use alga::general::{
AbstractGroup, AbstractLoop, AbstractMagma, AbstractMonoid, AbstractQuasigroup,
AbstractSemigroup, Id, Identity, Multiplicative, RealField, TwoSidedInverse,
};
use alga::linear::Translation as AlgaTranslation;
use alga::linear::{
AffineTransformation, DirectIsometry, Isometry, ProjectiveTransformation, Similarity,
Transformation,
};
use crate::base::SVector;
use crate::geometry::{Point, Translation};
impl<T: RealField + simba::scalar::RealField, const D: usize> Identity<Multiplicative>
for Translation<T, D>
{
#[inline]
fn identity() -> Self {
Self::identity()
}
}
impl<T: RealField + simba::scalar::RealField, const D: usize> TwoSidedInverse<Multiplicative>
for Translation<T, D>
{
#[inline]
#[must_use = "Did you mean to use two_sided_inverse_mut()?"]
fn two_sided_inverse(&self) -> Self {
self.inverse()
}
#[inline]
fn two_sided_inverse_mut(&mut self) {
self.inverse_mut()
}
}
impl<T: RealField + simba::scalar::RealField, const D: usize> AbstractMagma<Multiplicative>
for Translation<T, D>
{
#[inline]
fn operate(&self, rhs: &Self) -> Self {
self * rhs
}
}
macro_rules! impl_multiplicative_structures(
($($marker: ident<$operator: ident>),* $(,)*) => {$(
impl<T: RealField + simba::scalar::RealField, const D: usize> $marker<$operator> for Translation<T, D>
{ }
)*}
);
impl_multiplicative_structures!(
AbstractSemigroup<Multiplicative>,
AbstractMonoid<Multiplicative>,
AbstractQuasigroup<Multiplicative>,
AbstractLoop<Multiplicative>,
AbstractGroup<Multiplicative>
);
impl<T: RealField + simba::scalar::RealField, const D: usize> Transformation<Point<T, D>>
for Translation<T, D>
{
#[inline]
fn transform_point(&self, pt: &Point<T, D>) -> Point<T, D> {
self.transform_point(pt)
}
#[inline]
fn transform_vector(&self, v: &SVector<T, D>) -> SVector<T, D> {
*v
}
}
impl<T: RealField + simba::scalar::RealField, const D: usize> ProjectiveTransformation<Point<T, D>>
for Translation<T, D>
{
#[inline]
fn inverse_transform_point(&self, pt: &Point<T, D>) -> Point<T, D> {
self.inverse_transform_point(pt)
}
#[inline]
fn inverse_transform_vector(&self, v: &SVector<T, D>) -> SVector<T, D> {
*v
}
}
impl<T: RealField + simba::scalar::RealField, const D: usize> AffineTransformation<Point<T, D>>
for Translation<T, D>
{
type Rotation = Id;
type NonUniformScaling = Id;
type Translation = Self;
#[inline]
fn decompose(&self) -> (Self, Id, Id, Id) {
(*self, Id::new(), Id::new(), Id::new())
}
#[inline]
fn append_translation(&self, t: &Self::Translation) -> Self {
t * self
}
#[inline]
fn prepend_translation(&self, t: &Self::Translation) -> Self {
self * t
}
#[inline]
fn append_rotation(&self, _: &Self::Rotation) -> Self {
*self
}
#[inline]
fn prepend_rotation(&self, _: &Self::Rotation) -> Self {
*self
}
#[inline]
fn append_scaling(&self, _: &Self::NonUniformScaling) -> Self {
*self
}
#[inline]
fn prepend_scaling(&self, _: &Self::NonUniformScaling) -> Self {
*self
}
}
impl<T: RealField + simba::scalar::RealField, const D: usize> Similarity<Point<T, D>>
for Translation<T, D>
{
type Scaling = Id;
#[inline]
fn translation(&self) -> Self {
*self
}
#[inline]
fn rotation(&self) -> Id {
Id::new()
}
#[inline]
fn scaling(&self) -> Id {
Id::new()
}
}
macro_rules! marker_impl(
($($Trait: ident),*) => {$(
impl<T: RealField + simba::scalar::RealField, const D: usize> $Trait<Point<T, D>> for Translation<T, D>
{ }
)*}
);
marker_impl!(Isometry, DirectIsometry);
impl<T: RealField + simba::scalar::RealField, const D: usize> AlgaTranslation<Point<T, D>>
for Translation<T, D>
{
#[inline]
fn to_vector(&self) -> SVector<T, D> {
self.vector
}
#[inline]
fn from_vector(v: SVector<T, D>) -> Option<Self> {
Some(Self::from(v))
}
#[inline]
fn powf(&self, n: T) -> Option<Self> {
Some(Self::from(self.vector * n))
}
#[inline]
fn translation_between(a: &Point<T, D>, b: &Point<T, D>) -> Option<Self> {
Some(Self::from(b - a))
}
}