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magnum/src/Math/Quaternion.h

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#ifndef Magnum_Math_Quaternion_h
#define Magnum_Math_Quaternion_h
/*
Copyright © 2010, 2011, 2012 Vladimír Vondruš <mosra@centrum.cz>
This file is part of Magnum.
Magnum is free software: you can redistribute it and/or modify
it under the terms of the GNU Lesser General Public License version 3
only, as published by the Free Software Foundation.
Magnum 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 Lesser General Public License version 3 for more details.
*/
/** @file
* @brief Class Magnum::Math::Quaternion
*/
#include <cmath>
#include <Utility/Assert.h>
#include <Utility/Debug.h>
#include "Math/Math.h"
#include "Math/MathTypeTraits.h"
#include "Math/Matrix.h"
#include "Math/Vector3.h"
namespace Magnum { namespace Math {
/** @brief %Quaternion */
template<class T> class Quaternion {
public:
/**
* @brief Create quaternion from rotation
* @param angle Rotation angle (counterclockwise, in radians)
* @param normalizedAxis Normalized rotation axis
*
* Expects that the rotation axis is normalized. @f[
* q = [\boldsymbol a \cdot sin \frac \theta 2, cos \frac \theta 2]
* @f]
*/
inline static Quaternion<T> fromRotation(T angle, const Vector3<T>& normalizedAxis) {
CORRADE_ASSERT(MathTypeTraits<T>::equals(normalizedAxis.dot(), T(1)),
"Math::Quaternion::fromRotation(): axis must be normalized", {});
return {normalizedAxis*std::sin(angle/2), std::cos(angle/2)};
}
/** @brief Default constructor */
inline constexpr Quaternion(): _scalar(T(1)) {}
/** @brief Create quaternion from vector and scalar */
inline constexpr Quaternion(const Vector3<T>& vector, T scalar): _vector(vector), _scalar(scalar) {}
/** @brief Equality comparison */
inline bool operator==(const Quaternion<T>& other) const {
return _vector == other._vector && MathTypeTraits<T>::equals(_scalar, other._scalar);
}
/** @brief Non-equality comparison */
inline bool operator!=(const Quaternion<T>& other) const {
return !operator==(other);
}
/** @brief %Vector part */
inline constexpr Vector3<T> vector() const { return _vector; }
/** @brief %Scalar part */
inline constexpr T scalar() const { return _scalar; }
/**
* @brief Rotation angle of unit quaternion
*
* Expects that the quaternion is normalized. @f[
* \theta = 2 \cdot acos q_S
* @f]
* @see rotationAxis(), fromRotation()
*/
inline T rotationAngle() const {
CORRADE_ASSERT(MathTypeTraits<T>::equals(lengthSquared(), T(1)),
"Math::Quaternion::rotationAngle(): quaternion must be normalized",
std::numeric_limits<T>::quiet_NaN());
return T(2)*std::acos(_scalar);
}
/**
* @brief Rotation axis of unit quaternion
*
* Expects that the quaternion is normalized. @f[
* \boldsymbol a = \frac{\boldsymbol q_V}{\sqrt{1 - q_S^2}}
* @f]
* @see rotationAngle(), fromRotation()
*/
inline Vector3<T> rotationAxis() const {
CORRADE_ASSERT(MathTypeTraits<T>::equals(lengthSquared(), T(1)),
"Math::Quaternion::rotationAxis(): quaternion must be normalized",
{});
return _vector/std::sqrt(1-pow<2>(_scalar));
}
/**
* @brief Convert quaternion to rotation matrix
*
* @see Matrix4::from(const Matrix<3, T>&, const Vector3<T>&)
*/
Matrix<3, T> matrix() const {
return { /* Column-major! */
T(1) - 2*pow<2>(_vector.y()) - 2*pow<2>(_vector.z()),
2*_vector.x()*_vector.y() + 2*_vector.z()*_scalar,
2*_vector.x()*_vector.z() - 2*_vector.y()*_scalar,
2*_vector.x()*_vector.y() - 2*_vector.z()*_scalar,
T(1) - 2*pow<2>(_vector.x()) - 2*pow<2>(_vector.z()),
2*_vector.y()*_vector.z() + 2*_vector.x()*_scalar,
2*_vector.x()*_vector.z() + 2*_vector.y()*_scalar,
2*_vector.y()*_vector.z() - 2*_vector.x()*_scalar,
T(1) - 2*pow<2>(_vector.x()) - 2*pow<2>(_vector.y())
};
}
/**
* @brief Add and assign quaternion
*
* The computation is done in-place. @f[
* p + q = [\boldsymbol p_V + \boldsymbol q_V, p_S + q_S]
* @f]
*/
inline Quaternion<T>& operator+=(const Quaternion<T>& other) {
_vector += other._vector;
_scalar += other._scalar;
return *this;
}
/**
* @brief Add quaternion
*
* @see operator+=()
*/
inline Quaternion<T> operator+(const Quaternion<T>& other) const {
return Quaternion<T>(*this)+=other;
}
/**
* @brief Negated quaternion
*
* @f[
* -q = [-\boldsymbol q_V, -q_S]
* @f]
*/
inline Quaternion<T> operator-() const {
return {-_vector, -_scalar};
}
/**
* @brief Subtract and assign quaternion
*
* The computation is done in-place. @f[
* p - q = [\boldsymbol p_V - \boldsymbol q_V, p_S - q_S]
* @f]
*/
inline Quaternion<T>& operator-=(const Quaternion<T>& other) {
_vector -= other._vector;
_scalar -= other._scalar;
return *this;
}
/**
* @brief Subtract quaternion
*
* @see operator-=()
*/
inline Quaternion<T> operator-(const Quaternion<T>& other) const {
return Quaternion<T>(*this)-=other;
}
/**
* @brief Multiply with scalar and assign
*
* The computation is done in-place. @f[
* q \cdot a = [\boldsymbol q_V \cdot a, q_S \cdot a]
* @f]
*/
inline Quaternion<T>& operator*=(T scalar) {
_vector *= scalar;
_scalar *= scalar;
return *this;
}
/**
* @brief Multiply with scalar
*
* @see operator*=(T)
*/
inline Quaternion<T> operator*(T scalar) const {
return Quaternion<T>(*this)*=scalar;
}
/**
* @brief Divide with scalar and assign
*
* The computation is done in-place. @f[
* \frac q a = [\frac {\boldsymbol q_V} a, \frac {q_S} a]
* @f]
*/
inline Quaternion<T>& operator/=(T scalar) {
_vector /= scalar;
_scalar /= scalar;
return *this;
}
/**
* @brief Divide with scalar
*
* @see operator/=(T)
*/
inline Quaternion<T> operator/(T scalar) const {
return Quaternion<T>(*this)/=scalar;
}
/**
* @brief Multiply with quaternion
*
* @f[
* p q = [p_S \boldsymbol q_V + q_S \boldsymbol p_V + \boldsymbol p_V \times \boldsymbol q_V,
* p_S q_S - \boldsymbol p_V \cdot \boldsymbol q_V]
* @f]
*/
inline Quaternion<T> operator*(const Quaternion<T>& other) const {
return {_scalar*other._vector + other._scalar*_vector + Vector3<T>::cross(_vector, other._vector),
_scalar*other._scalar - Vector3<T>::dot(_vector, other._vector)};
}
/**
* @brief %Quaternion length squared
*
* Should be used instead of length() for comparing quaternion length
* with other values, because it doesn't compute the square root. @f[
* |q|^2 = \boldsymbol q_V \cdot \boldsymbol q_V + q_S q_S
* @f]
*/
inline T lengthSquared() const {
return _vector.dot() + _scalar*_scalar;
}
/**
* @brief %Quaternion length
*
* @see lengthSquared()
*/
inline T length() const {
return std::sqrt(lengthSquared());
}
/** @brief Normalized quaternion (of length 1) */
inline Quaternion<T> normalized() const {
return (*this)/length();
}
/**
* @brief Conjugated quaternion
*
* @f[
* q^* = [-\boldsymbol q_V, q_S]
* @f]
*/
inline Quaternion<T> conjugated() const {
return {-_vector, _scalar};
}
/**
* @brief Inverted quaternion
*
* See invertedNormalized() which is faster for normalized
* quaternions. @f[
* q^{-1} = \frac{q^*}{|q|^2} = \frac{[-\boldsymbol q_V, q_S]}{|q|^2}
* @f]
*/
inline Quaternion<T> inverted() const {
return conjugated()/lengthSquared();
}
/**
* @brief Inverted normalized quaternion
*
* Equivalent to conjugated(). Expects that the quaternion is
* normalized. @f[
* q^{-1} = q^* = [-\boldsymbol q_V, q_S] ~~~~~ |q| = 1
* @f]
*/
inline Quaternion<T> invertedNormalized() const {
CORRADE_ASSERT(MathTypeTraits<T>::equals(lengthSquared(), T(1)),
"Math::Quaternion::invertedNormalized(): quaternion must be normalized",
Quaternion<T>({}, std::numeric_limits<T>::quiet_NaN()));
return conjugated();
}
private:
Vector3<T> _vector;
T _scalar;
};
/** @relates Quaternion
@brief Multiply scalar with quaternion
Same as Quaternion::operator*(T) const.
*/
template<class T> inline Quaternion<T> operator*(T scalar, const Quaternion<T>& quaternion) {
return quaternion*scalar;
}
/** @relates Quaternion
@brief Divide quaternion with number and invert
@f[
\frac a q = [\frac a {\boldsymbol q_V}, \frac a {q_S}]
@f]
@see Quaternion::operator/()
*/
template<class T> inline Quaternion<T> operator/(T scalar, const Quaternion<T>& quaternion) {
return {scalar/quaternion.vector(), scalar/quaternion.scalar()};
}
/** @debugoperator{Magnum::Math::Geometry::Rectangle} */
template<class T> Corrade::Utility::Debug operator<<(Corrade::Utility::Debug debug, const Quaternion<T>& value) {
debug << "Quaternion({";
debug.setFlag(Corrade::Utility::Debug::SpaceAfterEachValue, false);
debug << value.vector().x() << ", " << value.vector().y() << ", " << value.vector().z() << "}, " << value.scalar() << ")";
debug.setFlag(Corrade::Utility::Debug::SpaceAfterEachValue, true);
return debug;
}
/* Explicit instantiation for commonly used types */
#ifndef DOXYGEN_GENERATING_OUTPUT
extern template Corrade::Utility::Debug MAGNUM_EXPORT operator<<(Corrade::Utility::Debug, const Quaternion<float>&);
#ifndef MAGNUM_TARGET_GLES
extern template Corrade::Utility::Debug MAGNUM_EXPORT operator<<(Corrade::Utility::Debug, const Quaternion<double>&);
#endif
#endif
}}
#endif