dft_tools/triqs/operators/many_body_operator.hpp

/*******************************************************************************
 *
 * TRIQS: a Toolbox for Research in Interacting Quantum Systems
 *
 * Copyright (C) 2014 by I. Krivenko, O. Parcollet, M. Ferrero
 *
 * TRIQS is free software: you can redistribute it and/or modify it under the
 * terms of the GNU General Public License as published by the Free Software
 * Foundation, either version 3 of the License, or (at your option) any later
 * version.
 *
 * TRIQS is distributed in the hope that it will be useful, but WITHOUT ANY
 * WARRANTY; without even the implied warranty of MERCHANTABILITY or FITNESS
 * FOR A PARTICULAR PURPOSE. See the GNU General Public License for more
 * details.
 *
 * You should have received a copy of the GNU General Public License along with
 * TRIQS. If not, see <http://www.gnu.org/licenses/>.
 *
 ******************************************************************************/
#pragma once
#include <triqs/utility/dressed_iterator.hpp>

#include <ostream>
#include <limits>
#include <cmath>
#include <complex>
#include <boost/variant.hpp>
#include <boost/operators.hpp>
#include <boost/serialization/vector.hpp>
#include <boost/serialization/map.hpp>
#include <boost/serialization/variant.hpp>

namespace triqs {
namespace utility {

 /**
  * many_body_operator is a general operator in second quantification
  */
 template <typename scalar_t>
 class many_body_operator :
     // implements vector space over scalar_t operators
     boost::additive<many_body_operator<scalar_t>>,
     boost::multipliable<many_body_operator<scalar_t>>,
     boost::additive<many_body_operator<scalar_t>, scalar_t>,   // op+a a+op op-a
     //boost::subtractable2_left<many_body_operator<scalar_t>, scalar_t>, // a-op
     boost::multipliable<many_body_operator<scalar_t>, scalar_t>, // op*a a*op op/a
     boost::dividable<many_body_operator<scalar_t>, scalar_t> {

  static constexpr scalar_t threshold = std::numeric_limits<scalar_t>::epsilon();

  public:
  /// The indices of the C, C^+ operators are a vector of int/string
  using indices_t = std::vector<boost::variant<int, std::string>>;

  private:
  // The canonical operator: a dagger and some indices
  struct canonical_ops_t {
   bool dagger;
   indices_t indices;
   // Order: dagger < non dagger, and then indices
   // Example: c+_1 < c+_2 < c+_3 < c_3 < c_2 < c_1
   friend bool operator<(canonical_ops_t const& a, canonical_ops_t const& b) {
    if (a.dagger != b.dagger) return (a.dagger > b.dagger);
    if (a.dagger) // a.indices < b.indices
     return std::lexicographical_compare(a.indices.begin(), a.indices.end(), b.indices.begin(), b.indices.end());
    else // b.indices < a.indices
     return std::lexicographical_compare(b.indices.begin(), b.indices.end(), a.indices.begin(), a.indices.end());
   }
   friend bool operator>(canonical_ops_t const& a, canonical_ops_t const& b) { return b < a; }
   friend bool operator==(canonical_ops_t const& a, canonical_ops_t const& b) {
    return (a.dagger == b.dagger && a.indices.size() == b.indices.size() &&
            std::equal(a.indices.begin(), a.indices.end(), b.indices.begin()));
   }
   template <class Archive> void serialize(Archive& ar, const unsigned int version) { ar& dagger& indices; }
  };

  // Monomial: an ordered set of creation/annihilation operators and comparison
  using monomial_t = std::vector<canonical_ops_t>;

  friend bool operator<(monomial_t const& m1, monomial_t const& m2) {
   return m1.size() != m2.size() ? m1.size() < m2.size()
                                 : std::lexicographical_compare(m1.begin(), m1.end(), m2.begin(), m2.end());
  }

  // Map of all monomials with coefficients
  using monomials_map_t = std::map<monomial_t, scalar_t>;

  monomials_map_t monomials;

  public:
  many_body_operator() = default;
  many_body_operator(many_body_operator const&) = default;
  many_body_operator(many_body_operator&&) = default;
  many_body_operator& operator=(many_body_operator const&) = default;
  many_body_operator& operator=(many_body_operator&&) = default;

  template <typename S> many_body_operator(many_body_operator<S> const& x) { *this = x; }

  template <typename S> many_body_operator& operator=(many_body_operator<S> const& x) {
   monomials.clear();
   for (auto const& y : x.monomials) monomials.insert({y.first, y.second});
  }

  // factory for c, cdag
  static many_body_operator make_canonical(bool is_dag, indices_t indices) {
   many_body_operator res;
   auto m = monomial_t{canonical_ops_t{is_dag, indices}};
   res.monomials.insert({m, 1.0});
   return res;
  }

  // We use utility::dressed_iterator to dress iterators
  // _cdress is a simple struct of refs to dress the iterators (Cf doc)
  struct _cdress {
   monomial_t const& monomial;
   scalar_t coef;
   _cdress(typename monomials_map_t::const_iterator _it) : monomial(_it->first), coef(_it->second) {}
  };
  using const_iterator = utility::dressed_iterator<typename monomials_map_t::const_iterator, _cdress>;

  public:
  // Iterators (only const!)
  const_iterator begin() const noexcept { return monomials.begin(); }
  const_iterator end() const noexcept { return monomials.end(); }
  const_iterator cbegin() const noexcept { return monomials.cbegin(); }
  const_iterator cend() const noexcept { return monomials.cend(); }

  // Is zero operator ?
  bool is_zero() const { return monomials.empty(); }

  // Algebraic operations involving scalar_t constants
  many_body_operator operator-() const {
   auto res = *this;
   for (auto& m : res.monomials) m.second = -m.second;
   return res;
  }

  many_body_operator& operator+=(scalar_t alpha) {
   bool is_new_monomial;
   typename monomials_map_t::iterator it;
   std::tie(it, is_new_monomial) = monomials.insert(std::make_pair(monomial_t(0), alpha));
   if (!is_new_monomial) {
    it->second += alpha;
    erase_zero_monomial(monomials, it);
   }
   return *this;
  }

  many_body_operator& operator-=(scalar_t alpha) { return operator+=(-alpha); }

  friend many_body_operator operator-(scalar_t alpha, many_body_operator const& op) { return -op + alpha; }
  //friend many_body_operator operator/ (many_body_operator const & op, scalar_t alpha) { return op/alpha; }

  many_body_operator& operator*=(scalar_t alpha) {
   if (std::abs(alpha) < 100*std::abs(threshold)) {
    monomials.clear();
   } else {
    for (auto& m : monomials) m.second *= alpha;
   }
   return *this;
  }

  many_body_operator& operator/=(scalar_t alpha) { return operator*=(1.0/alpha); }

  // Algebraic operations
  many_body_operator& operator+=(many_body_operator const& op) {
   bool is_new_monomial;
   typename monomials_map_t::iterator it;
   for (auto const& m : op.monomials) {
    std::tie(it, is_new_monomial) = monomials.insert(m);
    if (!is_new_monomial) {
     it->second += m.second;
     erase_zero_monomial(monomials, it);
    }
   }
   return *this;
  }

  many_body_operator& operator-=(many_body_operator const& op) {
   bool is_new_monomial;
   typename monomials_map_t::iterator it;
   for (auto const& m : op.monomials) {
    std::tie(it, is_new_monomial) = monomials.insert(std::make_pair(m.first, -m.second));
    if (!is_new_monomial) {
     it->second -= m.second;
     erase_zero_monomial(monomials, it);
    }
   }
   return *this;
  }

  many_body_operator& operator*=(many_body_operator const& op) {
   monomials_map_t tmp_map; // product will be stored here
   for (auto const& m : monomials)
    for (auto const& op_m : op.monomials) {
     // prepare an unnormalized product
     monomial_t product_m;
     product_m.reserve(m.first.size() + op_m.first.size());
     for (auto const& op : m.first) product_m.push_back(op);
     for (auto const& op : op_m.first) product_m.push_back(op);
     // std::copy(m.first.begin(), m.first.end(), std::back_inserter(product_m));
     // std::copy(op_m.first.begin(), op_m.first.end(), std::back_inserter(product_m));
     normalize_and_insert(product_m, m.second * op_m.second, tmp_map);
    }
   std::swap(monomials, tmp_map);
   return *this;
  }

  // implementation details of dagger
  //
  private:
  static double _dagger(double x) { return x; }
  static std::complex<double> _dagger(std::complex<double> x) { return conj(x); }

  static canonical_ops_t _dagger(canonical_ops_t const& cop) {
   return {!cop.dagger, cop.indices};
  }

  static monomial_t _dagger(monomial_t const& m) {
   monomial_t res;
   for (auto it = m.rbegin(); it != m.rend(); ++it) res.push_back(_dagger(*it));
   return res;
  }

  public:
  // dagger
  friend many_body_operator dagger(many_body_operator const& op) {
   many_body_operator res;
   for (auto const& x : op) res.monomials.insert({_dagger(x.monomial), _dagger(x.coef)});
   return res;
  }

  // Boost.Serialization
  friend class boost::serialization::access;
  template <class Archive> void serialize(Archive& ar, const unsigned int version) { ar& monomials; }

  private:
  // Normalize a monomial and insert into a map
  static void normalize_and_insert(monomial_t& m, scalar_t coeff, monomials_map_t& target) {
   // The normalization is done by employing a simple bubble sort algorithms.
   // Apart from sorting elements this function keeps track of the sign and
   // recursively calls itself if a permutation of two operators produces a new
   // monomial
   if (m.size() >= 2) {
    bool is_swapped;
    do {
     is_swapped = false;
     for (std::size_t n = 1; n < m.size(); ++n) {
      canonical_ops_t& prev_index = m[n - 1];
      canonical_ops_t& cur_index = m[n];
      if (prev_index == cur_index) return; // The monomial is effectively zero
      if (prev_index > cur_index) {
       // Are we swapping C and C^+ with the same indices?
       // A bit ugly ...
       canonical_ops_t cur_index_flipped_type(cur_index);
       cur_index_flipped_type.dagger = !cur_index_flipped_type.dagger;
       if (prev_index == cur_index_flipped_type) {
        monomial_t new_m;
        new_m.reserve(m.size() - 2);
        std::copy(m.begin(), m.begin() + n - 1, std::back_inserter(new_m));
        std::copy(m.begin() + n + 1, m.end(), std::back_inserter(new_m));
        normalize_and_insert(new_m, coeff, target);
       }
       coeff = -coeff;
       std::swap(prev_index, cur_index);
       is_swapped = true;
      }
     }
    } while (is_swapped);
   }

   // Insert the result
   bool is_new_monomial;
   typename monomials_map_t::iterator it;
   std::tie(it, is_new_monomial) = target.insert(std::make_pair(m, coeff));
   if (!is_new_monomial) {
    it->second += coeff;
    erase_zero_monomial(target, it);
   }
  }

  // Erase a monomial with a close-to-zero coefficient.
  static void erase_zero_monomial(monomials_map_t& m, typename monomials_map_t::iterator& it) {
   if (std::abs(it->second) < 100*std::abs(threshold)) m.erase(it);
  }

  struct print_visitor : public boost::static_visitor<> {
   std::ostream& os;
   print_visitor(std::ostream& os_) : os(os_) {}
   template <typename T> void operator()(T const& x) const { os << x; }
  };

  friend std::ostream& operator<<(std::ostream& os, canonical_ops_t const& op) {
   if (op.dagger) os << "^+";
   os << "(";
   int u = 0;
   for (auto const& i : op.indices) {
    if (u++) os << ",";
    boost::apply_visitor(print_visitor{os}, i);
   }
   return os << ")";
  }

  friend std::ostream& operator<<(std::ostream& os, monomial_t const& m) {
   for (auto const& c : m) {
    os << "C" << c;
   }
   return os;
  }

  // Print many_body_operator itself
  friend std::ostream& operator<<(std::ostream& os, many_body_operator const& op) {
   if (op.monomials.size() != 0) {
    bool print_plus = false;
    for (auto const& m : op.monomials) {
     os << (print_plus ? " + " : "") << m.second;
     if (m.first.size()) os << "*";
     os << m.first;
     print_plus = true;
    }
   } else
    os << "0";
   return os;
  }
 };


 // ---- factories --------------

 // Free functions to make creation/annihilation operators
 template <typename... IndexTypes> many_body_operator<double> c(IndexTypes... indices) {
  return many_body_operator<double>::make_canonical(false, many_body_operator<double>::indices_t{indices...});
  // need to put many_body_operator<double>::indices_t because {} constructor is explicit !?
 }

 template <typename... IndexTypes> many_body_operator<double> c_dag(IndexTypes... indices) {
  return many_body_operator<double>::make_canonical(true, many_body_operator<double>::indices_t{indices...});
 }

 template <typename... IndexTypes> many_body_operator<double> n(IndexTypes... indices) {
  return c_dag(indices...) * c(indices...);
 }
}
}
Add many_body_operator header in triqs 2014-05-21 16:33:52 +02:00			`/*******************************************************************************`
			`*`
			`* TRIQS: a Toolbox for Research in Interacting Quantum Systems`
			`*`
			`* Copyright (C) 2014 by I. Krivenko, O. Parcollet, M. Ferrero`
			`*`
			`* TRIQS is free software: you can redistribute it and/or modify it under the`
			`* terms of the GNU General Public License as published by the Free Software`
			`* Foundation, either version 3 of the License, or (at your option) any later`
			`* version.`
			`*`
			`* TRIQS is distributed in the hope that it will be useful, but WITHOUT ANY`
			`* WARRANTY; without even the implied warranty of MERCHANTABILITY or FITNESS`
			`* FOR A PARTICULAR PURPOSE. See the GNU General Public License for more`
			`* details.`
			`*`
			`* You should have received a copy of the GNU General Public License along with`
			`* TRIQS. If not, see <http://www.gnu.org/licenses/>.`
			`*`
			`******************************************************************************/`
			`#pragma once`
			`#include <triqs/utility/dressed_iterator.hpp>`

			`#include <ostream>`
			`#include <limits>`
			`#include <cmath>`
			`#include <complex>`
			`#include <boost/variant.hpp>`
			`#include <boost/operators.hpp>`
			`#include <boost/serialization/vector.hpp>`
			`#include <boost/serialization/map.hpp>`
			`#include <boost/serialization/variant.hpp>`

			`namespace triqs {`
			`namespace utility {`

			`/**`
			`* many_body_operator is a general operator in second quantification`
			`*/`
			`template <typename scalar_t>`
			`class many_body_operator :`
			`// implements vector space over scalar_t operators`
			`boost::additive<many_body_operator<scalar_t>>,`
			`boost::multipliable<many_body_operator<scalar_t>>,`
			`boost::additive<many_body_operator<scalar_t>, scalar_t>, // op+a a+op op-a`
			`//boost::subtractable2_left<many_body_operator<scalar_t>, scalar_t>, // a-op`
			`boost::multipliable<many_body_operator<scalar_t>, scalar_t>, // opa aop op/a`
			`boost::dividable<many_body_operator<scalar_t>, scalar_t> {`

			`static constexpr scalar_t threshold = std::numeric_limits<scalar_t>::epsilon();`

			`public:`
			`/// The indices of the C, C^+ operators are a vector of int/string`
			`using indices_t = std::vector<boost::variant<int, std::string>>;`

			`private:`
			`// The canonical operator: a dagger and some indices`
			`struct canonical_ops_t {`
			`bool dagger;`
			`indices_t indices;`
			`// Order: dagger < non dagger, and then indices`
			`// Example: c+_1 < c+_2 < c+_3 < c_3 < c_2 < c_1`
			`friend bool operator<(canonical_ops_t const& a, canonical_ops_t const& b) {`
			`if (a.dagger != b.dagger) return (a.dagger > b.dagger);`
			`if (a.dagger) // a.indices < b.indices`
			`return std::lexicographical_compare(a.indices.begin(), a.indices.end(), b.indices.begin(), b.indices.end());`
			`else // b.indices < a.indices`
			`return std::lexicographical_compare(b.indices.begin(), b.indices.end(), a.indices.begin(), a.indices.end());`
			`}`
			`friend bool operator>(canonical_ops_t const& a, canonical_ops_t const& b) { return b < a; }`
			`friend bool operator==(canonical_ops_t const& a, canonical_ops_t const& b) {`
			`return (a.dagger == b.dagger && a.indices.size() == b.indices.size() &&`
			`std::equal(a.indices.begin(), a.indices.end(), b.indices.begin()));`
			`}`
			`template <class Archive> void serialize(Archive& ar, const unsigned int version) { ar& dagger& indices; }`
			`};`

			`// Monomial: an ordered set of creation/annihilation operators and comparison`
			`using monomial_t = std::vector<canonical_ops_t>;`

			`friend bool operator<(monomial_t const& m1, monomial_t const& m2) {`
			`return m1.size() != m2.size() ? m1.size() < m2.size()`
			`: std::lexicographical_compare(m1.begin(), m1.end(), m2.begin(), m2.end());`
			`}`

			`// Map of all monomials with coefficients`
			`using monomials_map_t = std::map<monomial_t, scalar_t>;`

			`monomials_map_t monomials;`

			`public:`
			`many_body_operator() = default;`
			`many_body_operator(many_body_operator const&) = default;`
			`many_body_operator(many_body_operator&&) = default;`
			`many_body_operator& operator=(many_body_operator const&) = default;`
			`many_body_operator& operator=(many_body_operator&&) = default;`

			`template <typename S> many_body_operator(many_body_operator<S> const& x) { *this = x; }`

			`template <typename S> many_body_operator& operator=(many_body_operator<S> const& x) {`
			`monomials.clear();`
			`for (auto const& y : x.monomials) monomials.insert({y.first, y.second});`
			`}`

			`// factory for c, cdag`
			`static many_body_operator make_canonical(bool is_dag, indices_t indices) {`
			`many_body_operator res;`
			`auto m = monomial_t{canonical_ops_t{is_dag, indices}};`
			`res.monomials.insert({m, 1.0});`
			`return res;`
			`}`

			`// We use utility::dressed_iterator to dress iterators`
			`// _cdress is a simple struct of refs to dress the iterators (Cf doc)`
			`struct _cdress {`
			`monomial_t const& monomial;`
			`scalar_t coef;`
			`_cdress(typename monomials_map_t::const_iterator _it) : monomial(_it->first), coef(_it->second) {}`
			`};`
			`using const_iterator = utility::dressed_iterator<typename monomials_map_t::const_iterator, _cdress>;`

			`public:`
			`// Iterators (only const!)`
			`const_iterator begin() const noexcept { return monomials.begin(); }`
			`const_iterator end() const noexcept { return monomials.end(); }`
			`const_iterator cbegin() const noexcept { return monomials.cbegin(); }`
			`const_iterator cend() const noexcept { return monomials.cend(); }`

			`// Is zero operator ?`
			`bool is_zero() const { return monomials.empty(); }`

			`// Algebraic operations involving scalar_t constants`
			`many_body_operator operator-() const {`
			`auto res = *this;`
			`for (auto& m : res.monomials) m.second = -m.second;`
			`return res;`
			`}`

			`many_body_operator& operator+=(scalar_t alpha) {`
			`bool is_new_monomial;`
			`typename monomials_map_t::iterator it;`
			`std::tie(it, is_new_monomial) = monomials.insert(std::make_pair(monomial_t(0), alpha));`
			`if (!is_new_monomial) {`
			`it->second += alpha;`
			`erase_zero_monomial(monomials, it);`
			`}`
			`return *this;`
			`}`

			`many_body_operator& operator-=(scalar_t alpha) { return operator+=(-alpha); }`

			`friend many_body_operator operator-(scalar_t alpha, many_body_operator const& op) { return -op + alpha; }`
			`//friend many_body_operator operator/ (many_body_operator const & op, scalar_t alpha) { return op/alpha; }`

			`many_body_operator& operator*=(scalar_t alpha) {`
			`if (std::abs(alpha) < 100*std::abs(threshold)) {`
			`monomials.clear();`
			`} else {`
			`for (auto& m : monomials) m.second *= alpha;`
			`}`
			`return *this;`
			`}`

			`many_body_operator& operator/=(scalar_t alpha) { return operator*=(1.0/alpha); }`

			`// Algebraic operations`
			`many_body_operator& operator+=(many_body_operator const& op) {`
			`bool is_new_monomial;`
			`typename monomials_map_t::iterator it;`
			`for (auto const& m : op.monomials) {`
			`std::tie(it, is_new_monomial) = monomials.insert(m);`
			`if (!is_new_monomial) {`
			`it->second += m.second;`
			`erase_zero_monomial(monomials, it);`
			`}`
			`}`
			`return *this;`
			`}`

			`many_body_operator& operator-=(many_body_operator const& op) {`
			`bool is_new_monomial;`
			`typename monomials_map_t::iterator it;`
			`for (auto const& m : op.monomials) {`
			`std::tie(it, is_new_monomial) = monomials.insert(std::make_pair(m.first, -m.second));`
			`if (!is_new_monomial) {`
			`it->second -= m.second;`
			`erase_zero_monomial(monomials, it);`
			`}`
			`}`
			`return *this;`
			`}`

			`many_body_operator& operator*=(many_body_operator const& op) {`
			`monomials_map_t tmp_map; // product will be stored here`
			`for (auto const& m : monomials)`
			`for (auto const& op_m : op.monomials) {`
			`// prepare an unnormalized product`
			`monomial_t product_m;`
			`product_m.reserve(m.first.size() + op_m.first.size());`
			`for (auto const& op : m.first) product_m.push_back(op);`
			`for (auto const& op : op_m.first) product_m.push_back(op);`
			`// std::copy(m.first.begin(), m.first.end(), std::back_inserter(product_m));`
			`// std::copy(op_m.first.begin(), op_m.first.end(), std::back_inserter(product_m));`
			`normalize_and_insert(product_m, m.second * op_m.second, tmp_map);`
			`}`
			`std::swap(monomials, tmp_map);`
			`return *this;`
			`}`

			`// implementation details of dagger`
			`//`
			`private:`
			`static double _dagger(double x) { return x; }`
			`static std::complex<double> _dagger(std::complex<double> x) { return conj(x); }`

			`static canonical_ops_t _dagger(canonical_ops_t const& cop) {`
			`return {!cop.dagger, cop.indices};`
			`}`

			`static monomial_t _dagger(monomial_t const& m) {`
			`monomial_t res;`
			`for (auto it = m.rbegin(); it != m.rend(); ++it) res.push_back(_dagger(*it));`
			`return res;`
			`}`

			`public:`
			`// dagger`
			`friend many_body_operator dagger(many_body_operator const& op) {`
			`many_body_operator res;`
			`for (auto const& x : op) res.monomials.insert({_dagger(x.monomial), _dagger(x.coef)});`
			`return res;`
			`}`

			`// Boost.Serialization`
			`friend class boost::serialization::access;`
			`template <class Archive> void serialize(Archive& ar, const unsigned int version) { ar& monomials; }`

			`private:`
			`// Normalize a monomial and insert into a map`
			`static void normalize_and_insert(monomial_t& m, scalar_t coeff, monomials_map_t& target) {`
			`// The normalization is done by employing a simple bubble sort algorithms.`
			`// Apart from sorting elements this function keeps track of the sign and`
			`// recursively calls itself if a permutation of two operators produces a new`
			`// monomial`
			`if (m.size() >= 2) {`
			`bool is_swapped;`
			`do {`
			`is_swapped = false;`
			`for (std::size_t n = 1; n < m.size(); ++n) {`
			`canonical_ops_t& prev_index = m[n - 1];`
			`canonical_ops_t& cur_index = m[n];`
			`if (prev_index == cur_index) return; // The monomial is effectively zero`
			`if (prev_index > cur_index) {`
			`// Are we swapping C and C^+ with the same indices?`
			`// A bit ugly ...`
			`canonical_ops_t cur_index_flipped_type(cur_index);`
			`cur_index_flipped_type.dagger = !cur_index_flipped_type.dagger;`
			`if (prev_index == cur_index_flipped_type) {`
			`monomial_t new_m;`
			`new_m.reserve(m.size() - 2);`
			`std::copy(m.begin(), m.begin() + n - 1, std::back_inserter(new_m));`
			`std::copy(m.begin() + n + 1, m.end(), std::back_inserter(new_m));`
			`normalize_and_insert(new_m, coeff, target);`
			`}`
			`coeff = -coeff;`
			`std::swap(prev_index, cur_index);`
			`is_swapped = true;`
			`}`
			`}`
			`} while (is_swapped);`
			`}`

			`// Insert the result`
			`bool is_new_monomial;`
			`typename monomials_map_t::iterator it;`
			`std::tie(it, is_new_monomial) = target.insert(std::make_pair(m, coeff));`
			`if (!is_new_monomial) {`
			`it->second += coeff;`
			`erase_zero_monomial(target, it);`
			`}`
			`}`

			`// Erase a monomial with a close-to-zero coefficient.`
			`static void erase_zero_monomial(monomials_map_t& m, typename monomials_map_t::iterator& it) {`
			`if (std::abs(it->second) < 100*std::abs(threshold)) m.erase(it);`
			`}`

			`struct print_visitor : public boost::static_visitor<> {`
			`std::ostream& os;`
			`print_visitor(std::ostream& os_) : os(os_) {}`
			`template <typename T> void operator()(T const& x) const { os << x; }`
			`};`

			`friend std::ostream& operator<<(std::ostream& os, canonical_ops_t const& op) {`
			`if (op.dagger) os << "^+";`
			`os << "(";`
			`int u = 0;`
			`for (auto const& i : op.indices) {`
			`if (u++) os << ",";`
			`boost::apply_visitor(print_visitor{os}, i);`
			`}`
			`return os << ")";`
			`}`

			`friend std::ostream& operator<<(std::ostream& os, monomial_t const& m) {`
			`for (auto const& c : m) {`
			`os << "C" << c;`
			`}`
			`return os;`
			`}`

			`// Print many_body_operator itself`
			`friend std::ostream& operator<<(std::ostream& os, many_body_operator const& op) {`
			`if (op.monomials.size() != 0) {`
			`bool print_plus = false;`
			`for (auto const& m : op.monomials) {`
			`os << (print_plus ? " + " : "") << m.second;`
			`if (m.first.size()) os << "*";`
			`os << m.first;`
			`print_plus = true;`
			`}`
			`} else`
			`os << "0";`
			`return os;`
			`}`
			`};`


			`// ---- factories --------------`

			`// Free functions to make creation/annihilation operators`
			`template <typename... IndexTypes> many_body_operator<double> c(IndexTypes... indices) {`
			`return many_body_operator<double>::make_canonical(false, many_body_operator<double>::indices_t{indices...});`
			`// need to put many_body_operator<double>::indices_t because {} constructor is explicit !?`
			`}`

			`template <typename... IndexTypes> many_body_operator<double> c_dag(IndexTypes... indices) {`
			`return many_body_operator<double>::make_canonical(true, many_body_operator<double>::indices_t{indices...});`
			`}`

			`template <typename... IndexTypes> many_body_operator<double> n(IndexTypes... indices) {`
			`return c_dag(indices...) * c(indices...);`
			`}`
			`}`
			`}`