Introduction
PolyLib is a C# class library providing basic polynomial arithmetics such as addition, multiplication and exponentiation, differentiation and integration, computation of the complex roots of a polynomial, factorization and evaluation at a complex point.
Background
Polynomials such as...
p(x) = 1 + x^2 + 2*x^3
... are a common thing, I hope. For an introduction to complex numbers, read the last chapter of the documentation of the C# Matrix Library (look for CSML on CodeProject).
Using the Code
There are, as for any open source library, two basic concepts of using PolyLib: Either you add PolyLib.dll to your project as reference and type...
using PolyLib;
... at the beginning of the class in which you want to use polynomials; or you just add the files Polynomial.cs and Complex.cs as existing items to your project and adjust the namespace at the head of these classes.
Initializing a polynomial is easy:
Polynomial p = new Polynomial(1, 0, 1, 2);
Now we compute the roots of p:
Complex[] roots = p.Roots();
Do we need the derivative?
Polynomial p1 = Polynomial.Derivative(p);
Output is intuitive as well (assuming we have a textbox txtOut):
txtOut.Text = p.ToString();
Points of Interest
I said it was easy, didn't I? The structure of polynomials is not complicated, and this is reflected by the simplicity of this class. Most of the work lies within the method Roots(), which forced the implementation of complex numbers.
You can also factorize a polynomial using Roots(); a structure for factorized polynomials is implemented. Of course you can again expand the factorized polynomial, but the inherent inaccuracy of floating point arithmetics becomes visible that way. Evaluation at a point is therefore possible for both (expanded) polynomials and factorized polynomials.
I issued the complex numbers class library on CodeProject as a single project as well (look for CompLib). Another library using Complex.cs is CSML, the C# Matrix Library, where I tried to port some of Matlabs functionality to C# .NET (also on CodeProject). This project is growing quickly, now consisting of almost a hundred methods for numerical linear algebra and matrix manipulation.
In future, I will try to merge PolyLib with CSML to an even more powerful class library, where matrix computation with matrices of polynomials will be possible.
History
Update July 4, 2007
- Constructors adjusted (see Leppies comment below)
Update July 3, 2007
- Major bug in Arg() fixed (thanks Petr Stanislav!); this affected
Log(), Pow() and Sqrt()
Upload July 3, 2007
- Uploaded
PolyLib with basic functionality; no complaints so far
