/usr/include/ql/methods/lattices/lattice.hpp is in libquantlib0-dev 1.7.1-1.
This file is owned by root:root, with mode 0o644.
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/*
Copyright (C) 2001, 2002, 2003 Sadruddin Rejeb
Copyright (C) 2004, 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 lattice.hpp
\brief Tree-based lattice-method class
*/
#ifndef quantlib_tree_based_lattice_hpp
#define quantlib_tree_based_lattice_hpp
#include <ql/numericalmethod.hpp>
#include <ql/discretizedasset.hpp>
#include <ql/patterns/curiouslyrecurring.hpp>
namespace QuantLib {
//! Tree-based lattice-method base class
/*! This class defines a lattice method that is able to rollback
(with discount) a discretized asset object. It will be based
on one or more trees.
Derived classes must implement the following interface:
\code
public:
DiscountFactor discount(Size i, Size index) const;
Size descendant(Size i, Size index, Size branch) const;
Real probability(Size i, Size index, Size branch) const;
\endcode
and may implement the following:
\code
public:
void stepback(Size i,
const Array& values,
Array& newValues) const;
\endcode
\ingroup lattices
*/
template <class Impl>
class TreeLattice : public Lattice,
public CuriouslyRecurringTemplate<Impl> {
public:
TreeLattice(const TimeGrid& timeGrid,
Size n)
: Lattice(timeGrid), n_(n) {
QL_REQUIRE(n>0, "there is no zeronomial lattice!");
statePrices_ = std::vector<Array>(1, Array(1, 1.0));
statePricesLimit_ = 0;
}
//! \name Lattice interface
//@{
void initialize(DiscretizedAsset&, Time t) const;
void rollback(DiscretizedAsset&, Time to) const;
void partialRollback(DiscretizedAsset&, Time to) const;
//! Computes the present value of an asset using Arrow-Debrew prices
Real presentValue(DiscretizedAsset&) const;
//@}
const Array& statePrices(Size i) const;
void stepback(Size i,
const Array& values,
Array& newValues) const;
protected:
void computeStatePrices(Size until) const;
// Arrow-Debrew state prices
mutable std::vector<Array> statePrices_;
private:
Size n_;
mutable Size statePricesLimit_;
};
// template definitions
template <class Impl>
void TreeLattice<Impl>::computeStatePrices(Size until) const {
for (Size i=statePricesLimit_; i<until; i++) {
statePrices_.push_back(Array(this->impl().size(i+1), 0.0));
for (Size j=0; j<this->impl().size(i); j++) {
DiscountFactor disc = this->impl().discount(i,j);
Real statePrice = statePrices_[i][j];
for (Size l=0; l<n_; l++) {
statePrices_[i+1][this->impl().descendant(i,j,l)] +=
statePrice*disc*this->impl().probability(i,j,l);
}
}
}
statePricesLimit_ = until;
}
template <class Impl>
const Array& TreeLattice<Impl>::statePrices(Size i) const {
if (i>statePricesLimit_)
computeStatePrices(i);
return statePrices_[i];
}
template <class Impl>
inline Real TreeLattice<Impl>::presentValue(DiscretizedAsset& asset) const {
Size i = t_.index(asset.time());
return DotProduct(asset.values(), statePrices(i));
}
template <class Impl>
inline void TreeLattice<Impl>::initialize(DiscretizedAsset& asset, Time t) const {
Size i = t_.index(t);
asset.time() = t;
asset.reset(this->impl().size(i));
}
template <class Impl>
inline void TreeLattice<Impl>::rollback(DiscretizedAsset& asset, Time to) const {
partialRollback(asset,to);
asset.adjustValues();
}
template <class Impl>
void TreeLattice<Impl>::partialRollback(DiscretizedAsset& asset,
Time to) const {
Time from = asset.time();
if (close(from,to))
return;
QL_REQUIRE(from > to,
"cannot roll the asset back to" << to
<< " (it is already at t = " << from << ")");
Integer iFrom = Integer(t_.index(from));
Integer iTo = Integer(t_.index(to));
for (Integer i=iFrom-1; i>=iTo; --i) {
Array newValues(this->impl().size(i));
this->impl().stepback(i, asset.values(), newValues);
asset.time() = t_[i];
asset.values() = newValues;
// skip the very last adjustment
if (i != iTo)
asset.adjustValues();
}
}
template <class Impl>
void TreeLattice<Impl>::stepback(Size i, const Array& values,
Array& newValues) const {
#pragma omp parallel for
for (Size j=0; j<this->impl().size(i); j++) {
Real value = 0.0;
for (Size l=0; l<n_; l++) {
value += this->impl().probability(i,j,l) *
values[this->impl().descendant(i,j,l)];
}
value *= this->impl().discount(i,j);
newValues[j] = value;
}
}
}
#endif
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