/* * (C) Vladislav Malyshkin 2010 * This file is under GPL version 3. * /** Polynomial root. * @version $Id: PolynomialRoot.java,v 1.105 2012/08/18 00:00:05 mal Exp $ * @author Vladislav Malyshkin mal@gromco.com /** * @test * @key randomness * @bug 8005956 * @summary C2: assert(!def_outside->member(r)) failed: Use of external LRG overlaps the same LRG defined in this block * @library /test/lib * @modules java.base/jdk.internal.misc * java.management * * @run main/timeout=300 compiler.c2.PolynomialRoot package compiler.c2;import jdk.test.lib.Utils;import java.util.Arrays;import java.util.Random;public class PolynomialRoot {public static int findPolynomialRoots(final int n,final double [] p,final double [] re_root,final double [] im_root)if (n==4 )return root4(p,re_root,im_root);else if (n==3 )return root3(p,re_root,im_root);else if (n==2 )return root2(p,re_root,im_root);else if (n==1 )return root1(p,re_root,im_root);else throw new RuntimeException("n=" +n+" is not supported yet" );static final double SQRT3=Math.sqrt(3 .0 ),SQRT2=Math.sqrt(2 .0 );private static final boolean PRINT_DEBUG=false ;public static int root4(final double [] p,final double [] re_root,final double [] im_root)if (PRINT_DEBUG) { System.err.println("=====================root4:p=" + Arrays.toString(p)); }final double vs=p[4 ];if (PRINT_DEBUG) System.err.println("p[4]=" +p[4 ]);if (!(Math.abs(vs)>EPS))0 ]=re_root[1 ]=re_root[2 ]=re_root[3 ]=0 ]=im_root[1 ]=im_root[2 ]=im_root[3 ]=Double .NaN;return -1 ;/* zsolve_quartic.c - finds the complex roots of * x^4 + a x^3 + b x^2 + c x + d = 0 final double a=p[3 ]/vs,b=p[2 ]/vs,c=p[1 ]/vs,d=p[0 ]/vs;if (PRINT_DEBUG) System.err.println("input a=" +a+" b=" +b+" c=" +c+" d=" +d);final double r4 = 1 .0 / 4 .0 ;final double q2 = 1 .0 / 2 .0 , q4 = 1 .0 / 4 .0 , q8 = 1 .0 / 8 .0 ;final double q1 = 3 .0 / 8 .0 , q3 = 3 .0 / 16 .0 ;final int mt;/* Deal easily with the cases where the quartic is degenerate. The if (0 == b && 0 == c)if (0 == d)0 ]=-a;0 ]=im_root[1 ]=im_root[2 ]=im_root[3 ]=0 ;1 ]=re_root[2 ]=re_root[3 ]=0 ;return 4 ;else if (0 == a)if (d > 0 )final double sq4 = Math.sqrt(Math.sqrt(d));0 ]=sq4*SQRT2/2 ;0 ]=re_root[0 ];1 ]=-re_root[0 ];1 ]=re_root[0 ];2 ]=-re_root[0 ];2 ]=-re_root[0 ];3 ]=re_root[0 ];3 ]=-re_root[0 ];if (PRINT_DEBUG) System.err.println("Path a=0 d>0" );else final double sq4 = Math.sqrt(Math.sqrt(-d));0 ]=sq4;0 ]=0 ;1 ]=0 ;1 ]=sq4;2 ]=0 ;2 ]=-sq4;3 ]=-sq4;3 ]=0 ;if (PRINT_DEBUG) System.err.println("Path a=0 d<0" );return 4 ;if (0 .0 == c && 0 .0 == d)new double []{p[2 ],p[3 ],p[4 ]},re_root,im_root);2 ]=im_root[2 ]=re_root[3 ]=im_root[3 ]=0 ;return 4 ;if (PRINT_DEBUG) System.err.println("G Path c=" +c+" d=" +d);final double [] u=new double [3 ];if (PRINT_DEBUG) System.err.println("Generic Path" );/* For non-degenerate solutions, proceed by constructing and final double aa = a * a;final double pp = b - q1 * aa;final double qq = c - q2 * a * (b - q4 * aa);final double rr = d - q4 * a * (c - q4 * a * (b - q3 * aa));final double rc = q2 * pp , rc3 = rc / 3 ;final double sc = q4 * (q4 * pp * pp - rr);final double tc = -(q8 * qq * q8 * qq);if (PRINT_DEBUG) System.err.println("aa=" +aa+" pp=" +pp+" qq=" +qq+" rr=" +rr+" rc=" +rc+" sc=" +sc+" tc=" +tc);final boolean flag_realroots;/* This code solves the resolvent cubic in a convenient fashion * for this implementation of the quartic. If there are three real * roots, then they are placed directly into u[]. If two are * complex, then the real root is put into u[0] and the real * and imaginary part of the complex roots are placed into final double qcub = (rc * rc - 3 * sc);final double rcub = (rc*(2 * rc * rc - 9 * sc) + 27 * tc);final double Q = qcub / 9 ;final double R = rcub / 54 ;final double Q3 = Q * Q * Q;final double R2 = R * R;final double CR2 = 729 * rcub * rcub;final double CQ3 = 2916 * qcub * qcub * qcub;if (PRINT_DEBUG) System.err.println("CR2=" +CR2+" CQ3=" +CQ3+" R=" +R+" Q=" +Q);if (0 == R && 0 == Q)true ;0 ] = -rc3;1 ] = -rc3;2 ] = -rc3;else if (CR2 == CQ3)true ;final double sqrtQ = Math.sqrt (Q);if (R > 0 )0 ] = -2 * sqrtQ - rc3;1 ] = sqrtQ - rc3;2 ] = sqrtQ - rc3;else 0 ] = -sqrtQ - rc3;1 ] = -sqrtQ - rc3;2 ] = 2 * sqrtQ - rc3;else if (R2 < Q3)true ;final double ratio = (R >= 0 ?1 :-1 ) * Math.sqrt (R2 / Q3);final double theta = Math.acos (ratio);final double norm = -2 * Math.sqrt (Q);0 ] = norm * Math.cos (theta / 3 ) - rc3;1 ] = norm * Math.cos ((theta + 2 .0 * Math.PI) / 3 ) - rc3;2 ] = norm * Math.cos ((theta - 2 .0 * Math.PI) / 3 ) - rc3;else false ;final double A = -(R >= 0 ?1 :-1 )*Math.pow(Math.abs(R)+Math.sqrt(R2-Q3),1 .0 /3 .0 );final double B = Q / A;0 ] = A + B - rc3;1 ] = -0 .5 * (A + B) - rc3;2 ] = -(SQRT3*0 .5 ) * Math.abs (A - B);if (PRINT_DEBUG) System.err.println("u[0]=" +u[0 ]+" u[1]=" +u[1 ]+" u[2]=" +u[2 ]+" qq=" +qq+" disc=" +((CR2 - CQ3) / 2125764 .0 ));/* End of solution to resolvent cubic */ /* Combine the square roots of the roots of the cubic * resolvent appropriately. Also, calculate 'mt' which * designates the nature of the roots: * mt=1 : 4 real roots * mt=2 : 0 real roots * mt=3 : 2 real roots final double w1_re,w1_im,w2_re,w2_im,w3_re,w3_im,mod_w1w2,mod_w1w2_squared;if (flag_realroots)1 ;2 ;int jmin=0 ;double vmin=Math.abs(u[jmin]);for (int j=1 ;j<3 ;j++)final double vx=Math.abs(u[j]);if (vx<vmin)final double u1=u[(jmin+1 )%3 ],u2=u[(jmin+2 )%3 ];if (u1>=0 )0 ;else 0 ;if (u2>=0 )0 ;else 0 ;if (PRINT_DEBUG) System.err.println("u1=" +u1+" u2=" +u2+" jmin=" +jmin);else 3 ;final double w_mod2_sq=u[1 ]*u[1 ]+u[2 ]*u[2 ],w_mod2=Math.sqrt(w_mod2_sq),w_mod=Math.sqrt(w_mod2);if (w_mod2_sq<=0 )0 ;else // calculate square root of a complex number (u[1],u[2]) // the result is in the (w1_re,w1_im) final double absu1=Math.abs(u[1 ]),absu2=Math.abs(u[2 ]),w;if (absu1>=absu2)final double t=absu2/absu1;0 .5 * (1 .0 + Math.sqrt(1 .0 + t * t)));if (PRINT_DEBUG) System.err.println(" Path1 " );else final double t=absu1/absu2;0 .5 * (t + Math.sqrt(1 .0 + t * t)));if (PRINT_DEBUG) System.err.println(" Path1a " );if (u[1 ]>=0 )2 ]/(2 *w);if (PRINT_DEBUG) System.err.println(" Path2 " );else final double vi = (u[2 ] >= 0 ) ? w : -w;2 ]/(2 *vi);if (PRINT_DEBUG) System.err.println(" Path2a " );final double absu0=Math.abs(u[0 ]);if (w_mod2>=absu0)else 1 ;if (u[0 ]>=0 )0 ;else 0 ;if (PRINT_DEBUG) System.err.println("u[0]=" +u[0 ]+"u[1]=" +u[1 ]+" u[2]=" +u[2 ]+" absu0=" +absu0+" w_mod=" +w_mod+" w_mod2=" +w_mod2);/* Solve the quadratic in order to obtain the roots if (mod_w1w2>0 )// a shorcut to reduce rounding error 8 )/mod_w1w2;0 ;else if (mod_w1w2_squared>0 )// regular path final double mqq8n=qq/(-8 )/mod_w1w2_squared;else // typically occur when qq==0 0 ;final double h = r4 * a;if (PRINT_DEBUG) System.err.println("w1_re=" +w1_re+" w1_im=" +w1_im+" w2_re=" +w2_re+" w2_im=" +w2_im+" w3_re=" +w3_re+" w3_im=" +w3_im+" h=" +h);0 ]=w1_re+w2_re+w3_re-h;0 ]=w1_im+w2_im+w3_im;1 ]=-(w1_re+w2_re)+w3_re-h;1 ]=-(w1_im+w2_im)+w3_im;2 ]=w2_re-w1_re-w3_re-h;2 ]=w2_im-w1_im-w3_im;3 ]=w1_re-w2_re-w3_re-h;3 ]=w1_im-w2_im-w3_im;return 4 ;static void setRandomP(final double [] p, final int n, Random r)if (r.nextDouble()<0 .1 )// integer coefficiens for (int j=0 ;j<p.length;j++)if (j<=n)2 )<=0 ?-1 :1 )*r.nextInt(10 );else 0 ;else // real coefficiens for (int j=0 ;j<p.length;j++)if (j<=n)1 +2 *r.nextDouble();else 0 ;if (Math.abs(p[n])<1 e-2 )2 )<=0 ?-1 :1 )*(0 .1 +r.nextDouble());static void checkValues(final double [] p,final int n,final double rex,final double imx,final double eps,final String txt)double res=0 ,ims=0 ,sabs=0 ;final double xabs=Math.abs(rex)+Math.abs(imx);for (int k=n;k>=0 ;k--)final double res1=(res*rex-ims*imx)+p[k];final double ims1=(ims*rex+res*imx);if (false && sabs>1 /eps?throw new RuntimeException("\n" +"\t x.r=" +rex+" x.i=" +imx+"\n" +"res/sabs=" +(res/sabs)+" ims/sabs=" +(ims/sabs)+" sabs=" +sabs+"\nres=" +res+" ims=" +ims+" n=" +n+" eps=" +eps+" " +" sabs>1/eps=" +(sabs>1 /eps)+" f1=" +(!(Math.abs(res/sabs)<=eps)||!(Math.abs(ims/sabs)<=eps))+" f2=" +(!(Math.abs(res)<=eps)||!(Math.abs(ims)<=eps))+" " +txt);static String getPolinomTXT(final double [] p)final StringBuilder buf=new StringBuilder();"order=" +(p.length-1 )+"\t" );for (int k=0 ;k<p.length;k++)"p[" +k+"]=" +p[k]+";" );return buf.toString();static String getRootsTXT(int nr,final double [] re,final double [] im)final StringBuilder buf=new StringBuilder();for (int k=0 ;k<nr;k++)"x." +k+"(" +re[k]+"," +im[k]+")\n" );return buf.toString();static void testRoots(final int n,final int n_tests,final Random rn,final double eps)final double [] p=new double [n+1 ];final double [] rex=new double [n],imx=new double [n];for (int i=0 ;i<n_tests;i++)for (int dg=n;dg-->-1 ;)for (int dr=3 ;dr-->0 ;)for (int j=0 ;j<=dg;j++)0 ;if (dr==0 )0 ]=-1 +2 .0 *rn.nextDouble();else if (dr==1 )0 ]=p[1 ]=0 ;for (int j=0 ;j<n;j++)//System.err.println("j="+j); " t=" +i);"testRoots(): n_tests=" +n_tests+" OK, dim=" +n);static final double EPS=0 ;public static int root1(final double [] p,final double [] re_root,final double [] im_root)if (!(Math.abs(p[1 ])>EPS))0 ]=im_root[0 ]=Double .NaN;return -1 ;0 ]=-p[0 ]/p[1 ];0 ]=0 ;return 1 ;public static int root2(final double [] p,final double [] re_root,final double [] im_root)if (!(Math.abs(p[2 ])>EPS))0 ]=re_root[1 ]=im_root[0 ]=im_root[1 ]=Double .NaN;return -1 ;final double b2=0 .5 *(p[1 ]/p[2 ]),c=p[0 ]/p[2 ],d=b2*b2-c;if (d>=0 )final double sq=Math.sqrt(d);if (b2<0 )1 ]=-b2+sq;0 ]=c/re_root[1 ];else if (b2>0 )0 ]=-b2-sq;1 ]=c/re_root[0 ];else 0 ]=-b2-sq;1 ]=-b2+sq;0 ]=im_root[1 ]=0 ;else final double sq=Math.sqrt(-d);0 ]=re_root[1 ]=-b2;0 ]=sq;1 ]=-sq;return 2 ;public static int root3(final double [] p,final double [] re_root,final double [] im_root)final double vs=p[3 ];if (!(Math.abs(vs)>EPS))0 ]=re_root[1 ]=re_root[2 ]=0 ]=im_root[1 ]=im_root[2 ]=Double .NaN;return -1 ;final double a=p[2 ]/vs,b=p[1 ]/vs,c=p[0 ]/vs;/* zsolve_cubic.c - finds the complex roots of x^3 + a x^2 + b x + c = 0 final double q = (a * a - 3 * b);final double r = (a*(2 * a * a - 9 * b) + 27 * c);final double Q = q / 9 ;final double R = r / 54 ;final double Q3 = Q * Q * Q;final double R2 = R * R;final double CR2 = 729 * r * r;final double CQ3 = 2916 * q * q * q;final double a3=a/3 ;if (R == 0 && Q == 0 )0 ]=re_root[1 ]=re_root[2 ]=-a3;0 ]=im_root[1 ]=im_root[2 ]=0 ;return 3 ;else if (CR2 == CQ3)/* this test is actually R2 == Q3, written in a form suitable /* Due to finite precision some double roots may be missed, and will be considered to be a pair of complex roots z = x +/- final double sqrtQ = Math.sqrt (Q);if (R > 0 )0 ] = -2 * sqrtQ - a3;1 ]=re_root[2 ]=sqrtQ - a3;0 ]=im_root[1 ]=im_root[2 ]=0 ;else 0 ]=re_root[1 ] = -sqrtQ - a3;2 ]=2 * sqrtQ - a3;0 ]=im_root[1 ]=im_root[2 ]=0 ;return 3 ;else if (R2 < Q3)final double sgnR = (R >= 0 ? 1 : -1 );final double ratio = sgnR * Math.sqrt (R2 / Q3);final double theta = Math.acos (ratio);final double norm = -2 * Math.sqrt (Q);final double r0 = norm * Math.cos (theta/3 ) - a3;final double r1 = norm * Math.cos ((theta + 2 .0 * Math.PI) / 3 ) - a3;final double r2 = norm * Math.cos ((theta - 2 .0 * Math.PI) / 3 ) - a3;0 ]=r0;1 ]=r1;2 ]=r2;0 ]=im_root[1 ]=im_root[2 ]=0 ;return 3 ;else final double sgnR = (R >= 0 ? 1 : -1 );final double A = -sgnR * Math.pow (Math.abs (R) + Math.sqrt (R2 - Q3), 1 .0 / 3 .0 );final double B = Q / A;0 ]=A + B - a3;0 ]=0 ;1 ]=-0 .5 * (A + B) - a3;1 ]=-(SQRT3*0 .5 ) * Math.abs(A - B);2 ]=re_root[1 ];2 ]=-im_root[1 ];return 3 ;static void root3a(final double [] p,final double [] re_root,final double [] im_root)if (Math.abs(p[3 ])>EPS)final double v=p[3 ],2 ]/v,b=p[1 ]/v,c=p[0 ]/v,3 ,a3a=a3*a,3 ,3 -0 .5 *b)+0 .5 *c,if (Q<0 )// three real roots final double SQ=Math.sqrt(-Q);final double th=Math.atan2(SQ,-qd2);0 ]=im_root[1 ]=im_root[2 ]=0 ;final double f=2 *Math.sqrt(-pd3);0 ]=f*Math.cos(th/3 )-a3;1 ]=f*Math.cos((th+2 *Math.PI)/3 )-a3;2 ]=f*Math.cos((th+4 *Math.PI)/3 )-a3;//System.err.println("3r"); else // one real & two complex roots final double SQ=Math.sqrt(Q);final double r1=-qd2+SQ,r2=-qd2-SQ;final double v1=Math.signum(r1)*Math.pow(Math.abs(r1),1 .0 /3 ),1 .0 /3 ),// real root 0 ]=sv-a3;0 ]=0 ;// complex roots 1 ]=re_root[2 ]=-0 .5 *sv-a3;1 ]=(v1-v2)*(SQRT3*0 .5 );2 ]=-im_root[1 ];//System.err.println("1r2c"); else 0 ]=re_root[1 ]=re_root[2 ]=im_root[0 ]=im_root[1 ]=im_root[2 ]=Double .NaN;static void printSpecialValues()for (int st=0 ;st<6 ;st++)//final double [] p=new double []{8,1,3,3.6,1}; final double [] re_root=new double [4 ],im_root=new double [4 ];final double [] p;final int n;if (st<=3 )if (st<=0 )new double []{2 ,-4 ,6 ,-4 ,1 };//p=new double []{-6,6,-6,8,-2}; else if (st==1 )new double []{0 ,-4 ,8 ,3 ,-9 };else if (st==2 )new double []{-1 ,0 ,2 ,0 ,-1 };else new double []{-5 ,2 ,8 ,-2 ,-3 };4 ;else new double []{0 ,2 ,0 ,1 };if (st==4 )1 ]=-p[1 ];3 ;"======== n=" +n);for (int i=0 ;i<=n;i++)if (i<n)"\t" +"\t" +"\t" +else "\t" +p[i]+"\t" );public static void main(final String [] args)if (System.getProperty("os.arch" ).equals("x86" ) ||"os.arch" ).equals("amd64" ) ||"os.arch" ).equals("x86_64" )){final long t0=System.currentTimeMillis();final double eps=1 e-6 ;//checkRoots(); final Random r = Utils.getRandomInstance();final int n_tests=100000 ;//testRoots(2,n_tests,r,eps); //testRoots(3,n_tests,r,eps); 4 ,n_tests,r,eps);final long t1=System.currentTimeMillis();"PolynomialRoot.main: " +n_tests+" tests OK done in " +(t1-t0)+" milliseconds. ver=$Id: PolynomialRoot.java,v 1.105 2012/08/18 00:00:05 mal Exp $" );"PASSED" );else {"PASS test for non-x86" );
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