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// =================================================================== //
// Copyright(c)'1994-2009 by The Givaro group
// This file is part of Givaro.
// Givaro is governed by the CeCILL-B license under French law
// and abiding by the rules of distribution of free software.
// see the COPYRIGHT file for more details.
// Givaro / Athapascan-1
// Irreducible polynomial finder
// Primitive root finder
// Time-stamp: <10 Jul 07 15:31:18 Jean-Guillaume.Dumas@imag.fr>
// =================================================================== //
#ifndef __GIVARO_poly_primitive_root_INL
#define __GIVARO_poly_primitive_root_INL

// Reasonible cyclotomic polynomial size
#define CYCLO_DEGREE_BOUND 1000
#define CYCLO_TIMES_FACTOR 8

#include <stdlib.h>
#include <list>
#include <vector>
#include <givaro/givinteger.h>
#include <givaro/givintnumtheo.h>
#include <givaro/givdegree.h>
#include <givaro/givpoly1factor.h>
#include <givaro/givpoly1cyclo.inl>

namespace Givaro {

	////////////////////////////////////////////
	// BINOM
	////////////////////////////////////////////

	template<class Domain, class Tag, class RandomIterator >
	template<class Residue>
	inline bool Poly1FactorDom<Domain,Tag, RandomIterator>::find_irred_binomial (Element& R, Degree n, Residue MOD) const
	{
		for(Residue a=0; a<MOD; ++a) {
			_domain.assign(R[0],(Type_t)a);
			if (is_irreducible(R))
				return true;
		}
		return false;
	}

	template<class Domain, class Tag, class RandomIterator >
	// template<>
	inline bool Poly1FactorDom<Domain,Tag, RandomIterator>::find_irred_binomial (Element& R, Degree n, bool MOD) const
	{
		return false;
	}

	template<class Domain, class Tag, class RandomIterator >
	template<class Residue>
	inline bool Poly1FactorDom<Domain,Tag, RandomIterator>::find_irred_binomial (Element& R, Degree n, Residue MOD, Element IXE) const
	{
		for(Residu_t a=0; a<MOD; ++a) {
			_domain.assign(R[0],static_cast<Element_t>(a));
			if (is_irreducible(R) && (is_prim_root(IXE,R) ))
				return true;
		}

		return false;
	}

	template<class Domain, class Tag, class RandomIterator >
	// template<>
	inline bool Poly1FactorDom<Domain,Tag, RandomIterator>::find_irred_binomial (Element& R, Degree n, bool MOD, Element IXE) const
	{
		return false;
	}


	template<class Domain, class Tag, class RandomIterator >
	template<class Residue>
	inline bool Poly1FactorDom<Domain,Tag, RandomIterator>::find_irred_binomial2 (Element& R, Degree n, Residue MOD, Element IXE) const
	{
		for(Residu_t a=0; a<MOD; ++a) {
			_domain.assign(R[0],(Element_t)a);
			if (is_irreducible2(R) && (is_prim_root(IXE,R) ))
				return true;
		}

		return false;
	}

	template<class Domain, class Tag, class RandomIterator >
	// template<>
	inline bool Poly1FactorDom<Domain,Tag, RandomIterator>::find_irred_binomial2 (Element& R, Degree n, bool MOD, Element IXE) const
	{
		return false;
	}

	////////////////////////////////////////////
	// TRINOM
	////////////////////////////////////////////

	template<class Domain, class Tag, class RandomIterator >
	template<class Residue>
	inline bool Poly1FactorDom<Domain,Tag, RandomIterator>::find_irred_trinomial (Element& R, Degree n, Residue MOD) const
	{

		for(long d=1;d<=(n.value()/2);++d) {
			for(Residu_t b=0; b<MOD; ++b) {
				_domain.assign(R[(size_t)d],(Type_t)b);
				for(Residu_t a=1; a<MOD; ++a) {
					_domain.assign(R[0],(Type_t)a);
					if (is_irreducible(R))
						return true;
				}
			}
			// _domain.assign(R[0],_domain.zero);
			// JGD 21.10.02
			_domain.assign(R[(size_t)d],_domain.zero);
		}
		return false ;
	}

	template<class Domain, class Tag, class RandomIterator >
	// template<>
	inline bool Poly1FactorDom<Domain,Tag, RandomIterator>::find_irred_trinomial (Element& R, Degree n, bool MOD) const
	{

		_domain.assign(R[0],_domain.one);
		for(long d=1;d<=(n.value()/2);++d) {
			_domain.assign(R[(size_t)d],_domain.one);
			if (is_irreducible(R))
				return true;
			_domain.assign(R[(size_t)d],_domain.zero);
		}
		return false ;
	}

	template<class Domain, class Tag, class RandomIterator >
	template<class Residue>
	inline bool Poly1FactorDom<Domain,Tag, RandomIterator>::find_irred_trinomial (Element& R, Degree n, Residue MOD, Element IXE) const
	{
		for(long d=2;d<=(n.value()/2);++d) {
			for(Residu_t b=0; b<MOD; ++b) {
				_domain.assign(R[(size_t)d],(Element_t)b);
				for(Residu_t a=1; a<MOD; ++a) {
					_domain.assign(R[0],(Element_t)a);
					if (is_irreducible(R) && (is_prim_root(IXE,R) ))
						return true;
				}
			}
			// _domain.assign(R[0],_domain.zero);
			// JGD 21.10.02
			_domain.assign(R[(size_t)d],_domain.zero);
		}
		return false;
	}

	template<class Domain, class Tag, class RandomIterator >
	// template<>
	inline bool Poly1FactorDom<Domain,Tag, RandomIterator>::find_irred_trinomial (Element& R, Degree n, bool MOD, Element IXE) const
	{

		_domain.assign(R[0],_domain.one);
		for(long d=2;d<=(n.value()/2);++d) {
			_domain.assign(R[(size_t)d],_domain.one);
			if (is_irreducible(R) && (is_prim_root(IXE,R) ))
				return true;
			_domain.assign(R[(size_t)d],_domain.zero);
		}
		return false ;
	}

	template<class Domain, class Tag, class RandomIterator >
	template<class Residue>
	inline bool Poly1FactorDom<Domain,Tag, RandomIterator>::find_irred_trinomial2 (Element& R, Degree n, Residue MOD, Element IXE) const
	{
		for(long d=2;d<n.value();++d) {
			for(Residu_t b=0; b<MOD; ++b) {
				_domain.assign(R[(size_t)d],(Element_t)b);
				for(Residu_t a=1; a<MOD; ++a) {
					_domain.assign(R[0],(Element_t)a);
					if (is_irreducible2(R) && (is_prim_root(IXE,R) ))
						return true;
				}
			}
			_domain.assign(R[0],_domain.zero);
		}
		return false;

	}

	template<class Domain, class Tag, class RandomIterator >
	// template<>
	inline bool Poly1FactorDom<Domain,Tag, RandomIterator>::find_irred_trinomial2 (Element& R, Degree n, bool MOD, Element IXE) const
	{

		_domain.assign(R[0],_domain.one);
		for(long d=2;d<=n.value();++d) {
			_domain.assign(R[(size_t)d],_domain.one);
			if (is_irreducible2(R) && (is_prim_root(IXE,R) ))
				return true;
			_domain.assign(R[(size_t)d],_domain.zero);
		}
		return false ;
	}

	////////////////////////////////////////////
	// RANDOM
	////////////////////////////////////////////
	template<class Domain, class Tag, class RandomIterator >
	template<class Residue>
	inline bool Poly1FactorDom<Domain,Tag, RandomIterator>::find_irred_randomial (Element& R, Degree n, Residue MOD) const
	{
#ifdef INFLOOPDEBUG
		int no_inf_loop =(int) n.value()/2+5 ;
#endif

		do {
			this->random( (RandomIterator&)_g, R, n); // must cast away const
			_domain.assign(R[(size_t)n.value()],_domain.one);
			for(Residu_t a=0; a<MOD; ++a) {
				_domain.assign(R[0],(Type_t)a);
				if (is_irreducible(R))
					return true;
			}
		}
#ifdef INFLOOPDEBUG
		while(--no_inf_loop);
#else
		while(1);
#endif

		return false;
	}

	template<class Domain, class Tag, class RandomIterator >
	// template<>
	inline bool Poly1FactorDom<Domain,Tag, RandomIterator>::find_irred_randomial (Element& R, Degree n, bool MOD) const
	{
#ifdef INFLOOPDEBUG
		int no_inf_loop = n.value()/2+5 ;
#endif

		do {
			this->random( (RandomIterator&)_g, R, n); // must cast away const
			_domain.assign(R[(size_t)n.value()],_domain.one);
			_domain.assign(R[0],_domain.one);
			if (is_irreducible(R))
				return true;
		}
#ifdef INFLOOPDEBUG
		while(--no_inf_loop);
#else
		while(1);
#endif

		return false;
	}

	template<class Domain, class Tag, class RandomIterator >
	template<class Residue>
	inline bool Poly1FactorDom<Domain,Tag, RandomIterator>::find_irred_randomial (Element& R, Degree n, Residue MOD, Element IXE) const
	{
#ifdef INFLOOPDEBUG
		int no_inf_loop = (int)n.value()/2+5 ;
#endif
		do {
			this->random( (RandomIterator&)_g, R, n); // must cast away const
			_domain.assign(R[(size_t)n.value()],_domain.one);
			for(Residu_t a=0; a<MOD; ++a) {
				_domain.assign(R[0],(Element_t)a);
				if (is_irreducible(R) && (is_prim_root(IXE,R) ))
					return true;
			}
		}
#ifdef INFLOOPDEBUG
		while(--no_inf_loop);
#else
		while(1);
#endif

		return false;
	}

	template<class Domain, class Tag, class RandomIterator >
	// template<>
	inline bool Poly1FactorDom<Domain,Tag, RandomIterator>::find_irred_randomial (Element& R, Degree n, bool MOD, Element IXE) const
	{
#ifdef INFLOOPDEBUG
		int no_inf_loop = n.value()/2+5 ;
#endif

		do {
			this->random( (RandomIterator&)_g, R, n); // must cast away const
			_domain.assign(R[(size_t)n.value()],_domain.one);
			_domain.assign(R[0],_domain.one);
			if (is_irreducible(R) && (is_prim_root(IXE,R) ))
				return true;
		}
#ifdef INFLOOPDEBUG
		while(--no_inf_loop);
#else
		while(1);
#endif

		return false;
	}

	template<class Domain, class Tag, class RandomIterator >
	template<class Residue>
	inline bool Poly1FactorDom<Domain,Tag, RandomIterator>::find_irred_randomial2 (Element& R, Degree n, Residue MOD, Element IXE) const
	{
#ifdef INFLOOPDEBUG
		int no_inf_loop = n.value()/2+5 ;
#endif
		do {
			this->random( (RandomIterator&)_g, R, n); // must cast away const
			_domain.assign(R[(size_t)n.value()],_domain.one);
			for(Residu_t a=0; a<MOD; ++a) {
				_domain.assign(R[0],(Element_t)a);
				if (is_irreducible2(R) && (is_prim_root(IXE,R) ))
					return true;
			}
		}
#ifdef INFLOOPDEBUG
		while(--no_inf_loop);
#else
		while(1);
#endif

		return false;
	}

	template<class Domain, class Tag, class RandomIterator >
	// template<>
	inline bool Poly1FactorDom<Domain,Tag, RandomIterator>::find_irred_randomial2 (Element& R, Degree n, bool MOD, Element IXE) const
	{
#ifdef INFLOOPDEBUG
		int no_inf_loop = n.value()/2+5 ;
#endif
		do {
			this->random( (RandomIterator&)_g, R, n); // must cast away const
			_domain.assign(R[(size_t)n.value()],_domain.one);
			_domain.assign(R[0],_domain.one);
			if (is_irreducible2(R) && (is_prim_root(IXE,R) ))
				return true;
		}
#ifdef INFLOOPDEBUG
		while(--no_inf_loop);
#else
		while(1);
#endif
		return false;

	}

	////////////////////////////////////////////


	// ---------------------------------------------------------------
	// Monic irreducible polynomial of degree n over Z/pZ
	// having 2, 3 nonzero terms or dividing a cyclotomic polynomial
	// of degree < CYCLO_DEGREE_BOUND or a random one.
	// ---------------------------------------------------------------

	template<class Domain, class Tag, class RandomIterator >
	inline typename Poly1FactorDom<Domain,Tag, RandomIterator>::Element& Poly1FactorDom<Domain,Tag, RandomIterator>::creux_random_irreducible (Element& R, Degree n) const
	{
		this->init(R, n);

		Residu_t MOD = _domain.residu();


		// Search for an irreducible BINOMIAL : X^n + a
		// WARNING : Here we may have X^n + x,
		// where a = representation of x, and sometimes a != x.
		if (find_irred_binomial(R,n,MOD))
		    return R ;

		// Search for an irreducible TRINOMIAL : X^n + b*X^i + a
		// Precondition : n >= 2
		assert(n.value()>=2);
		// WARNING : same warning as for the binomial.
		// JGD 21.10.02
		// for(Residu_t d=2;d<n.value();++d)

		if (find_irred_trinomial(R,n,MOD))
			return R ;

		// Search for a monic irreducible Polynomial
		// with random Elements

		if (find_irred_randomial(R,n,MOD))
			return R ;
		else
			throw "could not find a random polynomial" ;

	}

	template<class Domain, class Tag, class RandomIterator >
	inline typename Poly1FactorDom<Domain,Tag, RandomIterator>::Element& Poly1FactorDom<Domain,Tag, RandomIterator>::random_irreducible (Element& R, Degree n) const
	{
		// Search for a monic irreducible Polynomial
		// with random Elements
		this->init(R, n);
		Residu_t MOD = _domain.residu();

		if (find_irred_randomial(R,n,MOD))
			return R ;
		else
			throw "could not find a random polynomial" ;

	}


	// ---------------------------------------------------------------
	// Monic irreducible polynomial of degree n over Z/pZ
	// having 2, 3 nonzero terms or or a random one,
	// with X as a primitive root.
	// ---------------------------------------------------------------
	template<class Domain, class Tag, class RandomIterator >
	inline typename Poly1FactorDom<Domain,Tag, RandomIterator>::Element& Poly1FactorDom<Domain,Tag, RandomIterator>::ixe_irreducible (Element& R, Degree n) const
	{
		this->init(R, n);
		Element IXE;
		this->init(IXE,Degree(1));
		Residu_t MOD = _domain.residu();

		// Search for an irreducible BINOMIAL : X^n + a
		// WARNING : Here we may have X^n + x,
		// where a = representation of x, and sometimes a != x.

		if (find_irred_binomial(R,n,MOD,IXE))
		    return R ;

		// Search for an irreducible TRINOMIAL : X^n + b*X^i + a
		// Precondition : n >= 2
		assert(n.value()>=2);
		// WARNING : same warning as for the binomial.
		// // JGD 21.10.02
		// for(unsigned long d=2;d<n.value();++d)

		if (find_irred_trinomial(R,n,MOD,IXE))
			return R ;


		// Search for a monic irreducible Polynomial
		// with random Elements
		if (find_irred_randomial(R,n,MOD,IXE))
			return R ;
		else
			throw "could not find a random polynomial" ;


	}

	template<class Domain, class Tag, class RandomIterator >
	inline typename Poly1FactorDom<Domain,Tag, RandomIterator>::Element& Poly1FactorDom<Domain,Tag, RandomIterator>::ixe_irreducible2 (Element& R, Degree n) const
	{
		this->init(R, n);
		Element IXE;
		this->init(IXE,Degree(1));
		Residu_t MOD = _domain.residu();

		// Search for an irreducible BINOMIAL : X^n + a
		// WARNING : Here we may have X^n + x,
		// where a = representation of x, and sometimes a != x.

		if (find_irred_binomial2(R,n,MOD,IXE))
			return R ;

		// Search for an irreducible TRINOMIAL : X^n + b*X^i + a
		// Precondition : n >= 2
		assert(n.value()>=2);
		// WARNING : same warning as for the binomial.

		if (find_irred_trinomial2(R,n,MOD,IXE))
			return R ;



		// Search for a monic irreducible Polynomial
		// with random Elements

		if (find_irred_randomial2(R,n,MOD,IXE))
			return R ;
		else
			throw "could not find a random polynomial" ;


	}
	// ---------------------------------------------------------------
	// Irreducibility tests
	// ---------------------------------------------------------------

	template<class Domain, class Tag, class RandomIterator>
	inline bool Poly1FactorDom<Domain,Tag, RandomIterator>::is_irreducible2( const Rep& P
									  , Residu_t MOD ) const
	{
		// Square free ?
		Rep W,D; this->gcd(W,diff(D,P),P);
		Degree d, dP;
		if (this->degree(d,W) > 0) return 0;
		IntFactorDom<> FD;

		int64_t n = this->degree(dP,P).value();
		IntFactorDom<>::Rep qn;

		FD.pow( qn, IntFactorDom<>::Rep(MOD), n);
		Rep Unit, G1; this->init(Unit, Degree(1));
		this->powmod(G1, Unit, qn, P);
		if (this->degree(d, sub(D,G1,Unit)) >= 0) return 0;

		std::vector<IntFactorDom<>::Rep> Lp; std::vector<uint64_t> Le;
		FD.set(Lp, Le, n );
		for( std::vector<IntFactorDom<>::Rep>::const_iterator p = Lp.begin(); p != Lp.end(); ++p) {
			int64_t ttmp;
			FD.pow( qn, IntFactorDom<>::Rep(MOD), n/FD.convert(ttmp,*p) );
			this->powmod(G1, Unit, qn, P);
			if (this->degree(d, sub(D,G1,Unit)) < 0) return 0;
		}

		return 1;
	}




	// ---------------------------------------------------------------
	// Primitive Root over Z/pZ / F
	// returns 1 if P is a generator.
	// ---------------------------------------------------------------

	template<class Domain, class Tag, class RandomIterator>
	bool Poly1FactorDom<Domain,Tag, RandomIterator>::is_prim_root( const Rep& P, const Rep& F)  const
	{
		bool isproot = 0;
		Rep A, G;
		this->mod(A,P,F);
		Degree d;
		if ( this->degree(d, this->gcd(G,A,F)) == 0) {
			Residu_t MOD = _domain.residu();
			IntFactorDom<> FD;
			IntFactorDom<>::Element IMOD( MOD ), q, qp;
			this->degree(d,F);
			//         FD.pow(q ,IMOD, d.value());
			//         FD.sub(qp, q, FD.one);
			FD.subin( FD.pow(qp ,IMOD, d.value()) , FD.one);
			std::list< IntFactorDom<>::Element > L;
			FD.set(L, qp);
			L.sort();
			std::list< IntFactorDom<>::Element >::iterator li = L.begin();
			isproot = 1;
			for(;(li != L.end()) && isproot; ++li) {
				isproot = ( ! this->isOne(this->powmod(G, A, FD.div(q, qp , *li), F) ) );
			}
		}
		return isproot;
	}

	template<class Domain, class Tag, class RandomIterator>
	inline typename IntegerDom::Element Poly1FactorDom<Domain,Tag, RandomIterator>::order( const Rep& P, const Rep& F)  const
	{
		bool isproot = 0;
		Rep A, G; mod(A,P,F);
		Degree d;
		if ( this->degree(d, this->gcd(G,A,F)) == 0) {
			Residu_t MOD = _domain.residu();
			IntFactorDom<> FD;
			IntFactorDom<>::Element IMOD( MOD ), g, gg, tt, qp;
			this->degree(d,F);
			//         FD.pow(q ,IMOD, d.value());
			//         FD.sub(qp, q, FD.one);
			FD.subin( FD.pow(qp ,IMOD, d.value()) , FD.one);
			std::list< IntFactorDom<>::Element > L;
			FD.set(L, qp);
			L.sort();
			std::list< IntFactorDom<>::Element >::iterator li = L.begin();
			isproot = 1;
			for(;(li != L.end()) && isproot; ++li)
				isproot = ( ! this->isOne(this->powmod(G, A, FD.div(g, qp , *li), F) ) );

			if (isproot)
				return qp;
			else {
				for(--li;li!=L.end();++li)
					while ( FD.isZero(FD.mod(tt,g,*li)) && (this->isOne(this->powmod(G, A, FD.div(gg,g,*li), F))))
						g.copy(gg);
				return g;
			}
		}
		IntegerDom ID;
		return ID.zero;
	}

	template<class Domain, class Tag, class RandomIterator >
	inline typename Poly1FactorDom<Domain,Tag, RandomIterator>::Rep& Poly1FactorDom<Domain,Tag, RandomIterator>::give_prim_root(Rep& R, const Rep& F)  const
	{
		Degree n; this->degree(n,F);
		Residu_t MOD = _domain.residu();
		//    this->write(std::cout << "Give Pr: ", F) << std::endl;


		// Search for a primitive BINOMIAL : X^i + a
		for(Degree di=1;di<n;++di) {
			this->init(R, di);
			//         for(Residu_t a=MOD; a--; )
			for(Residu_t a=0; a<MOD;++a ) {
				_domain.assign(R[0],(Element_t)a);
				if (is_prim_root(R,F))
					return R;
			}
		}
		// Search for a primitive TRINOMIAL : X^i + b*X^j + a
		for(Degree di=2;di<n;++di) {
			this->init(R, di);
			for(Degree dj=1;dj<di;++dj)
				//             for(Residu_t b=MOD; b--;)
				for(Residu_t b=0; b<MOD;++b) {
					_domain.assign(R[(size_t)dj.value()],(Element_t)b);
					//                 for(Residu_t a=MOD; a--;)
					for(Residu_t a=0; a<MOD;++a ) {
						_domain.assign(R[0],(Element_t)a);
						if (is_prim_root(R,F))
							return R;
					}
				}
		}

		// Search for a primitive Polynomial
		// with random Elements
		do {
			this->random( (RandomIterator&)_g, R, n); // must cast away const
			_domain.assign(R[(size_t)n.value()],_domain.one);
			for(Residu_t a=0; a<MOD; ++a) {
				_domain.assign(R[0],(Element_t)a);
				if (is_prim_root(R,F))
					return R;
			}
		} while(1);
	}


	template<class Domain, class Tag, class RandomIterator >
	inline typename Poly1FactorDom<Domain,Tag, RandomIterator>::Rep& Poly1FactorDom<Domain,Tag, RandomIterator>::give_random_prim_root(Rep& R, const Rep& F)  const
	{
		Degree n; this->degree(n,F);
		Residu_t MOD = _domain.residu();

		// Search for a primitive Polynomial
		// with random Elements
		do {
			this->random( (RandomIterator&)_g, R, n); // must cast away const
			_domain.assign(R[(size_t)n.value()],_domain.one);
			for(Residu_t a=0; a<MOD; ++a) {
				_domain.assign(R[0],(Element_t)a);
				if (is_prim_root(R,F))
					return R;
			}
		} while(1);
	}


	template<class Domain, class Tag, class RandomIterator >
	inline typename Poly1FactorDom<Domain,Tag, RandomIterator>::Rep& Poly1FactorDom<Domain,Tag, RandomIterator>::random_prim_root(Rep& P, Rep& R, Degree n)  const
	{
		// P is irreducible
		// R is a primitive root. i.e R generates (Z_p)/P.
		// returns R
		return give_prim_root(R, random_irreducible(P,n));
	}

} // Givaro

#endif // __GIVARO_poly_primitive_root_INL

/* -*- mode: C++; tab-width: 8; indent-tabs-mode: t; c-basic-offset: 8 -*- */
// vim:sts=8:sw=8:ts=8:noet:sr:cino=>s,f0,{0,g0,(0,\:0,t0,+0,=s