minetest/irr/include/vector2d.h
2024-10-10 21:02:05 +02:00

508 lines
14 KiB
C++

// Copyright (C) 2002-2012 Nikolaus Gebhardt
// This file is part of the "Irrlicht Engine".
// For conditions of distribution and use, see copyright notice in irrlicht.h
#pragma once
#include "irrMath.h"
#include "dimension2d.h"
#include <functional>
#include <array>
namespace irr
{
namespace core
{
//! 2d vector template class with lots of operators and methods.
/** As of Irrlicht 1.6, this class supersedes position2d, which should
be considered deprecated. */
template <class T>
class vector2d
{
public:
//! Default constructor (null vector)
constexpr vector2d() :
X(0), Y(0) {}
//! Constructor with two different values
constexpr vector2d(T nx, T ny) :
X(nx), Y(ny) {}
//! Constructor with the same value for both members
explicit constexpr vector2d(T n) :
X(n), Y(n) {}
constexpr vector2d(const dimension2d<T> &other) :
X(other.Width), Y(other.Height) {}
explicit constexpr vector2d(const std::array<T, 2> &arr) :
X(arr[0]), Y(arr[1]) {}
// operators
vector2d<T> operator-() const { return vector2d<T>(-X, -Y); }
vector2d<T> &operator=(const dimension2d<T> &other)
{
X = other.Width;
Y = other.Height;
return *this;
}
vector2d<T> operator+(const vector2d<T> &other) const { return vector2d<T>(X + other.X, Y + other.Y); }
vector2d<T> operator+(const dimension2d<T> &other) const { return vector2d<T>(X + other.Width, Y + other.Height); }
vector2d<T> &operator+=(const vector2d<T> &other)
{
X += other.X;
Y += other.Y;
return *this;
}
vector2d<T> operator+(const T v) const { return vector2d<T>(X + v, Y + v); }
vector2d<T> &operator+=(const T v)
{
X += v;
Y += v;
return *this;
}
vector2d<T> &operator+=(const dimension2d<T> &other)
{
X += other.Width;
Y += other.Height;
return *this;
}
vector2d<T> operator-(const vector2d<T> &other) const { return vector2d<T>(X - other.X, Y - other.Y); }
vector2d<T> operator-(const dimension2d<T> &other) const { return vector2d<T>(X - other.Width, Y - other.Height); }
vector2d<T> &operator-=(const vector2d<T> &other)
{
X -= other.X;
Y -= other.Y;
return *this;
}
vector2d<T> operator-(const T v) const { return vector2d<T>(X - v, Y - v); }
vector2d<T> &operator-=(const T v)
{
X -= v;
Y -= v;
return *this;
}
vector2d<T> &operator-=(const dimension2d<T> &other)
{
X -= other.Width;
Y -= other.Height;
return *this;
}
vector2d<T> operator*(const vector2d<T> &other) const { return vector2d<T>(X * other.X, Y * other.Y); }
vector2d<T> &operator*=(const vector2d<T> &other)
{
X *= other.X;
Y *= other.Y;
return *this;
}
vector2d<T> operator*(const T v) const { return vector2d<T>(X * v, Y * v); }
vector2d<T> &operator*=(const T v)
{
X *= v;
Y *= v;
return *this;
}
vector2d<T> operator/(const vector2d<T> &other) const { return vector2d<T>(X / other.X, Y / other.Y); }
vector2d<T> &operator/=(const vector2d<T> &other)
{
X /= other.X;
Y /= other.Y;
return *this;
}
vector2d<T> operator/(const T v) const { return vector2d<T>(X / v, Y / v); }
vector2d<T> &operator/=(const T v)
{
X /= v;
Y /= v;
return *this;
}
T &operator[](u32 index)
{
_IRR_DEBUG_BREAK_IF(index > 1) // access violation
return *(&X + index);
}
const T &operator[](u32 index) const
{
_IRR_DEBUG_BREAK_IF(index > 1) // access violation
return *(&X + index);
}
//! sort in order X, Y.
constexpr bool operator<=(const vector2d<T> &other) const
{
return !(*this > other);
}
//! sort in order X, Y.
constexpr bool operator>=(const vector2d<T> &other) const
{
return !(*this < other);
}
//! sort in order X, Y.
constexpr bool operator<(const vector2d<T> &other) const
{
return X < other.X || (X == other.X && Y < other.Y);
}
//! sort in order X, Y.
constexpr bool operator>(const vector2d<T> &other) const
{
return X > other.X || (X == other.X && Y > other.Y);
}
constexpr bool operator==(const vector2d<T> &other) const
{
return X == other.X && Y == other.Y;
}
constexpr bool operator!=(const vector2d<T> &other) const
{
return !(*this == other);
}
// functions
//! Checks if this vector equals the other one.
/** Takes floating point rounding errors into account.
\param other Vector to compare with.
\return True if the two vector are (almost) equal, else false. */
bool equals(const vector2d<T> &other) const
{
return core::equals(X, other.X) && core::equals(Y, other.Y);
}
vector2d<T> &set(T nx, T ny)
{
X = nx;
Y = ny;
return *this;
}
vector2d<T> &set(const vector2d<T> &p)
{
X = p.X;
Y = p.Y;
return *this;
}
//! Gets the length of the vector.
/** \return The length of the vector. */
T getLength() const { return core::squareroot(X * X + Y * Y); }
//! Get the squared length of this vector
/** This is useful because it is much faster than getLength().
\return The squared length of the vector. */
T getLengthSQ() const { return X * X + Y * Y; }
//! Get the dot product of this vector with another.
/** \param other Other vector to take dot product with.
\return The dot product of the two vectors. */
T dotProduct(const vector2d<T> &other) const
{
return X * other.X + Y * other.Y;
}
//! check if this vector is parallel to another vector
bool nearlyParallel(const vector2d<T> &other, const T factor = relativeErrorFactor<T>()) const
{
// https://eagergames.wordpress.com/2017/04/01/fast-parallel-lines-and-vectors-test/
// if a || b then a.x/a.y = b.x/b.y (similar triangles)
// if a || b then either both x are 0 or both y are 0.
return equalsRelative(X * other.Y, other.X * Y, factor) && // a bit counterintuitive, but makes sure that
// only y or only x are 0, and at same time deals
// with the case where one vector is zero vector.
(X * other.X + Y * other.Y) != 0;
}
//! Gets distance from another point.
/** Here, the vector is interpreted as a point in 2-dimensional space.
\param other Other vector to measure from.
\return Distance from other point. */
T getDistanceFrom(const vector2d<T> &other) const
{
return vector2d<T>(X - other.X, Y - other.Y).getLength();
}
//! Returns squared distance from another point.
/** Here, the vector is interpreted as a point in 2-dimensional space.
\param other Other vector to measure from.
\return Squared distance from other point. */
T getDistanceFromSQ(const vector2d<T> &other) const
{
return vector2d<T>(X - other.X, Y - other.Y).getLengthSQ();
}
//! rotates the point anticlockwise around a center by an amount of degrees.
/** \param degrees Amount of degrees to rotate by, anticlockwise.
\param center Rotation center.
\return This vector after transformation. */
vector2d<T> &rotateBy(f64 degrees, const vector2d<T> &center = vector2d<T>())
{
degrees *= DEGTORAD64;
const f64 cs = cos(degrees);
const f64 sn = sin(degrees);
X -= center.X;
Y -= center.Y;
set((T)(X * cs - Y * sn), (T)(X * sn + Y * cs));
X += center.X;
Y += center.Y;
return *this;
}
//! Normalize the vector.
/** The null vector is left untouched.
\return Reference to this vector, after normalization. */
vector2d<T> &normalize()
{
f32 length = (f32)(X * X + Y * Y);
if (length == 0)
return *this;
length = core::reciprocal_squareroot(length);
X = (T)(X * length);
Y = (T)(Y * length);
return *this;
}
//! Calculates the angle of this vector in degrees in the trigonometric sense.
/** 0 is to the right (3 o'clock), values increase counter-clockwise.
This method has been suggested by Pr3t3nd3r.
\return Returns a value between 0 and 360. */
f64 getAngleTrig() const
{
if (Y == 0)
return X < 0 ? 180 : 0;
else if (X == 0)
return Y < 0 ? 270 : 90;
if (Y > 0)
if (X > 0)
return atan((irr::f64)Y / (irr::f64)X) * RADTODEG64;
else
return 180.0 - atan((irr::f64)Y / -(irr::f64)X) * RADTODEG64;
else if (X > 0)
return 360.0 - atan(-(irr::f64)Y / (irr::f64)X) * RADTODEG64;
else
return 180.0 + atan(-(irr::f64)Y / -(irr::f64)X) * RADTODEG64;
}
//! Calculates the angle of this vector in degrees in the counter trigonometric sense.
/** 0 is to the right (3 o'clock), values increase clockwise.
\return Returns a value between 0 and 360. */
inline f64 getAngle() const
{
if (Y == 0) // corrected thanks to a suggestion by Jox
return X < 0 ? 180 : 0;
else if (X == 0)
return Y < 0 ? 90 : 270;
// don't use getLength here to avoid precision loss with s32 vectors
// avoid floating-point trouble as sqrt(y*y) is occasionally larger than y, so clamp
const f64 tmp = core::clamp(Y / sqrt((f64)(X * X + Y * Y)), -1.0, 1.0);
const f64 angle = atan(core::squareroot(1 - tmp * tmp) / tmp) * RADTODEG64;
if (X > 0 && Y > 0)
return angle + 270;
else if (X > 0 && Y < 0)
return angle + 90;
else if (X < 0 && Y < 0)
return 90 - angle;
else if (X < 0 && Y > 0)
return 270 - angle;
return angle;
}
//! Calculates the angle between this vector and another one in degree.
/** \param b Other vector to test with.
\return Returns a value between 0 and 90. */
inline f64 getAngleWith(const vector2d<T> &b) const
{
f64 tmp = (f64)(X * b.X + Y * b.Y);
if (tmp == 0.0)
return 90.0;
tmp = tmp / core::squareroot((f64)((X * X + Y * Y) * (b.X * b.X + b.Y * b.Y)));
if (tmp < 0.0)
tmp = -tmp;
if (tmp > 1.0) // avoid floating-point trouble
tmp = 1.0;
return atan(sqrt(1 - tmp * tmp) / tmp) * RADTODEG64;
}
//! Returns if this vector interpreted as a point is on a line between two other points.
/** It is assumed that the point is on the line.
\param begin Beginning vector to compare between.
\param end Ending vector to compare between.
\return True if this vector is between begin and end, false if not. */
bool isBetweenPoints(const vector2d<T> &begin, const vector2d<T> &end) const
{
// . end
// /
// /
// /
// . begin
// -
// -
// . this point (am I inside or outside)?
//
if (begin.X != end.X) {
return ((begin.X <= X && X <= end.X) ||
(begin.X >= X && X >= end.X));
} else {
return ((begin.Y <= Y && Y <= end.Y) ||
(begin.Y >= Y && Y >= end.Y));
}
}
//! Creates an interpolated vector between this vector and another vector.
/** \param other The other vector to interpolate with.
\param d Interpolation value between 0.0f (all the other vector) and 1.0f (all this vector).
Note that this is the opposite direction of interpolation to getInterpolated_quadratic()
\return An interpolated vector. This vector is not modified. */
vector2d<T> getInterpolated(const vector2d<T> &other, f64 d) const
{
const f64 inv = 1.0f - d;
return vector2d<T>((T)(other.X * inv + X * d), (T)(other.Y * inv + Y * d));
}
//! Creates a quadratically interpolated vector between this and two other vectors.
/** \param v2 Second vector to interpolate with.
\param v3 Third vector to interpolate with (maximum at 1.0f)
\param d Interpolation value between 0.0f (all this vector) and 1.0f (all the 3rd vector).
Note that this is the opposite direction of interpolation to getInterpolated() and interpolate()
\return An interpolated vector. This vector is not modified. */
vector2d<T> getInterpolated_quadratic(const vector2d<T> &v2, const vector2d<T> &v3, f64 d) const
{
// this*(1-d)*(1-d) + 2 * v2 * (1-d) + v3 * d * d;
const f64 inv = 1.0f - d;
const f64 mul0 = inv * inv;
const f64 mul1 = 2.0f * d * inv;
const f64 mul2 = d * d;
return vector2d<T>((T)(X * mul0 + v2.X * mul1 + v3.X * mul2),
(T)(Y * mul0 + v2.Y * mul1 + v3.Y * mul2));
}
/*! Test if this point and another 2 points taken as triplet
are colinear, clockwise, anticlockwise. This can be used also
to check winding order in triangles for 2D meshes.
\return 0 if points are colinear, 1 if clockwise, 2 if anticlockwise
*/
s32 checkOrientation(const vector2d<T> &b, const vector2d<T> &c) const
{
// Example of clockwise points
//
// ^ Y
// | A
// | . .
// | . .
// | C.....B
// +---------------> X
T val = (b.Y - Y) * (c.X - b.X) -
(b.X - X) * (c.Y - b.Y);
if (val == 0)
return 0; // colinear
return (val > 0) ? 1 : 2; // clock or counterclock wise
}
/*! Returns true if points (a,b,c) are clockwise on the X,Y plane*/
inline bool areClockwise(const vector2d<T> &b, const vector2d<T> &c) const
{
T val = (b.Y - Y) * (c.X - b.X) -
(b.X - X) * (c.Y - b.Y);
return val > 0;
}
/*! Returns true if points (a,b,c) are counterclockwise on the X,Y plane*/
inline bool areCounterClockwise(const vector2d<T> &b, const vector2d<T> &c) const
{
T val = (b.Y - Y) * (c.X - b.X) -
(b.X - X) * (c.Y - b.Y);
return val < 0;
}
//! Sets this vector to the linearly interpolated vector between a and b.
/** \param a first vector to interpolate with, maximum at 1.0f
\param b second vector to interpolate with, maximum at 0.0f
\param d Interpolation value between 0.0f (all vector b) and 1.0f (all vector a)
Note that this is the opposite direction of interpolation to getInterpolated_quadratic()
*/
vector2d<T> &interpolate(const vector2d<T> &a, const vector2d<T> &b, f64 d)
{
X = (T)((f64)b.X + ((a.X - b.X) * d));
Y = (T)((f64)b.Y + ((a.Y - b.Y) * d));
return *this;
}
//! X coordinate of vector.
T X;
//! Y coordinate of vector.
T Y;
};
//! Typedef for f32 2d vector.
typedef vector2d<f32> vector2df;
//! Typedef for integer 2d vector.
typedef vector2d<s32> vector2di;
template <class S, class T>
vector2d<T> operator*(const S scalar, const vector2d<T> &vector)
{
return vector * scalar;
}
// These methods are declared in dimension2d, but need definitions of vector2d
template <class T>
dimension2d<T>::dimension2d(const vector2d<T> &other) :
Width(other.X), Height(other.Y)
{
}
template <class T>
bool dimension2d<T>::operator==(const vector2d<T> &other) const
{
return Width == other.X && Height == other.Y;
}
} // end namespace core
} // end namespace irr
namespace std
{
template <class T>
struct hash<irr::core::vector2d<T>>
{
size_t operator()(const irr::core::vector2d<T> &vec) const
{
size_t h1 = hash<T>()(vec.X);
size_t h2 = hash<T>()(vec.Y);
return (h1 << (4 * sizeof(h1)) | h1 >> (4 * sizeof(h1))) ^ h2;
}
};
}