espp make_espp(const polynom& form, const affine_change& var) {
espp e;
multi_affine tmp(form.get_n());
vector<vector<bool>> poly = form.get_poly(), matrix = var.get_matrix();
//cout<<tmp<<endl;
for (int i = 0; i < poly.size(); ++i) {
for (int j = 0; j < poly[i].size(); ++j) {
if (poly[i][j]) {
tmp *= matrix[j];
}
}
e += tmp;
//cout<<"tmp = "<<tmp<<endl;
tmp.set_one();
}
//cout<<"e = "<<e<<"\n\n";
return e;
}
ordinal COM_QQ_D(const polynom& left, const polynom& right) {
if (left.degree() < right.degree())
return ordinal::LT;
if (left.degree() > right.degree())
return ordinal::GT;
for (int i = left.degree(); i >= 0; i--) {
auto currComp = COM_QQ_D(left[i], right[i]);
if (currComp != ordinal::EQ)
return currComp;
}
return ordinal::EQ;
}
void printpoly(polynom const& p) {
if(p.empty()) { cout << " 0"; return; }
int n=p.size();
bool first=true;
for(int i=n-1; i>=0; --i) {
if(p[i]==0 && !first) continue;
if(first) { first=false; } else { cout <<"+"; }
cout << setw(3) << right << p[i];
if(i>1) cout << " x^" << i << " ";
if(i==1) cout << " x ";
}
}
polynom DER_P_P(const polynom& polynom_1) {
// вспомогательные переменные + степень многочлена
polynom polynom_2 = polynom_1;
unsigned size_polynom = polynom_1.degree();
fraction Number_1(0), Number_2(1);
polynom_2[size_polynom] = Number_1; // высшей степени мн-на присваиваем 0
//дифференцирование многочлена
for (unsigned p = 0 ; p < size_polynom; ++p) {
Number_1 = ADD_QQ_Q(Number_1, Number_2);
polynom_2[p] = MUL_QQ_Q(polynom_1[p+1], Number_1);
}
polynom_2.reduce(); // уменьшение степени на 1
return polynom_2;
}
natural DEG_P_N(const polynom &pn) {
natural result(pn.degree());
return result;
}
equal_functions::equal_functions(const polynom& p) : n(p.get_n()) {
members.insert(pair<int,int>(vec_to_int(p), -1));
}
