control classes for LA and FFT Providers.
Provider Control: avoid internal exceptions on provider discovery.
Linear Algebra: dot-power on vectors and matrices, supporting native providers.
Linear Algebra: matrix Moore-Penrose pseudo-inverse (SVD backed).
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

NuGet packages

This package is not used by any NuGet packages.

GitHub repositories

This package is not used by any popular GitHub repositories.

Version History

Version Downloads Last updated
4.12.0 159 8/2/2020
4.11.0 154 5/24/2020
4.10.0 130 5/24/2020
4.9.1 152 4/12/2020
4.9.0 171 10/13/2019
4.8.1 197 6/11/2019
4.8.0 203 6/2/2019
4.8.0-beta02 185 5/30/2019
4.8.0-beta01 180 4/28/2019
4.7.0 315 11/11/2018
4.6.0 270 10/19/2018
4.5.0 416 5/22/2018
4.4.1 393 5/6/2018
3.20.2 453 1/22/2018
3.20.1 403 1/13/2018
3.20.0 542 7/15/2017
3.20.0-beta01 367 5/31/2017
3.19.0 439 4/29/2017
3.18.0 415 4/9/2017
3.17.0 471 1/15/2017
3.16.0 425 1/3/2017
3.15.0 437 12/27/2016
3.14.0-beta03 419 11/20/2016
3.14.0-beta02 384 11/15/2016
3.14.0-beta01 402 10/30/2016
3.13.1 478 9/6/2016
3.13.0 424 8/18/2016
3.12.0 480 7/3/2016
3.11.1 571 4/24/2016
3.11.0 610 2/13/2016
3.10.0 570 12/30/2015
3.9.0 535 11/25/2015
3.8.0 535 9/26/2015
3.7.1 539 9/21/2015
3.7.0 706 5/9/2015
3.6.0 740 3/22/2015
3.5.0 659 1/10/2015
3.4.0 501 1/4/2015
3.3.0 533 11/26/2014
3.3.0-beta2 561 10/25/2014
3.3.0-beta1 499 9/28/2014
3.2.3 700 9/6/2014
3.2.2 526 9/5/2014
3.2.1 566 8/5/2014
3.2.0 555 8/5/2014
3.1.0 556 7/20/2014
3.0.2 531 6/26/2014
3.0.1 513 6/24/2014
3.0.0 510 6/21/2014
3.0.0-beta05 463 6/20/2014
3.0.0-beta04 486 6/15/2014
3.0.0-beta03 491 6/5/2014
3.0.0-beta02 506 5/29/2014
3.0.0-beta01 539 4/14/2014
3.0.0-alpha9 496 3/29/2014
3.0.0-alpha8 472 2/26/2014
3.0.0-alpha7 465 12/30/2013
3.0.0-alpha6 477 12/2/2013
3.0.0-alpha5 552 10/2/2013
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