doc/latest/_field___zp_8h_source.html

/*    This file is part of the Gudhi Library - https://gudhi.inria.fr/ - which is released under MIT.

 *    See file LICENSE or go to https://gudhi.inria.fr/licensing/ for full license details.

 *    Author(s):       Clément Maria

 *

 *    Copyright (C) 2014 Inria

 *

 *    Modification(s):

 *      - YYYY/MM Author: Description of the modification

 */


#ifndef PERSISTENT_COHOMOLOGY_FIELD_ZP_H_

#define PERSISTENT_COHOMOLOGY_FIELD_ZP_H_


#include <utility>

#include <vector>

#include <stdexcept>


namespace Gudhi {


namespace persistent_cohomology {


class Field_Zp {

 public:

  typedef int Element;


  Field_Zp()

      : Prime(0),

        inverse_() {

  }


  void init(int charac) {

    Prime = charac;


    // Check that the provided prime is less than the maximum allowed as int, calculation below, and 'plus_times_equal' function : 46337 ; i.e (max_prime-1)*max_prime <= INT_MAX

    if(Prime > 46337)

        throw std::invalid_argument("Maximum homology_coeff_field allowed value is 46337");


    // Check for primality

    if (Prime <= 1)

        throw std::invalid_argument("homology_coeff_field must be a prime number");


    inverse_.clear();

    inverse_.reserve(charac);

    inverse_.push_back(0);

    for (int i = 1; i < Prime; ++i) {

      int inv = 1;

      int mult = inv * i;

      while ( (mult % Prime) != 1) {

        ++inv;

        if(mult == Prime)

            throw std::invalid_argument("homology_coeff_field must be a prime number");

        mult = inv * i;

      }

      inverse_.push_back(inv);

    }

  }


  Element plus_times_equal(const Element& x, const Element& y, const Element& w) {

    assert(Prime > 0);  // division by zero + non negative values

    Element result = (x + w * y) % Prime;

    if (result < 0)

      result += Prime;

    return result;

  }


// operator= defined on Element


  Element times(const Element& y, const Element& w) {

    return plus_times_equal(0, y, (Element)w);

  }


  Element plus_equal(const Element& x, const Element& y) {

    return plus_times_equal(x, y, (Element)1);

  }


  Element additive_identity() const {

    return 0;

  }

  Element multiplicative_identity(Element = 0) const {

    return 1;

  }

  std::pair<Element, Element> inverse(Element x, Element P) {

    return std::pair<Element, Element>(inverse_[x], P);

  }  // <------ return the product of field characteristic for which x is invertible


  Element times_minus(Element x, Element y) {

    assert(Prime > 0);  // division by zero + non negative values

    Element out = (-x * y) % Prime;

    return (out < 0) ? out + Prime : out;

  }


  int characteristic() const {

    return Prime;

  }


 private:

  int Prime;

  std::vector<Element> inverse_;

};


}  // namespace persistent_cohomology


}  // namespace Gudhi


#endif  // PERSISTENT_COHOMOLOGY_FIELD_ZP_H_

Gudhi::persistent_cohomology::Field_Zp
Structure representing the coefficient field .
Definition: Field_Zp.h:27

Gudhi::persistent_cohomology::Field_Zp::times_minus
Element times_minus(Element x, Element y)
Definition: Field_Zp.h:97

Gudhi::persistent_cohomology::Field_Zp::plus_times_equal
Element plus_times_equal(const Element &x, const Element &y, const Element &w)
Definition: Field_Zp.h:64

Gudhi::persistent_cohomology::Field_Zp::additive_identity
Element additive_identity() const
Returns the additive idendity  of the field.
Definition: Field_Zp.h:84

Gudhi::persistent_cohomology::Field_Zp::inverse
std::pair< Element, Element > inverse(Element x, Element P)
Definition: Field_Zp.h:92

Gudhi::persistent_cohomology::Field_Zp::multiplicative_identity
Element multiplicative_identity(Element=0) const
Returns the multiplicative identity  of the field.
Definition: Field_Zp.h:88

Gudhi::persistent_cohomology::Field_Zp::times
Element times(const Element &y, const Element &w)
Definition: Field_Zp.h:75

Gudhi::persistent_cohomology::Field_Zp::characteristic
int characteristic() const
Returns the characteristic  of the field.
Definition: Field_Zp.h:104