/*
* Use Sturm sequences to isolate polynomial roots.
* A Sturm sequence for a polynomial a(x) is any sequence of polynomials
* a[0](x),...,a[n](x) with
* a[0](x)=a(x)
* a[1](x)=a'(x)
* a[i+2](x)=(a[i+1](x)*q[i+1](x)-b[i]*a[i](x))/c[i]
* where b[i] and c[i] are positive real numbers, and degree(a[n](x))==0.
*
* Note:
* a[i+2](x)=-a[i](x) mod a[i+1](x)
* (where p(x) mod q(x) is the remainder after `synthetic division')
* works just fine and minimizes n.
*
* Now, we can define
* schange(a, x)
* to be the number of times that the sign of the sequence a[i](x) changes from +
* to - or vice versa (ignoring zero terms.)
* Sturm's theorem is that if a(x) is square-free, the number of real zeros
* of a(x) on the interval (x0,x1] is schange(a, x0)-schange(a, x1).
*/
#include "art.h"
#define DEGREE 5
Flt rem[DEGREE+1][DEGREE+1];
int Drem[DEGREE+1];
int nrem;
Flt quo[DEGREE+1][DEGREE+1];
int Dquo[DEGREE+1];
Flt evalrem(), evalquo();
Flt lastroot=-1;
int simple;
int nroot, nhard;
#include <sys/types.h>
#include <sys/times.h>
time_t treg;
struct tms areg, breg;
/*
* Find the all roots of a(x) on [0,1].
* Return number of roots.
* Method:
* 1) compute a Sturm sequence for a(x)
* 2) use Newton iteration starting at the root saved from the last
* invocation to find a root. The Sturm sequence can verify that
* it's the correct root.
* 3) If that doesn't get the root, use the Sturm sequence to direct
* binary subdivision to isolate the smallest root on the interval.
* 4) Having bracketed the root, use a hybrid Newton/Regula Falsi iteration
* to home in on the root.
*/
Flt *root;
int roots(Flt a[], int adeg, Flt r[]){
Flt x0, x1, x, y0, y1, y, d;
register n0, n1, n;
/*
* get the Sturm sequence of a
*/
for(n=0;n<=adeg;n++) rem[0][n]=a[n];
Drem[0]=adeg;
for(;;){
for(n=1;n<=Drem[0];n++)
rem[1][n-1]=n*rem[0][n];
Drem[1]=Drem[0]-1;
simple=1;
for(nrem=1;Drem[nrem]!=0;nrem++){
polydivnrem(rem[nrem-1], Drem[nrem-1],
rem[nrem], Drem[nrem],
quo[nrem], &Dquo[nrem],
rem[nrem+1], &Drem[nrem+1]);
if(Dquo[nrem]!=1) simple=0;
}
/*
* If the rem[n] is zero, a is not square-free, and
* rem[n-1] is gcd(a, a'). In that case, dividing
* rem[0] by rem[n-1] will reduce the multiplicities
* of all roots to 1, and we can go back and try again.
*/
if(rem[nrem][0]!=0) break;
Drem[0]=polydiv(rem[0], Drem[0], rem[nrem-1], Drem[nrem-1],
rem[0]);
}
/*
* Isolate all roots between 0 and 1
*/
root=r;
isolate(0., schange(0.), 1., schange(1.));
return root-r;
}
void isolate(Flt x0, int n0, Flt x1, int n1){
Flt x;
int n;
while(n0-n1>1){
x=.5*(x0+x1);
n=schange(x);
isolate(x0, n0, x, n);
x0=x;
n0=n;
}
if(n0==n1) return;
/*
* iterate to the root
*/
y0=evalrem(0, x0);
if(fabs(y0)<EPS) return; /* this root counted in other subdivision */
y1=evalrem(0, x1);
if(fabs(y1)<EPS){
*root++=x1;
return;
}
if(y0*y1>=0){
msg("Root not bracketed x0=%g, y0=%g, x1=%g, y1=%g", x0, y0, x1, y1);
return;
}
/*
* Pegasus iteration
*/
x=x0;
y=y0;
while(fabs(x1-x0)>EPS){
x=x0-y0*(x1-x0)/(y1-y0);
y=evalrem(0, x);
if(fabs(y)<EPS){
*root++=x;
return;
}
if(y*y0<=0.){
x1=x0;
y1=y0;
}
else
y1 *= y0/(y0+y);
x0=x;
y0=y;
}
*root++=x0-y0*(x1-x0)/(y1-y0);
}
/*
* r=-a mod b
* q=a/b
*/
polydivnrem(a, adeg, b, bdeg, q, qdeg, r, rdeg)
Flt a[], b[], q[], r[];
int *rdeg, *qdeg;
{
register Flt *rp, *erp;
polydivrem(a, adeg, b, bdeg, q, qdeg, r, rdeg);
erp=&r[*rdeg];
for(rp=r;rp<=erp;rp++) *rp=-*rp;
}
/*
* q=a/b
*/
polydiv(a, adeg, b, bdeg, q)
Flt a[], b[], q[];
{
Flt r[DEGREE+1], tq[DEGREE+1];
int rdeg, qdeg;
register Flt *qp, *tqp, *eqp;
polydivrem(a, adeg, b, bdeg, tq, &qdeg, r, &rdeg);
eqp=&q[qdeg];
for(qp=q,tqp=tq;qp<=eqp;) *qp++=*tqp++;
return qdeg;
}
/*
* polynomial division of a by b.
* quotient in q, remainder in r.
*/
polydivrem(a, adeg, b, bdeg, q, qdeg, r, rdeg)
Flt a[], b[], q[], r[];
int adeg, bdeg, *qdeg, *rdeg;
{
Flt quot;
register i, qterm, rterm;
while(adeg>0 && a[adeg]==0.) --adeg;
while(bdeg>0 && b[bdeg]==0.) --bdeg;
for(i=0;i<=adeg;i++) r[i]=a[i];
rterm=adeg;
qterm=adeg-bdeg;
*qdeg=qterm;
while(rterm>=bdeg){
quot=q[qterm]=r[rterm]/b[bdeg];
for(i=0;i<=bdeg;i++)
r[qterm+i]-=b[i]*quot;
--qterm;
--rterm;
while(rterm>0 && r[rterm]==0) --rterm;
}
*rdeg=rterm;
}
ppoly(poly, n)
Flt *poly;
{
register plus=0, i;
for(i=n;i>=0;--i) if(poly[i]!=0){
if(plus){
if(poly[i]>=0) putchar('+');
}
else plus++;
if(poly[i]==-1 && i!=0) putchar('-');
else if(poly[i]!=1 || i==0) printf("%.20g", poly[i]);
switch(i){
default: printf("x^%d", i); break;
case 1: putchar('x'); break;
case 0: break;
}
}
if(!plus) putchar('0');
putchar('\n');
}
/*
* Use Horner's rule to evaluate rem[n] at x
*/
Flt evalrem(n, x)
Flt x;
{
register Flt *d, *d0=&rem[n][0];
register Flt f=0;
for(d=d0+Drem[n];d>=d0;--d) f=f*x+*d;
return f;
}
/*
* Use Horner's rule to evaluate quo[n] at x
*/
Flt evalquo(n, x)
Flt x;
{
register Flt *d, *d0=&quo[n][0];
register Flt f=0;
for(d=d0+Dquo[n];d>=d0;--d) f=f*x+*d;
return f;
}
/*
* Count Sturm sequence sign changes at x
*/
schange(x)
Flt x;
{
register i, n=0;
register Flt rip1, ri, rim1;
rip1=evalrem(nrem, x);
ri=evalrem(nrem-1, x);
if(simple){
for(i=nrem-1;i!=0;--i){
if(rip1!=0) if(rip1<0?ri>0:ri<0) n++;
rim1=ri*(quo[i][0]+x*quo[i][1])-rip1;
rip1=ri;
ri=rim1;
}
}
else{
for(i=nrem-1;i!=0;--i){
if(rip1!=0) if(rip1<0?ri>0:ri<0) n++;
rim1=ri*evalquo(i, x)-rip1;
rip1=ri;
ri=rim1;
}
}
if(rip1!=0) if(rip1<0?ri>0:ri<0) n++;
return n;
}
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