// This file is part of Eigen, a lightweight C++ template library // for linear algebra. // // Copyright (C) 2008 Gael Guennebaud // // This Source Code Form is subject to the terms of the Mozilla // Public License v. 2.0. If a copy of the MPL was not distributed // with this file, You can obtain one at http://mozilla.org/MPL/2.0/. #ifndef EIGEN_COMPRESSED_STORAGE_H #define EIGEN_COMPRESSED_STORAGE_H namespace Eigen { namespace internal { /** \internal * Stores a sparse set of values as a list of values and a list of indices. * */ template class CompressedStorage { public: typedef _Scalar Scalar; typedef _Index Index; protected: typedef typename NumTraits::Real RealScalar; public: CompressedStorage() : m_values(0), m_indices(0), m_size(0), m_allocatedSize(0) {} CompressedStorage(size_t size) : m_values(0), m_indices(0), m_size(0), m_allocatedSize(0) { resize(size); } CompressedStorage(const CompressedStorage& other) : m_values(0), m_indices(0), m_size(0), m_allocatedSize(0) { *this = other; } CompressedStorage& operator=(const CompressedStorage& other) { resize(other.size()); internal::smart_copy(other.m_values, other.m_values + m_size, m_values); internal::smart_copy(other.m_indices, other.m_indices + m_size, m_indices); return *this; } void swap(CompressedStorage& other) { std::swap(m_values, other.m_values); std::swap(m_indices, other.m_indices); std::swap(m_size, other.m_size); std::swap(m_allocatedSize, other.m_allocatedSize); } ~CompressedStorage() { delete[] m_values; delete[] m_indices; } void reserve(size_t size) { size_t newAllocatedSize = m_size + size; if (newAllocatedSize > m_allocatedSize) reallocate(newAllocatedSize); } void squeeze() { if (m_allocatedSize>m_size) reallocate(m_size); } void resize(size_t size, double reserveSizeFactor = 0) { if (m_allocatedSize(m_size); resize(m_size+1, 1); m_values[id] = v; m_indices[id] = i; } inline size_t size() const { return m_size; } inline size_t allocatedSize() const { return m_allocatedSize; } inline void clear() { m_size = 0; } inline Scalar& value(size_t i) { return m_values[i]; } inline const Scalar& value(size_t i) const { return m_values[i]; } inline Index& index(size_t i) { return m_indices[i]; } inline const Index& index(size_t i) const { return m_indices[i]; } static CompressedStorage Map(Index* indices, Scalar* values, size_t size) { CompressedStorage res; res.m_indices = indices; res.m_values = values; res.m_allocatedSize = res.m_size = size; return res; } /** \returns the largest \c k such that for all \c j in [0,k) index[\c j]\<\a key */ inline Index searchLowerIndex(Index key) const { return searchLowerIndex(0, m_size, key); } /** \returns the largest \c k in [start,end) such that for all \c j in [start,k) index[\c j]\<\a key */ inline Index searchLowerIndex(size_t start, size_t end, Index key) const { while(end>start) { size_t mid = (end+start)>>1; if (m_indices[mid](start); } /** \returns the stored value at index \a key * If the value does not exist, then the value \a defaultValue is returned without any insertion. */ inline Scalar at(Index key, const Scalar& defaultValue = Scalar(0)) const { if (m_size==0) return defaultValue; else if (key==m_indices[m_size-1]) return m_values[m_size-1]; // ^^ optimization: let's first check if it is the last coefficient // (very common in high level algorithms) const size_t id = searchLowerIndex(0,m_size-1,key); return ((id=end) return Scalar(0); else if (end>start && key==m_indices[end-1]) return m_values[end-1]; // ^^ optimization: let's first check if it is the last coefficient // (very common in high level algorithms) const size_t id = searchLowerIndex(start,end-1,key); return ((id=m_size || m_indices[id]!=key) { resize(m_size+1,1); for (size_t j=m_size-1; j>id; --j) { m_indices[j] = m_indices[j-1]; m_values[j] = m_values[j-1]; } m_indices[id] = key; m_values[id] = defaultValue; } return m_values[id]; } void prune(const Scalar& reference, const RealScalar& epsilon = NumTraits::dummy_precision()) { size_t k = 0; size_t n = size(); for (size_t i=0; i