502 lines
11 KiB
C++
502 lines
11 KiB
C++
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/* multivariate polynomial in a (vector) variable x with coefficients
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in T. */
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template<unsigned n>
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class multivariate_monomial
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{
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public:
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unsigned v[n];
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public:
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multivariate_monomial ()
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{
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for (unsigned i = 0; i < n; i ++)
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v[i] = 0;
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}
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multivariate_monomial (variable, unsigned j)
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{
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for (unsigned i = 0; i < n; i ++)
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v[i] = 0;
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assert (j >= 1 && j <= n);
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v[j - 1] = 1;
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}
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multivariate_monomial (const multivariate_monomial &e)
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{
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for (unsigned i = 0; i < n; i ++)
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v[i] = e.v[i];
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}
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~multivariate_monomial () { }
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multivariate_monomial &operator = (const multivariate_monomial &e)
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{
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for (unsigned i = 0; i < n; i ++)
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v[i] = e.v[i];
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return *this;
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}
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unsigned degree () const
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{
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unsigned d = 0;
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for (unsigned i = 0; i < n; i ++)
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d += v[i];
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return d;
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}
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bool operator == (const multivariate_monomial &e) const
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{
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for (unsigned i = 0; i < n; i ++)
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{
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if (v[i] != e.v[i])
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return 0;
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}
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return 1;
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}
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bool operator != (const multivariate_monomial &e) const { return !operator == (e); }
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bool operator < (const multivariate_monomial &e) const
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{
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for (unsigned i = 0; i < n; i ++)
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{
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if (v[i] < e.v[i])
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return 1;
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if (v[i] > e.v[i])
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return 0;
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}
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return 0;
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}
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multivariate_monomial operator + (const multivariate_monomial &e) const
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{
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multivariate_monomial m;
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for (unsigned i = 0; i < n; i ++)
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m.v[i] = v[i] + e.v[i];
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return m;
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}
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bool divides (const multivariate_monomial &num) const
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{
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for (unsigned i = 0; i < n; i ++)
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{
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if (v[i] > num.v[i])
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return 0;
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}
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return 1;
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}
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bool operator | (const multivariate_monomial &num) const { return divides (num); }
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multivariate_monomial &mineq (const multivariate_monomial &e)
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{
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for (unsigned i = 0; i < n; i ++)
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{
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if (e.v[i] < v[i])
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v[i] = e.v[i];
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}
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return *this;
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}
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multivariate_monomial operator - (const multivariate_monomial &denom) const
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{
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multivariate_monomial m;
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for (unsigned i = 0; i < n; i ++)
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{
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assert (v[i] >= denom.v[i]);
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m.v[i] = v[i] - denom.v[i];
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}
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return m;
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}
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void show_self () const
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{
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printf ("x^(");
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for (unsigned i = 0; i < n; i ++)
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{
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if (i > 0)
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printf (",");
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printf ("%d", v[i]);
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}
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printf (")");
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}
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};
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template<class T, unsigned n>
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class multivariate_polynomial
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{
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public:
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typedef ::linear_combination<multivariate_polynomial<T, n> > linear_combination;
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typedef ::linear_combination_const_iter<multivariate_polynomial<T, n> >
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linear_combination_const_iter;
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private:
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typedef multivariate_monomial<n> monomial;
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map<monomial, T> coeffs;
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explicit multivariate_polynomial (const map<monomial, T> &coeffs_) : coeffs(coeffs_) { }
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public:
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multivariate_polynomial () { }
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multivariate_polynomial (int x)
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{
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T c (x);
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if (c != 0)
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coeffs.push (monomial (), c);
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}
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multivariate_polynomial (T c)
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{
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if (c != 0)
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coeffs.push (monomial (), c);
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}
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multivariate_polynomial (T c, variable, unsigned i)
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{
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if (c != 0)
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coeffs.push (monomial (VARIABLE, i), c);
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}
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multivariate_polynomial (T c, const monomial &m)
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{
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if (c != 0)
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coeffs.push (m, c);
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}
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multivariate_polynomial (const multivariate_polynomial &p) : coeffs(p.coeffs) { }
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multivariate_polynomial (copy, const multivariate_polynomial &p) : coeffs(COPY, p.coeffs) { }
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~multivariate_polynomial () { }
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multivariate_polynomial &operator = (const multivariate_polynomial &p)
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{
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coeffs = p.coeffs;
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return *this;
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}
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multivariate_polynomial &operator = (int x)
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{
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coeffs = map<monomial, T> ();
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T c (x);
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if (c != 0)
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coeffs.push (monomial (), c);
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return *this;
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}
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multivariate_polynomial &operator = (T c)
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{
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coeffs = map<monomial, T> ();
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if (c != 0)
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coeffs.push (monomial (), c);
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return *this;
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}
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bool is_unit () const;
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bool operator == (const multivariate_polynomial &p) const
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{
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#ifndef NDEBUG
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check ();
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p.check ();
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#endif
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return coeffs == p.coeffs;
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}
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bool operator != (const multivariate_polynomial &p) const { return !operator == (p); }
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bool operator == (int x) const
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{
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#ifndef NDEBUG
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check ();
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#endif
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T c (x);
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if (c == 0)
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return coeffs.is_empty ();
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else
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{
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if (coeffs.card () != 1)
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return 0;
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pair<monomial, T> p = coeffs.head ();
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return p.first.degree () == 0
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&& p.second == c;
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}
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}
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bool operator != (int x) const { return !operator == (x); }
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multivariate_polynomial &operator += (multivariate_polynomial p);
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multivariate_polynomial &operator -= (multivariate_polynomial p);
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multivariate_polynomial &operator *= (multivariate_polynomial p) { return operator = (*this * p); }
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multivariate_polynomial &operator *= (T s);
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multivariate_polynomial &add_term (T c, variable, unsigned i)
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{
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monomial m (VARIABLE, i);
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T &c2 = coeffs[m];
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c2 += c;
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if (c2 == 0)
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coeffs -= m;
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return *this;
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}
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multivariate_polynomial operator - () const { return multivariate_polynomial () - *this; }
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multivariate_polynomial operator + (multivariate_polynomial p) const
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{
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multivariate_polynomial r (COPY, *this);
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r += p;
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return r;
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}
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multivariate_polynomial operator - (multivariate_polynomial p) const
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{
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multivariate_polynomial r (COPY, *this);
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r -= p;
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return r;
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}
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multivariate_polynomial operator * (const multivariate_polynomial &p) const;
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monomial common_monomial () const;
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multivariate_polynomial gcd (const multivariate_polynomial &b) const
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{
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// ???
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return multivariate_polynomial (1);
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}
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pair<multivariate_polynomial, multivariate_polynomial>
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uncommon_factors (multivariate_polynomial b, basedvector<multivariate_polynomial, 1> ds);
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maybe<multivariate_polynomial>
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divides_exactly (const multivariate_polynomial &num) const;
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multivariate_polynomial divide_exact (const multivariate_polynomial &d) const;
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bool operator | (const multivariate_polynomial &num) const { abort (); }
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#ifndef NDEBUG
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void check () const;
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#endif
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static void show_ring ()
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{
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T::show_ring ();
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switch (n)
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{
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case 0: break;
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case 1: printf ("[x_1]"); break;
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case 2: printf ("[x_1, x_2]"); break;
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default:
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printf ("[x_1, ..., x_%d]", n);
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break;
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}
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}
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void display_self () const { show_self (); newline (); }
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void show_self () const;
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};
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template<class T, unsigned n> bool
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multivariate_polynomial<T, n>::is_unit () const
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{
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// ??? is_singleton
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if (coeffs.card () != 1)
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return 0;
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pair<monomial, T> p = coeffs.head ();
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return p.first.degree () == 0
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&& p.second.is_unit ();
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}
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template<class T, unsigned n> multivariate_polynomial<T, n> &
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multivariate_polynomial<T, n>::operator += (multivariate_polynomial p)
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{
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for (typename map<monomial, T>::const_iter i = p.coeffs; i; i ++)
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{
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monomial m = i.key ();
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T &c = coeffs[m];
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c += i.val ();
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if (c == 0)
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coeffs -= m;
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}
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return *this;
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}
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template<class T, unsigned n> multivariate_polynomial<T, n> &
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multivariate_polynomial<T, n>::operator -= (multivariate_polynomial p)
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{
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for (typename map<monomial, T>::const_iter i = p.coeffs; i; i ++)
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{
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monomial m = i.key ();
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T &c = coeffs[m];
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c -= i.val ();
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if (c == 0)
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coeffs -= m;
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}
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return *this;
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}
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template<class T, unsigned n> multivariate_polynomial<T, n> &
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multivariate_polynomial<T, n>::operator *= (T s)
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{
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if (s == 0)
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coeffs.clear ();
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else
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{
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for (typename map<monomial, T>::iter i = coeffs; i; i ++)
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i.val () *= s;
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}
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}
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template<class T, unsigned n> multivariate_polynomial<T, n>
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multivariate_polynomial<T, n>::operator * (const multivariate_polynomial &p) const
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{
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multivariate_polynomial r;
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for (typename map<monomial, T>::const_iter i = coeffs; i; i ++)
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for (typename map<monomial, T>::const_iter j = p.coeffs; j; j ++)
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{
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monomial m = i.key () + j.key ();
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T &c = r.coeffs[m];
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c += i.val () * j.val ();
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if (c == 0)
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r.coeffs -= m;
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}
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return r;
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}
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template<class T, unsigned n> multivariate_monomial<n>
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multivariate_polynomial<T, n>::common_monomial () const
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{
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monomial m = coeffs.head ().first;
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for (typename map<monomial, T>::const_iter i = coeffs; i; i ++)
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m.mineq (i.key ());
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return m;
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}
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template<class T, unsigned n> pair<multivariate_polynomial<T, n>,
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multivariate_polynomial<T, n> >
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multivariate_polynomial<T, n>::uncommon_factors (multivariate_polynomial b,
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basedvector<multivariate_polynomial, 1> ds)
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{
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multivariate_polynomial a = *this;
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monomial m = a.common_monomial ();
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m.mineq (b.common_monomial ());
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multivariate_polynomial mp (1, m);
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a = a.divide_exact (mp);
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b = b.divide_exact (mp);
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L:
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for (unsigned i = 1; i <= ds.size (); i ++)
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{
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const multivariate_polynomial &d = ds[i];
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maybe<multivariate_polynomial> aq = d.divides_exactly (a);
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if (aq.is_some ())
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{
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maybe<multivariate_polynomial> bq = d.divides_exactly (b);
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if (bq.is_some ())
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{
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a = aq.some ();
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b = bq.some ();
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goto L;
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}
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}
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}
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return pair<multivariate_polynomial, multivariate_polynomial> (a, b);
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}
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template<class T, unsigned n> maybe<multivariate_polynomial<T, n> >
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multivariate_polynomial<T, n>::divides_exactly (const multivariate_polynomial &num) const
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{
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const multivariate_polynomial &d = *this;
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multivariate_polynomial r (COPY, num);
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multivariate_polynomial q;
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pair<monomial, T> d_leading_term = d.coeffs.tail ();
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for (;;)
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{
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if (r == 0)
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{
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// ??
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assert (q*d == num);
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return maybe<multivariate_polynomial> (q);
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}
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pair<monomial, T> r_leading_term = r.coeffs.tail ();
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if (d_leading_term.first | r_leading_term.first)
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{
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multivariate_polynomial m (r_leading_term.second / d_leading_term.second,
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r_leading_term.first - d_leading_term.first);
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r -= m * d;
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q += m;
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}
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else
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return maybe<multivariate_polynomial> ();
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}
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}
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template<class T, unsigned n> multivariate_polynomial<T, n>
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multivariate_polynomial<T, n>::divide_exact (const multivariate_polynomial &d) const
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{
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maybe<multivariate_polynomial> r = d.divides_exactly (*this);
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return r.some ();
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}
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#ifndef NDEBUG
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template<class T, unsigned n> void
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multivariate_polynomial<T, n>::check () const
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{
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for (typename map<monomial, T>::const_iter i = coeffs; i; i ++)
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assert (i.val () != 0);
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}
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#endif
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template<class T, unsigned n> void
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multivariate_polynomial<T, n>::show_self () const
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{
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unsigned first = 1;
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for (typename map<monomial, T>::const_iter i = coeffs; i; i ++)
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{
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monomial m = i.key ();
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T c = i.val ();
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assert (c != 0);
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if (first)
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first = 0;
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else
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printf (" + ");
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if (m.degree () == 0)
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{
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if (c == 1)
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printf ("1");
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else
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show (c);
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}
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else
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{
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if (c != 1)
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{
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show (c);
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printf ("*");
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}
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show (m);
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}
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}
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if (first)
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printf ("0");
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}
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