pub enum TAffine {}
Expand description
Tag representing an affine Transform
. Its bottom-row is equal to (0, 0 ... 0, 1)
.
Trait Implementations§
source§impl PartialEq<TAffine> for TAffine
impl PartialEq<TAffine> for TAffine
source§impl TCategory for TAffine
impl TCategory for TAffine
source§fn has_normalizer() -> bool
fn has_normalizer() -> bool
Indicates whether a
Transform
with the category Self
has a bottom-row different from
0 0 .. 1
.source§fn check_homogeneous_invariants<T, D>(
mat: &Matrix<T, D, D, <DefaultAllocator as Allocator<T, D, D>>::Buffer>
) -> boolwhere
T: RealField,
D: DimName,
<T as AbsDiffEq<T>>::Epsilon: Clone,
DefaultAllocator: Allocator<T, D, D>,
fn check_homogeneous_invariants<T, D>( mat: &Matrix<T, D, D, <DefaultAllocator as Allocator<T, D, D>>::Buffer> ) -> boolwhere T: RealField, D: DimName, <T as AbsDiffEq<T>>::Epsilon: Clone, DefaultAllocator: Allocator<T, D, D>,
Checks that the given matrix is a valid homogeneous representation of an element of the
category
Self
.source§impl TCategoryMul<TAffine> for TGeneral
impl TCategoryMul<TAffine> for TGeneral
§type Representative = TGeneral
type Representative = TGeneral
The transform category that results from the multiplication of a
Transform<Self>
to a
Transform<Other>
. This is usually equal to Self
or Other
, whichever is the most
general category.source§impl TCategoryMul<TAffine> for TProjective
impl TCategoryMul<TAffine> for TProjective
§type Representative = TProjective
type Representative = TProjective
The transform category that results from the multiplication of a
Transform<Self>
to a
Transform<Other>
. This is usually equal to Self
or Other
, whichever is the most
general category.source§impl TCategoryMul<TGeneral> for TAffine
impl TCategoryMul<TGeneral> for TAffine
§type Representative = TGeneral
type Representative = TGeneral
The transform category that results from the multiplication of a
Transform<Self>
to a
Transform<Other>
. This is usually equal to Self
or Other
, whichever is the most
general category.source§impl TCategoryMul<TProjective> for TAffine
impl TCategoryMul<TProjective> for TAffine
§type Representative = TProjective
type Representative = TProjective
The transform category that results from the multiplication of a
Transform<Self>
to a
Transform<Other>
. This is usually equal to Self
or Other
, whichever is the most
general category.impl Copy for TAffine
impl Eq for TAffine
impl StructuralEq for TAffine
impl StructuralPartialEq for TAffine
impl SuperTCategoryOf<TAffine> for TGeneral
impl SuperTCategoryOf<TAffine> for TProjective
Auto Trait Implementations§
impl RefUnwindSafe for TAffine
impl Send for TAffine
impl Sync for TAffine
impl Unpin for TAffine
impl UnwindSafe for TAffine
Blanket Implementations§
source§impl<T> BorrowMut<T> for Twhere
T: ?Sized,
impl<T> BorrowMut<T> for Twhere T: ?Sized,
source§fn borrow_mut(&mut self) -> &mut T
fn borrow_mut(&mut self) -> &mut T
Mutably borrows from an owned value. Read more
§impl<T> Downcast for Twhere
T: Any,
impl<T> Downcast for Twhere T: Any,
§fn into_any(self: Box<T, Global>) -> Box<dyn Any, Global>
fn into_any(self: Box<T, Global>) -> Box<dyn Any, Global>
Convert
Box<dyn Trait>
(where Trait: Downcast
) to Box<dyn Any>
. Box<dyn Any>
can
then be further downcast
into Box<ConcreteType>
where ConcreteType
implements Trait
.§fn into_any_rc(self: Rc<T, Global>) -> Rc<dyn Any, Global>
fn into_any_rc(self: Rc<T, Global>) -> Rc<dyn Any, Global>
Convert
Rc<Trait>
(where Trait: Downcast
) to Rc<Any>
. Rc<Any>
can then be
further downcast
into Rc<ConcreteType>
where ConcreteType
implements Trait
.§fn as_any(&self) -> &(dyn Any + 'static)
fn as_any(&self) -> &(dyn Any + 'static)
Convert
&Trait
(where Trait: Downcast
) to &Any
. This is needed since Rust cannot
generate &Any
’s vtable from &Trait
’s.§fn as_any_mut(&mut self) -> &mut (dyn Any + 'static)
fn as_any_mut(&mut self) -> &mut (dyn Any + 'static)
Convert
&mut Trait
(where Trait: Downcast
) to &Any
. This is needed since Rust cannot
generate &mut Any
’s vtable from &mut Trait
’s.§impl<Q, K> Equivalent<K> for Qwhere
Q: Eq + ?Sized,
K: Borrow<Q> + ?Sized,
impl<Q, K> Equivalent<K> for Qwhere Q: Eq + ?Sized, K: Borrow<Q> + ?Sized,
§fn equivalent(&self, key: &K) -> bool
fn equivalent(&self, key: &K) -> bool
Checks if this value is equivalent to the given key. Read more
§impl<Q, K> Equivalent<K> for Qwhere
Q: Eq + ?Sized,
K: Borrow<Q> + ?Sized,
impl<Q, K> Equivalent<K> for Qwhere Q: Eq + ?Sized, K: Borrow<Q> + ?Sized,
§fn equivalent(&self, key: &K) -> bool
fn equivalent(&self, key: &K) -> bool
Compare self to
key
and return true
if they are equal.§impl<Q, K> Equivalent<K> for Qwhere
Q: Eq + ?Sized,
K: Borrow<Q> + ?Sized,
impl<Q, K> Equivalent<K> for Qwhere Q: Eq + ?Sized, K: Borrow<Q> + ?Sized,
§fn equivalent(&self, key: &K) -> bool
fn equivalent(&self, key: &K) -> bool
Checks if this value is equivalent to the given key. Read more
source§impl<Q, K> Equivalent<K> for Qwhere
Q: Eq + ?Sized,
K: Borrow<Q> + ?Sized,
impl<Q, K> Equivalent<K> for Qwhere Q: Eq + ?Sized, K: Borrow<Q> + ?Sized,
source§fn equivalent(&self, key: &K) -> bool
fn equivalent(&self, key: &K) -> bool
Compare self to
key
and return true
if they are equal.§impl<SS, SP> SupersetOf<SS> for SPwhere
SS: SubsetOf<SP>,
impl<SS, SP> SupersetOf<SS> for SPwhere SS: SubsetOf<SP>,
§fn to_subset(&self) -> Option<SS>
fn to_subset(&self) -> Option<SS>
The inverse inclusion map: attempts to construct
self
from the equivalent element of its
superset. Read more§fn is_in_subset(&self) -> bool
fn is_in_subset(&self) -> bool
Checks if
self
is actually part of its subset T
(and can be converted to it).§fn to_subset_unchecked(&self) -> SS
fn to_subset_unchecked(&self) -> SS
Use with care! Same as
self.to_subset
but without any property checks. Always succeeds.§fn from_subset(element: &SS) -> SP
fn from_subset(element: &SS) -> SP
The inclusion map: converts
self
to the equivalent element of its superset.source§impl<T> TCategoryMul<T> for Twhere
T: TCategory,
impl<T> TCategoryMul<T> for Twhere T: TCategory,
§type Representative = T
type Representative = T
The transform category that results from the multiplication of a
Transform<Self>
to a
Transform<Other>
. This is usually equal to Self
or Other
, whichever is the most
general category.