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Questions tagged [polynomials]

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6
votes
3answers
137 views

Accurate evaluation of the sign of a polynomial

Let $p$ be a polynomial with floating-point coefficients and let $a$ be a floating-point value. Is there a method for accurately evaluating the sign of $p(a)$ in floating-point arithmetic? I don't ...
4
votes
1answer
251 views

Interpolating a mathematical function using a Hermite Cubic Finite Element Space

I have a Hermite Cubic Finite Element Space on a computer in the form of Matlab m-files. More specifically, I can evaluate four "shape functions" $N_1, N_2, N_3,$ and $N_4$, for which the following ...
4
votes
2answers
124 views

Intervals where the sign of a polynomial can be computed reliably

This is a follow-up of a previous question. Let $p$ be a polynomial with floating-point coefficients. Is there a method for finding intervals where evaluating $p$ in floating-point arithmetic always ...
3
votes
2answers
2k views

C++ Library: What is the common libraries that do polynomial arithmetic?

I need to know what libraries (in C++) support polynomial arithmetic specially over a field. So I can give to it an array of coefficients of polynomial over a field and it returns the roots of ...
2
votes
0answers
95 views

C++: How to find the roots of polynomial modulus N [duplicate]

I need to know what library, given a vector of coefficients and modulus N return the roots of polynomial modulus N. The library should support big integer. I'm coding in C++.
0
votes
1answer
586 views

roots of polynomials of high degree: LinAlgError: Eigenvalues did not converge

I wrote a simple script to generate random polynoimals $\displaystyle f(z)= \sum_{k=0}^N a_k \frac{z^k}{\sqrt{k!}} $ of high degree and find their roots. For more discussion on random polyomials see ...
0
votes
1answer
140 views

Underdetermined/overdetermined polynomial interpolation

I am trying to apply a polynomial interpolation to 340 points in a 4D space, i.e., $$f(x,y,z)=k\, .$$ What I would like to understand is this: if I use a 6th order polynomial I will end up with 343 ...