2004-01-01 Richard B. Kreckel <kreckel@ginac.de>
* include/cln/univpoly.h, include/cln/univpoly_complex.h,
include/cln//univpoly_integer.h, include/cln/univpoly_modint.h,
include/cln/univpoly_rational.h, include/cln/univpoly_real.h,
src/polynomial/elem/cl_UP_GF2.h, src/polynomial/elem/cl_UP_MI.h,
src/polynomial/elem/cl_UP_gen.h, src/polynomial/elem/cl_UP_no_ring.cc,
src/polynomial/elem/cl_UP_number.h (ldegree): New function.
* doc/cln.tex: Document `ldegree'.
21 years ago |
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// Univariate Polynomials over the rational numbers.
#ifndef _CL_UNIVPOLY_RATIONAL_H
#define _CL_UNIVPOLY_RATIONAL_H
#include "cln/ring.h"
#include "cln/univpoly.h"
#include "cln/number.h"
#include "cln/rational_class.h"
#include "cln/integer_class.h"
#include "cln/rational_ring.h"
namespace cln {
// Normal univariate polynomials with stricter static typing:
// `cl_RA' instead of `cl_ring_element'.
#ifdef notyet
typedef cl_UP_specialized<cl_RA> cl_UP_RA;typedef cl_univpoly_specialized_ring<cl_RA> cl_univpoly_rational_ring;//typedef cl_heap_univpoly_specialized_ring<cl_RA> cl_heap_univpoly_rational_ring;
#else
class cl_heap_univpoly_rational_ring;
class cl_univpoly_rational_ring : public cl_univpoly_ring {public: // Default constructor.
cl_univpoly_rational_ring () : cl_univpoly_ring () {} // Copy constructor.
cl_univpoly_rational_ring (const cl_univpoly_rational_ring&); // Assignment operator.
cl_univpoly_rational_ring& operator= (const cl_univpoly_rational_ring&); // Automatic dereferencing.
cl_heap_univpoly_rational_ring* operator-> () const { return (cl_heap_univpoly_rational_ring*)heappointer; }};// Copy constructor and assignment operator.
CL_DEFINE_COPY_CONSTRUCTOR2(cl_univpoly_rational_ring,cl_univpoly_ring)CL_DEFINE_ASSIGNMENT_OPERATOR(cl_univpoly_rational_ring,cl_univpoly_rational_ring)
class cl_UP_RA : public cl_UP {public: const cl_univpoly_rational_ring& ring () const { return The(cl_univpoly_rational_ring)(_ring); } // Conversion.
CL_DEFINE_CONVERTER(cl_ring_element) // Destructive modification.
void set_coeff (uintL index, const cl_RA& y); void finalize(); // Evaluation.
const cl_RA operator() (const cl_RA& y) const;public: // Ability to place an object at a given address.
void* operator new (size_t size) { return malloc_hook(size); } void* operator new (size_t size, void* ptr) { (void)size; return ptr; } void operator delete (void* ptr) { free_hook(ptr); }};
class cl_heap_univpoly_rational_ring : public cl_heap_univpoly_ring { SUBCLASS_cl_heap_univpoly_ring() // High-level operations.
void fprint (std::ostream& stream, const cl_UP_RA& x) { cl_heap_univpoly_ring::fprint(stream,x); } bool equal (const cl_UP_RA& x, const cl_UP_RA& y) { return cl_heap_univpoly_ring::equal(x,y); } const cl_UP_RA zero () { return The2(cl_UP_RA)(cl_heap_univpoly_ring::zero()); } bool zerop (const cl_UP_RA& x) { return cl_heap_univpoly_ring::zerop(x); } const cl_UP_RA plus (const cl_UP_RA& x, const cl_UP_RA& y) { return The2(cl_UP_RA)(cl_heap_univpoly_ring::plus(x,y)); } const cl_UP_RA minus (const cl_UP_RA& x, const cl_UP_RA& y) { return The2(cl_UP_RA)(cl_heap_univpoly_ring::minus(x,y)); } const cl_UP_RA uminus (const cl_UP_RA& x) { return The2(cl_UP_RA)(cl_heap_univpoly_ring::uminus(x)); } const cl_UP_RA one () { return The2(cl_UP_RA)(cl_heap_univpoly_ring::one()); } const cl_UP_RA canonhom (const cl_I& x) { return The2(cl_UP_RA)(cl_heap_univpoly_ring::canonhom(x)); } const cl_UP_RA mul (const cl_UP_RA& x, const cl_UP_RA& y) { return The2(cl_UP_RA)(cl_heap_univpoly_ring::mul(x,y)); } const cl_UP_RA square (const cl_UP_RA& x) { return The2(cl_UP_RA)(cl_heap_univpoly_ring::square(x)); } const cl_UP_RA expt_pos (const cl_UP_RA& x, const cl_I& y) { return The2(cl_UP_RA)(cl_heap_univpoly_ring::expt_pos(x,y)); } const cl_UP_RA scalmul (const cl_RA& x, const cl_UP_RA& y) { return The2(cl_UP_RA)(cl_heap_univpoly_ring::scalmul(cl_ring_element(cl_RA_ring,x),y)); } sintL degree (const cl_UP_RA& x) { return cl_heap_univpoly_ring::degree(x); } sintL ldegree (const cl_UP_RA& x) { return cl_heap_univpoly_ring::ldegree(x); } const cl_UP_RA monomial (const cl_RA& x, uintL e) { return The2(cl_UP_RA)(cl_heap_univpoly_ring::monomial(cl_ring_element(cl_RA_ring,x),e)); } const cl_RA coeff (const cl_UP_RA& x, uintL index) { return The(cl_RA)(cl_heap_univpoly_ring::coeff(x,index)); } const cl_UP_RA create (sintL deg) { return The2(cl_UP_RA)(cl_heap_univpoly_ring::create(deg)); } void set_coeff (cl_UP_RA& x, uintL index, const cl_RA& y) { cl_heap_univpoly_ring::set_coeff(x,index,cl_ring_element(cl_RA_ring,y)); } void finalize (cl_UP_RA& x) { cl_heap_univpoly_ring::finalize(x); } const cl_RA eval (const cl_UP_RA& x, const cl_RA& y) { return The(cl_RA)(cl_heap_univpoly_ring::eval(x,cl_ring_element(cl_RA_ring,y))); }private: // No need for any constructors.
cl_heap_univpoly_rational_ring ();};
// Lookup of polynomial rings.
inline const cl_univpoly_rational_ring find_univpoly_ring (const cl_rational_ring& r){ return The(cl_univpoly_rational_ring) (find_univpoly_ring((const cl_ring&)r)); }inline const cl_univpoly_rational_ring find_univpoly_ring (const cl_rational_ring& r, const cl_symbol& varname){ return The(cl_univpoly_rational_ring) (find_univpoly_ring((const cl_ring&)r,varname)); }
// Operations on polynomials.
// Add.
inline const cl_UP_RA operator+ (const cl_UP_RA& x, const cl_UP_RA& y) { return x.ring()->plus(x,y); }
// Negate.
inline const cl_UP_RA operator- (const cl_UP_RA& x) { return x.ring()->uminus(x); }
// Subtract.
inline const cl_UP_RA operator- (const cl_UP_RA& x, const cl_UP_RA& y) { return x.ring()->minus(x,y); }
// Multiply.
inline const cl_UP_RA operator* (const cl_UP_RA& x, const cl_UP_RA& y) { return x.ring()->mul(x,y); }
// Squaring.
inline const cl_UP_RA square (const cl_UP_RA& x) { return x.ring()->square(x); }
// Exponentiation x^y, where y > 0.
inline const cl_UP_RA expt_pos (const cl_UP_RA& x, const cl_I& y) { return x.ring()->expt_pos(x,y); }
// Scalar multiplication.
#if 0 // less efficient
inline const cl_UP_RA operator* (const cl_I& x, const cl_UP_RA& y) { return y.ring()->mul(y.ring()->canonhom(x),y); }inline const cl_UP_RA operator* (const cl_UP_RA& x, const cl_I& y) { return x.ring()->mul(x.ring()->canonhom(y),x); }#endif
inline const cl_UP_RA operator* (const cl_I& x, const cl_UP_RA& y) { return y.ring()->scalmul(x,y); }inline const cl_UP_RA operator* (const cl_UP_RA& x, const cl_I& y) { return x.ring()->scalmul(y,x); }inline const cl_UP_RA operator* (const cl_RA& x, const cl_UP_RA& y) { return y.ring()->scalmul(x,y); }inline const cl_UP_RA operator* (const cl_UP_RA& x, const cl_RA& y) { return x.ring()->scalmul(y,x); }
// Coefficient.
inline const cl_RA coeff (const cl_UP_RA& x, uintL index) { return x.ring()->coeff(x,index); }
// Destructive modification.
inline void set_coeff (cl_UP_RA& x, uintL index, const cl_RA& y) { x.ring()->set_coeff(x,index,y); }inline void finalize (cl_UP_RA& x) { x.ring()->finalize(x); }inline void cl_UP_RA::set_coeff (uintL index, const cl_RA& y) { ring()->set_coeff(*this,index,y); }inline void cl_UP_RA::finalize () { ring()->finalize(*this); }
// Evaluation. (No extension of the base ring allowed here for now.)
inline const cl_RA cl_UP_RA::operator() (const cl_RA& y) const{ return ring()->eval(*this,y);}
// Derivative.
inline const cl_UP_RA deriv (const cl_UP_RA& x) { return The2(cl_UP_RA)(deriv((const cl_UP&)x)); }
#endif
// Returns the n-th Legendre polynomial (n >= 0).
extern const cl_UP_RA legendre (sintL n);
} // namespace cln
#endif /* _CL_UNIVPOLY_RATIONAL_H */
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