continueing on polynomials

2021-06-11 17:44:20 +02:00 · 2021-06-11 17:44:20 +02:00 · f03953ba2d
parent e57d8fde1c
commit f03953ba2d
3 changed files with 158 additions and 5 deletions
--- a/polynomial.cc
+++ b/polynomial.cc
@ -56,6 +56,94 @@ r.resize(rhs.degree()-1,true);
 }
 template <typename T>
 NRMat<T> Sylvester(const Polynomial<T> &p, const Polynomial<T> &q)
 {
 int nm=p.degree()+q.degree();
 NRMat<T> a(nm,nm);
 a.clear();
 for(int i=0; i<q.degree(); ++i)
 	for(int j=p.degree(); j>=0; --j)
 		a(i,i+p.degree()-j)=p[j];
 for(int i=0; i<p.degree(); ++i)
 	for(int j=q.degree(); j>=0; --j)
 		a(q.degree()+i,i+q.degree()-j)=q[j];
 return a;
 }
 template <typename T>
 NRMat<T> Polynomial<T>::companion() const
 {
 if((*this)[degree()]==(T)0) laerror("zero coefficient at highest degree - simplify first");
 NRMat<T> a(degree(),degree());
 a.clear();
 for(int i=0; i<degree(); ++i) a(degree()-1,i) = -(*this)[i];
 for(int i=0; i<degree()-1; ++i) a(i,i+1) = (*this)[degree()];
 return a;
 }
 template<>
 NRVec<typename LA_traits<int>::complextype> Polynomial<int>::roots() const
 {
 laerror("roots not implemented for integer polynomials");
 return NRVec<typename LA_traits<int>::complextype>(1);
 }
 template <typename T>
 NRVec<typename LA_traits<T>::complextype> Polynomial<T>::roots() const
 {
 NRMat<T> a=this->companion();
 NRVec<typename LA_traits<T>::complextype> r(degree());
 gdiagonalize(a,r,NULL,NULL);
 return r;
 }
 template <typename T>
 NRVec<T> Polynomial<T>::realroots(const typename LA_traits<T>::normtype thr) const
 {
 NRVec<typename LA_traits<T>::complextype> r = roots();
 NRVec<T> rr(degree());
 int nr=0;
 for(int i=0; i<degree(); ++i)
 	{
 	if(abs(r[i].imag())<thr)
 		{
 		rr[nr++] = r[i].real();
 		}
 	}
 rr.resize(nr,true);
 rr.sort();
 return rr;
 }
 template <typename T>
 Polynomial<T> lagrange_interpolation(const NRVec<T> &x, const NRVec<T> &y)
 {
 if(x.size()!=y.size()) laerror("vectors of different length in lagrange_interpolation");
 if(x.size()<1) laerror("empty vector in lagrange_interpolation");
 if(x.size()==1)
        {
        Polynomial<T> p(0);
        p[0]=y[0];
        return p;
        }
 int n=x.size()-1;
 Polynomial<T> p(n);
 p.clear();
 for(int i=0; i<=n; ++i)
        {
 	T prod=(T)1;
 	for(int j=0; j<=n; ++j) if(j!=i) prod *= (x[i]-x[j]);
 	if(prod==(T)0) laerror("repeated x-value in lagrange_interpolation");
 	Polynomial<T> tmp=polyfromroots(x,i);
 	p += tmp * y[i] / prod;
        }
 return p;
 }
 /***************************************************************************//**
 * forced instantization in the corresponding object file
 ******************************************************************************/
@ -64,10 +152,13 @@ template class Polynomial<double>;
 template class Polynomial<std::complex<double> >;
 #define INSTANTIZE(T) \
 template NRMat<T> Sylvester(const Polynomial<T> &p, const Polynomial<T> &q); \
 template Polynomial<T> lagrange_interpolation(const NRVec<T> &x, const NRVec<T> &y); \
-
+INSTANTIZE(int)
-//INSTANTIZE(double)
+INSTANTIZE(double)
 INSTANTIZE(std::complex<double>)
--- a/polynomial.h
+++ b/polynomial.h
@ -22,6 +22,7 @@
 #include "la_traits.h"
 #include "vec.h"
 #include "nonclass.h"
 namespace LA {
@ -78,6 +79,7 @@ public:
 		while(n>0 && abs((*this)[n])<thr) --n;
 		resize(n,true);
 		};
 	void normalize() {if((*this)[degree()]==(T)0) laerror("zero coefficient at highest degree - simplify first"); *this /= (*this)[degree()];};
 	Polynomial shifted(const int shift) const
 		{
 		if(shift==0) return *this;
@ -127,9 +129,11 @@ public:
 	void polydiv(const Polynomial &rhs, Polynomial &q, Polynomial &r) const;
 	Polynomial operator/(const Polynomial &rhs) const {Polynomial q,r; polydiv(rhs,q,r); return q;};
 	Polynomial operator%(const Polynomial &rhs) const {Polynomial q,r; polydiv(rhs,q,r); return r;};
 	NRMat<T> companion() const; //matrix which has this characteristic polynomial
 	NRVec<typename LA_traits<T>::complextype> roots() const; //implemented for complex<double> and double only
 	NRVec<T> realroots(const typename LA_traits<T>::normtype thr) const;
-	//gcd, lcm
+	//@@@gcd, lcm  euler and svd  
 	//roots, interpolation ... special only for real->complex - declare only and implent only template specialization  in .cc
 };
@ -148,12 +152,43 @@ sum += p[0];
 return sum;
 }
 template <typename T, typename C>
 NRVec<C> values(const Polynomial<T> &p, const NRVec<C> &x)
 {
 NRVec<C> r(x.size());
 for(int i=0; i<x.size(); ++i) r[i]=value(p,x[i]);
 return r;
 }
 //scalar+-polynomial
 template <typename T>
 inline Polynomial<T> operator+(const T &a, const Polynomial<T> &rhs) {return Polynomial<T>(rhs)+=a;}
 template <typename T>
 inline Polynomial<T> operator-(const T &a, const Polynomial<T> &rhs) {return Polynomial<T>(rhs)-=a;}
 //Sylvester matrix
 template <typename T>
 extern NRMat<T> Sylvester(const Polynomial<T> &p, const Polynomial<T> &q);
 //polynomial from given roots
 template <typename T>
 Polynomial<T> polyfromroots(const NRVec<T> &roots, const int skip= -1)
 {
 Polynomial<T> p(0);
 p[0]=(T)1;
 for(int i=0; i<roots.size(); ++i) 
    if(i!=skip)
 	p = p.shifted(1) - p * roots[i];
 return p;
 }
 template <typename T>
 extern Polynomial<T> lagrange_interpolation(const NRVec<T> &x, const NRVec<T> &y);
 }//namespace
 #endif
--- a/t.cc
+++ b/t.cc
@ -2167,7 +2167,7 @@ cout <<Sn;
 if(!Sn.is_valid()) laerror("internal error in Sn character calculation");
 }
-if(1)
+if(0)
 {
 int n,m;
 double x;
@ -2187,6 +2187,8 @@ Polynomial<double> z=value(p,q); //p(q(x))
 Polynomial<double> y=value(q,p); 
 cout <<p;
 cout <<q;
 cout <<q.companion();
 cout<<Sylvester(p,q);
 cout <<a;
 cout <<b;
 cout <<r;
@ -2201,5 +2203,30 @@ cout << (value(p,u)*value(q,u) -value(r,u)).norm()<<endl;
 }
 if(0)
 {
 int n;
 cin >>n ;
 NRVec<double> r(n);
 r.randomize(1.);
 r.sort(0);
 Polynomial<double> p=polyfromroots(r);
 cout <<p;
 cout <<r;
 cout <<p.realroots(1e-10);
 }
 if(1)
 {
 int n;
 cin >>n ;
 NRVec<double> x(n+1),y(n+1);
 x.randomize(1.);
 y.randomize(1.);
 Polynomial<double> p=lagrange_interpolation(x,y);
 cout <<x<<y<<p;
 NRVec<double> yy=values(p,x);
 cout<<"interpolation error= "<<(y-yy).norm()<<endl;
 }
 }