# Questions tagged [polynomials]

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### Computing size of N-Dimensional Polynomial Basis and Efficient Representation of Basis

A problem I have had on my mind recently has been a compact way to compute the size of an $N$-Dimensional Polynomial basis of some order $p$, where a linear basis is $p=1$. I have attempted searching ...
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### Time complexity and its formula [closed]

Is there any example support the case of $O(n^k)$ where $k$ has a fixed calculated value for every $n$ and $k$ is not a constant value for all $n$. As $k$ depends on the value of $n$ in polynomial ...
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### Benchmarks for Gröbner bases and polynomial system solution

In the recent question Solving system of 7 nonlinear algebraic equations symbolically, Brian Borchers experimentally confirmed that Maple can solve a polynomial system that Matlab/Mupad cannot handle. ...
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### Pade-like approximation, but force poles to be negative

Are there techniques to form a Pade approximation (or Pade-like approximation), except force the poles of the rational function to be negative? I am trying to use Pade approximations to extrapolate a ...
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### Gauss Integration of $\sqrt(x)$

I want to construct a gauss integration for the weight function $w(x) = x^{1/2}$ for $$\int_{0}^{1}x^{1/2}f(x)dx = a_{1}f(x_{1})+a_{2}f(x_{2})$$ Solving \begin{align*} a_{1}+a_{2} =& \int_{0}^{...
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### Accurate Polynomial Evaluation in Floating Point

What are the most accurate algorithms for evaluating a polynomial using floating point arithmetic? The internet seems to suggest that Horner's method is commonly used. In particular I have a cubic ...
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### Algorithm to determine if a polynomial has any complex roots

Is there a simple algorithm to determine if a given polynomial (with all real coefficients) has all real roots? I do not need to know what the roots are; I just what to know if a given polynomial has ...
251 views

### Polynomial rooting - fast root finding

I need to solve a rooting problem of a polynomial (the order of which is 2(N-1), where N=48). So far I'm using Python Numpy algorithm (that relies on computing the eigenvalues of the companion matrix)...
321 views

### Chebyshev and Legendre expansions

I am looking at approximating my function $f(x)$ using a Chebyshev and Legendre series and I ran into this question. Is interpolation using $n+1$ Chebyshev nodes the same as representing the function ...
587 views

### Problems Implementing the Remez Algorithm

So first off: *** This code is not being used in production software. It is a personal project of mine, trying to understand approximation theory and advanced curve fitting. In other words, I'm ...
267 views

### Fast evaluation functions given by straight-line programs

I have a simple but long function that takes a vector x[10], and outputs a vector y[100]. It is an automatically generated eval function for a multivariate polynomial, ie, there is only (complex) ...
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### 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 ...
488 views

### Polynomial approximation - Vandermonde matrix creation - precision

I am trying to fit a polynomial through 340 points in a 3D space, i.e. $$f(x,y,z) = k$$ I asked previously about the theory behind polynomial interpolation here -> Polynomial interpolation Few ...
259 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 ...
71 views

### Legendre expansion of $r(x) = f(x)/g(x)$ using a finite number of samples from $f(x)$ and $g(x)$

I have two finite sets of events $\{x_1, ..., x_N\}$ and $\{y_1, ..., y_N\}$ that are sampled from the PDFs $f(x)$ and $g(x)$, respectively, where $x \in [-1,+1]$. I want to estimate the Legendre ...
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### Solution of quartic equation

Is there a open C-implementation for the solution of quartic equations: $$ax⁴+bx³+cx²+dx+e=0$$ I am thinking of an implementation of Ferrari's solution. On Wikipedia I read that the solution is ...
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### A linear polynomial that is the minimax (best) approximation to $f(x)$ on the interval $[-1,1]$

Suppose you have the following analytical information about a function $f(x)$ on $[-1,1]$: \begin{align*} f(x) &= \frac{1}{x+3}\\ f'(x) & = -\frac{1}{(x+3)^2}\\ f^{''}(x) &= \frac{2}{(x+3)...
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### Is the numerical resolution of this huge sparse polynomial system tractable?

I'd like to find numerically a solution to a sparse system of 2000000 polynomial equations of degree 3 with 50000 variables and integer coefficients (or at least to decide whether or not a solution ...
427 views

### Polynomial order of an approximation of a section of sine and numerical accuracy

I was playing with the idea that a sine function is periodic. But even within one period there are symmetries, namely the second fourth of a period is the mirror image of the first fourth and the ...
I need to calculate the lagrange polynomial which approximates $e^x$ at $101$ points, the points $\frac{k}{101^2}$ for $k\in\{0,1,2\dots 100\}$. I tried the following code: ...