/usr/include/ql/methods/lattices/binomialtree.hpp is in libquantlib0-dev 1.4-2.
This file is owned by root:root, with mode 0o644.
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/*
Copyright (C) 2003 Ferdinando Ametrano
Copyright (C) 2001, 2002, 2003 Sadruddin Rejeb
Copyright (C) 2005 StatPro Italia srl
This file is part of QuantLib, a free-software/open-source library
for financial quantitative analysts and developers - http://quantlib.org/
QuantLib is free software: you can redistribute it and/or modify it
under the terms of the QuantLib license. You should have received a
copy of the license along with this program; if not, please email
<quantlib-dev@lists.sf.net>. The license is also available online at
<http://quantlib.org/license.shtml>.
This program 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 license for more details.
*/
/*! \file binomialtree.hpp
\brief Binomial tree class
*/
#ifndef quantlib_binomial_tree_hpp
#define quantlib_binomial_tree_hpp
#include <ql/methods/lattices/tree.hpp>
#include <ql/instruments/dividendschedule.hpp>
#include <ql/stochasticprocess.hpp>
namespace QuantLib {
//! Binomial tree base class
/*! \ingroup lattices */
template <class T>
class BinomialTree : public Tree<T> {
public:
enum Branches { branches = 2 };
BinomialTree(const boost::shared_ptr<StochasticProcess1D>& process,
Time end,
Size steps)
: Tree<T>(steps+1) {
x0_ = process->x0();
dt_ = end/steps;
driftPerStep_ = process->drift(0.0, x0_) * dt_;
}
Size size(Size i) const {
return i+1;
}
Size descendant(Size, Size index, Size branch) const {
return index + branch;
}
protected:
Real x0_, driftPerStep_;
Time dt_;
};
//! Base class for equal probabilities binomial tree
/*! \ingroup lattices */
template <class T>
class EqualProbabilitiesBinomialTree : public BinomialTree<T> {
public:
EqualProbabilitiesBinomialTree(
const boost::shared_ptr<StochasticProcess1D>& process,
Time end,
Size steps)
: BinomialTree<T>(process, end, steps) {}
Real underlying(Size i, Size index) const {
BigInteger j = 2*BigInteger(index) - BigInteger(i);
// exploiting the forward value tree centering
return this->x0_*std::exp(i*this->driftPerStep_ + j*this->up_);
}
Real probability(Size, Size, Size) const { return 0.5; }
protected:
Real up_;
};
//! Base class for equal jumps binomial tree
/*! \ingroup lattices */
template <class T>
class EqualJumpsBinomialTree : public BinomialTree<T> {
public:
EqualJumpsBinomialTree(
const boost::shared_ptr<StochasticProcess1D>& process,
Time end,
Size steps)
: BinomialTree<T>(process, end, steps) {}
Real underlying(Size i, Size index) const {
BigInteger j = 2*BigInteger(index) - BigInteger(i);
// exploiting equal jump and the x0_ tree centering
return this->x0_*std::exp(j*this->dx_);
}
Real probability(Size, Size, Size branch) const {
return (branch == 1 ? pu_ : pd_);
}
protected:
Real dx_, pu_, pd_;
};
//! Jarrow-Rudd (multiplicative) equal probabilities binomial tree
/*! \ingroup lattices */
class JarrowRudd : public EqualProbabilitiesBinomialTree<JarrowRudd> {
public:
JarrowRudd(const boost::shared_ptr<StochasticProcess1D>&,
Time end,
Size steps,
Real strike);
};
//! Cox-Ross-Rubinstein (multiplicative) equal jumps binomial tree
/*! \ingroup lattices */
class CoxRossRubinstein
: public EqualJumpsBinomialTree<CoxRossRubinstein> {
public:
CoxRossRubinstein(const boost::shared_ptr<StochasticProcess1D>&,
Time end,
Size steps,
Real strike);
};
//! Additive equal probabilities binomial tree
/*! \ingroup lattices */
class AdditiveEQPBinomialTree
: public EqualProbabilitiesBinomialTree<AdditiveEQPBinomialTree> {
public:
AdditiveEQPBinomialTree(
const boost::shared_ptr<StochasticProcess1D>&,
Time end,
Size steps,
Real strike);
};
//! %Trigeorgis (additive equal jumps) binomial tree
/*! \ingroup lattices */
class Trigeorgis : public EqualJumpsBinomialTree<Trigeorgis> {
public:
Trigeorgis(const boost::shared_ptr<StochasticProcess1D>&,
Time end,
Size steps,
Real strike);
};
//! %Tian tree: third moment matching, multiplicative approach
/*! \ingroup lattices */
class Tian : public BinomialTree<Tian> {
public:
Tian(const boost::shared_ptr<StochasticProcess1D>&,
Time end,
Size steps,
Real strike);
Real underlying(Size i, Size index) const {
return x0_ * std::pow(down_, Real(BigInteger(i)-BigInteger(index)))
* std::pow(up_, Real(index));
};
Real probability(Size, Size, Size branch) const {
return (branch == 1 ? pu_ : pd_);
}
protected:
Real up_, down_, pu_, pd_;
};
//! Leisen & Reimer tree: multiplicative approach
/*! \ingroup lattices */
class LeisenReimer : public BinomialTree<LeisenReimer> {
public:
LeisenReimer(const boost::shared_ptr<StochasticProcess1D>&,
Time end,
Size steps,
Real strike);
Real underlying(Size i, Size index) const {
return x0_ * std::pow(down_, Real(BigInteger(i)-BigInteger(index)))
* std::pow(up_, Real(index));
}
Real probability(Size, Size, Size branch) const {
return (branch == 1 ? pu_ : pd_);
}
protected:
Real up_, down_, pu_, pd_;
};
class Joshi4 : public BinomialTree<Joshi4> {
public:
Joshi4(const boost::shared_ptr<StochasticProcess1D>&,
Time end,
Size steps,
Real strike);
Real underlying(Size i, Size index) const {
return x0_ * std::pow(down_, Real(BigInteger(i)-BigInteger(index)))
* std::pow(up_, Real(index));
}
Real probability(Size, Size, Size branch) const {
return (branch == 1 ? pu_ : pd_);
}
protected:
Real computeUpProb(Real k, Real dj) const;
Real up_, down_, pu_, pd_;
};
}
#endif
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