# Finding roots of polynomial in Java

I need to find (approximate, numerical) solution to Legendre polynomial. I tried the several Java libraries but none have what I am looking for (the closest is commons-math which even has code for finding the solutions in Laguerre Solver but does not expose the method). Is there an existing solution or do I need to implement my own?

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What have you tried? –  Pradeep Simha Dec 10 '12 at 17:10
@PradeepSimha: JScience, common-math, JAP and possibly a few others found on stackoverflow/google (I spent last ~4 hours searching before posting). –  Maciej Piechotka Dec 10 '12 at 17:17
So, all of them are lacking the thing you need. –  mtk Dec 10 '12 at 17:25
@mtk: Yes. JScience and JAP does not have finding roots at all and common-math have method of finding of a root and commons-math finds only one root (possibly it is possible to choose appropriate initial conditions to find all of them but there should be no need to do it with such simple functions as polynomials). At least I couldn't find any. –  Maciej Piechotka Dec 10 '12 at 17:31
Is it possible to know the reason of downvote (I suspect they are because there are similar question on so and the people assumed I haven't look there)? –  Maciej Piechotka Dec 11 '12 at 21:27

You can use efficient-java-matrix-library

Please find the below sample example for the same

``````public class PolynomialRootFinder {

/**
* <p>
* Given a set of polynomial coefficients, compute the roots of the polynomial.  Depending on
* the polynomial being considered the roots may contain complex number.  When complex numbers are
* present they will come in pairs of complex conjugates.
* </p>
*
* @param coefficients Coefficients of the polynomial.
* @return The roots of the polynomial
*/
public static Complex64F[] findRoots(double... coefficients) {
int N = coefficients.length-1;

// Construct the companion matrix
DenseMatrix64F c = new DenseMatrix64F(N,N);

double a = coefficients[N];
for( int i = 0; i < N; i++ ) {
c.set(i,N-1,-coefficients[i]/a);
}
for( int i = 1; i < N; i++ ) {
c.set(i,i-1,1);
}

// use generalized eigenvalue decomposition to find the roots
EigenDecomposition<DenseMatrix64F> evd =  DecompositionFactory.eigGeneral(N, false);

evd.decompose(c);

Complex64F[] roots = new Complex64F[N];

for( int i = 0; i < N; i++ ) {
roots[i] = evd.getEigenvalue(i);
}

return roots;
}
}
``````
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If you don't know where above comes from, check this paper, specifically page 2 "COMPANION MATRICES: FINDING ROOTS OF UNIVARIATE POLYNOMIALS AS AN EIGENVALUE/EIGENVECTOR PROBLEM". –  Domi Nov 29 at 15:14