Evaluation-Interpolation using FFT algorithm

21 Déc 2020
1 Réponse
Mise à jour 22 Déc 2020
6 Vues (30 jours)

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I'm trying to develop a FFT algorithm for evaluation-interpolation of polynomials.
I tried the simple function where the coefficients are expressed as but only the DFT seems to work. I've spent quite some time on this and I can't make it work. Any suggestions?
f = @(x) x^3;
Pf = [1 , 0 , 0 , 0];
yf = FFT(Pf,1);
y = FFT(yf,2)
function y = FFT(P,k)
% k = 1 -> DFT
% k = 2 -> IDFT
N = length(P);
omega = exp(2*pi*1i/N);
if k == 1
l = 1;
p = 1;
elseif k == 2
l = 1/N;
p = -1;
end
if N == 1
y = P;
else
n = N/2;
P_e = P(2:2:end);
P_o = P(1:2:end);
y_e = FFT(P_e,k);
y_o = FFT(P_o,k);
y = zeros(N,1);
for j = 1 : N/2
y(j) = y_e(j) + (l*omega^(p*(j-1)))*y_o(j);
y(j+n) = y_e(j) - (l*omega^(p*(j-1)))*y_o(j);
end
end
end

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chicken vector
chicken vector le 22 Déc 2020
Modifié(e) : chicken vector le 22 Déc 2020
For anyone having the same problem, below there's the fixed code for IFFT. I'm having some issues on dividing by N inside the recursive function, so it is done outside.
P = [%vector of the evaluations];
N = length(P);
y = IFFT(P)/N;
function y = IFFT(P)
% This works only if N = 2^k
N = length(P);
n = N/2;
omega = exp(-2*pi*1i/N);
if N == 1
y = P;
else
P_e = P(1:2:end);
P_o = P(2:2:end);
y_e = IFFT(P_e);
y_o = IFFT(P_o);
y = zeros(N,1);
for j = 1 : n
y(j) = y_e(j) + omega^(j-1)*y_o(j);
y(j+n) = y_e(j) - omega^(j-1)*y_o(j);
end
end
end

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Réponses (1)

Matt J
Matt J le 22 Déc 2020

0 votes

A highly impractical thing to do. If you know the coefficients of the polynomial, you should just use polyval().
However, if you must use FFT interpolation, then interpft() will readily do it,
https://www.mathworks.com/help/matlab/ref/interpft.html

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chicken vector
chicken vector le 22 Déc 2020
Modifié(e) : chicken vector le 22 Déc 2020
My problem is that I have an array of function handles and the determinant of this array is a 15th degree polynomial. I need to find the roots of this polynomial, but first I need to find the polynomial. Using a symbolic variable is computationally inefficient so I have to compute the coefficients of this polynomial, and FFT algorithm is the best option since it is optimized when the degree of the polynomial is of order .
Matt J
Matt J le 22 Déc 2020
Ran in:
Ran in:
Finding the roots of a 15th order polynomial can be highly unstable numerically, e.g.,
rTrue=sort((rand(1,15))*5);
coeffsTrue=poly(rTrue), %true coefficients
coeffsTrue = 1×16
0.0000 -0.0000 0.0005 -0.0048 0.0297 -0.1319 0.4312 -1.0507 1.9172 -2.6054 2.5973 -1.8477 0.8961 -0.2745 0.0461 -0.0030
coeffs=coeffsTrue+[0,randn(1,15)]*1e-6*max(coeffsTrue), %add small errors to coefficients
coeffs = 1×16
0.0000 -0.0000 0.0005 -0.0048 0.0297 -0.1319 0.4312 -1.0507 1.9172 -2.6054 2.5973 -1.8477 0.8961 -0.2745 0.0461 -0.0030
rTrue, %true roots
rTrue = 1×15
0.1598 0.4384 0.6582 1.3390 1.5456 1.7830 2.1863 2.2286 2.2790 2.6051 2.9448 3.0386 3.6676 4.1255 4.5711
r=sort(real( roots(coeffs) )).' %calculated roots
r = 1×15
0.1596 0.4403 0.6541 1.0277 1.0277 1.1391 1.1391 1.2642 1.2642 1.4859 1.4859 2.3075 2.3075 8.5793 8.5793
chicken vector
chicken vector le 22 Déc 2020
I used 'roots' aswell and appears to have very good performances until now.
Thank you Matt for your help.

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