Type Definition nalgebra::base::SquareMatrix

pub type SquareMatrix<T, D, S> = Matrix<T, D, D, S>;

A square matrix.

Implementations

impl<T, D1: Dim, S: StorageMut<T, D1, D1>> SquareMatrix<T, D1, S> where
    T: Scalar + Zero + One + ClosedAdd + ClosedMul, 

pub fn quadform_tr_with_workspace<D2, S2, R3, C3, S3, D4, S4>(
    &mut self,
    work: &mut Vector<T, D2, S2>,
    alpha: T,
    lhs: &Matrix<T, R3, C3, S3>,
    mid: &SquareMatrix<T, D4, S4>,
    beta: T
) where
    D2: Dim,
    R3: Dim,
    C3: Dim,
    D4: Dim,
    S2: StorageMut<T, D2>,
    S3: Storage<T, R3, C3>,
    S4: Storage<T, D4, D4>,
    ShapeConstraint: DimEq<D1, D2> + DimEq<D1, R3> + DimEq<D2, R3> + DimEq<C3, D4>, 

Computes the quadratic form self = alpha * lhs * mid * lhs.transpose() + beta * self.

This uses the provided workspace work to avoid allocations for intermediate results.

Examples:

// Note that all those would also work with statically-sized matrices.
// We use DMatrix/DVector since that's the only case where pre-allocating the
// workspace is actually useful (assuming the same workspace is re-used for
// several computations) because it avoids repeated dynamic allocations.
let mut mat = DMatrix::identity(2, 2);
let lhs = DMatrix::from_row_slice(2, 3, &[1.0, 2.0, 3.0,
                                          4.0, 5.0, 6.0]);
let mid = DMatrix::from_row_slice(3, 3, &[0.1, 0.2, 0.3,
                                          0.5, 0.6, 0.7,
                                          0.9, 1.0, 1.1]);
// The random shows that values on the workspace do not
// matter as they will be overwritten.
let mut workspace = DVector::new_random(2);
let expected = &lhs * &mid * lhs.transpose() * 10.0 + &mat * 5.0;

mat.quadform_tr_with_workspace(&mut workspace, 10.0, &lhs, &mid, 5.0);
assert_relative_eq!(mat, expected);

pub fn quadform_tr<R3, C3, S3, D4, S4>(
    &mut self,
    alpha: T,
    lhs: &Matrix<T, R3, C3, S3>,
    mid: &SquareMatrix<T, D4, S4>,
    beta: T
) where
    R3: Dim,
    C3: Dim,
    D4: Dim,
    S3: Storage<T, R3, C3>,
    S4: Storage<T, D4, D4>,
    ShapeConstraint: DimEq<D1, D1> + DimEq<D1, R3> + DimEq<C3, D4>,
    DefaultAllocator: Allocator<T, D1>, 

Computes the quadratic form self = alpha * lhs * mid * lhs.transpose() + beta * self.

This allocates a workspace vector of dimension D1 for intermediate results. If D1 is a type-level integer, then the allocation is performed on the stack. Use .quadform_tr_with_workspace(...) instead to avoid allocations.

Examples:

let mut mat = Matrix2::identity();
let lhs = Matrix2x3::new(1.0, 2.0, 3.0,
                         4.0, 5.0, 6.0);
let mid = Matrix3::new(0.1, 0.2, 0.3,
                       0.5, 0.6, 0.7,
                       0.9, 1.0, 1.1);
let expected = lhs * mid * lhs.transpose() * 10.0 + mat * 5.0;

mat.quadform_tr(10.0, &lhs, &mid, 5.0);
assert_relative_eq!(mat, expected);

pub fn quadform_with_workspace<D2, S2, D3, S3, R4, C4, S4>(
    &mut self,
    work: &mut Vector<T, D2, S2>,
    alpha: T,
    mid: &SquareMatrix<T, D3, S3>,
    rhs: &Matrix<T, R4, C4, S4>,
    beta: T
) where
    D2: Dim,
    D3: Dim,
    R4: Dim,
    C4: Dim,
    S2: StorageMut<T, D2>,
    S3: Storage<T, D3, D3>,
    S4: Storage<T, R4, C4>,
    ShapeConstraint: DimEq<D3, R4> + DimEq<D1, C4> + DimEq<D2, D3> + AreMultipliable<C4, R4, D2, U1>, 

Computes the quadratic form self = alpha * rhs.transpose() * mid * rhs + beta * self.

This uses the provided workspace work to avoid allocations for intermediate results.

// Note that all those would also work with statically-sized matrices.
// We use DMatrix/DVector since that's the only case where pre-allocating the
// workspace is actually useful (assuming the same workspace is re-used for
// several computations) because it avoids repeated dynamic allocations.
let mut mat = DMatrix::identity(2, 2);
let rhs = DMatrix::from_row_slice(3, 2, &[1.0, 2.0,
                                          3.0, 4.0,
                                          5.0, 6.0]);
let mid = DMatrix::from_row_slice(3, 3, &[0.1, 0.2, 0.3,
                                          0.5, 0.6, 0.7,
                                          0.9, 1.0, 1.1]);
// The random shows that values on the workspace do not
// matter as they will be overwritten.
let mut workspace = DVector::new_random(3);
let expected = rhs.transpose() * &mid * &rhs * 10.0 + &mat * 5.0;

mat.quadform_with_workspace(&mut workspace, 10.0, &mid, &rhs, 5.0);
assert_relative_eq!(mat, expected);

pub fn quadform<D2, S2, R3, C3, S3>(
    &mut self,
    alpha: T,
    mid: &SquareMatrix<T, D2, S2>,
    rhs: &Matrix<T, R3, C3, S3>,
    beta: T
) where
    D2: Dim,
    R3: Dim,
    C3: Dim,
    S2: Storage<T, D2, D2>,
    S3: Storage<T, R3, C3>,
    ShapeConstraint: DimEq<D2, R3> + DimEq<D1, C3> + AreMultipliable<C3, R3, D2, U1>,
    DefaultAllocator: Allocator<T, D2>, 

Computes the quadratic form self = alpha * rhs.transpose() * mid * rhs + beta * self.

This allocates a workspace vector of dimension D2 for intermediate results. If D2 is a type-level integer, then the allocation is performed on the stack. Use .quadform_with_workspace(...) instead to avoid allocations.

let mut mat = Matrix2::identity();
let rhs = Matrix3x2::new(1.0, 2.0,
                         3.0, 4.0,
                         5.0, 6.0);
let mid = Matrix3::new(0.1, 0.2, 0.3,
                       0.5, 0.6, 0.7,
                       0.9, 1.0, 1.1);
let expected = rhs.transpose() * mid * rhs * 10.0 + mat * 5.0;

mat.quadform(10.0, &mid, &rhs, 5.0);
assert_relative_eq!(mat, expected);

impl<T: Scalar + Zero + One + ClosedMul + ClosedAdd, D: DimName, S: Storage<T, D, D>> SquareMatrix<T, D, S>

Append/prepend translation and scaling

pub fn append_scaling(&self, scaling: T) -> OMatrix<T, D, D> where
    D: DimNameSub<U1>,
    DefaultAllocator: Allocator<T, D, D>, 

Computes the transformation equal to self followed by an uniform scaling factor.

pub fn prepend_scaling(&self, scaling: T) -> OMatrix<T, D, D> where
    D: DimNameSub<U1>,
    DefaultAllocator: Allocator<T, D, D>, 

Computes the transformation equal to an uniform scaling factor followed by self.

pub fn append_nonuniform_scaling<SB>(
    &self,
    scaling: &Vector<T, DimNameDiff<D, U1>, SB>
) -> OMatrix<T, D, D> where
    D: DimNameSub<U1>,
    SB: Storage<T, DimNameDiff<D, U1>>,
    DefaultAllocator: Allocator<T, D, D>, 

Computes the transformation equal to self followed by a non-uniform scaling factor.

pub fn prepend_nonuniform_scaling<SB>(
    &self,
    scaling: &Vector<T, DimNameDiff<D, U1>, SB>
) -> OMatrix<T, D, D> where
    D: DimNameSub<U1>,
    SB: Storage<T, DimNameDiff<D, U1>>,
    DefaultAllocator: Allocator<T, D, D>, 

Computes the transformation equal to a non-uniform scaling factor followed by self.

pub fn append_translation<SB>(
    &self,
    shift: &Vector<T, DimNameDiff<D, U1>, SB>
) -> OMatrix<T, D, D> where
    D: DimNameSub<U1>,
    SB: Storage<T, DimNameDiff<D, U1>>,
    DefaultAllocator: Allocator<T, D, D>, 

Computes the transformation equal to self followed by a translation.

pub fn prepend_translation<SB>(
    &self,
    shift: &Vector<T, DimNameDiff<D, U1>, SB>
) -> OMatrix<T, D, D> where
    D: DimNameSub<U1>,
    SB: Storage<T, DimNameDiff<D, U1>>,
    DefaultAllocator: Allocator<T, D, D> + Allocator<T, DimNameDiff<D, U1>>, 

Computes the transformation equal to a translation followed by self.

pub fn append_scaling_mut(&mut self, scaling: T) where
    S: StorageMut<T, D, D>,
    D: DimNameSub<U1>, 

Computes in-place the transformation equal to self followed by an uniform scaling factor.

pub fn prepend_scaling_mut(&mut self, scaling: T) where
    S: StorageMut<T, D, D>,
    D: DimNameSub<U1>, 

Computes in-place the transformation equal to an uniform scaling factor followed by self.

pub fn append_nonuniform_scaling_mut<SB>(
    &mut self,
    scaling: &Vector<T, DimNameDiff<D, U1>, SB>
) where
    S: StorageMut<T, D, D>,
    D: DimNameSub<U1>,
    SB: Storage<T, DimNameDiff<D, U1>>, 

Computes in-place the transformation equal to self followed by a non-uniform scaling factor.

pub fn prepend_nonuniform_scaling_mut<SB>(
    &mut self,
    scaling: &Vector<T, DimNameDiff<D, U1>, SB>
) where
    S: StorageMut<T, D, D>,
    D: DimNameSub<U1>,
    SB: Storage<T, DimNameDiff<D, U1>>, 

Computes in-place the transformation equal to a non-uniform scaling factor followed by self.

pub fn append_translation_mut<SB>(
    &mut self,
    shift: &Vector<T, DimNameDiff<D, U1>, SB>
) where
    S: StorageMut<T, D, D>,
    D: DimNameSub<U1>,
    SB: Storage<T, DimNameDiff<D, U1>>, 

Computes the transformation equal to self followed by a translation.

pub fn prepend_translation_mut<SB>(
    &mut self,
    shift: &Vector<T, DimNameDiff<D, U1>, SB>
) where
    D: DimNameSub<U1>,
    S: StorageMut<T, D, D>,
    SB: Storage<T, DimNameDiff<D, U1>>,
    DefaultAllocator: Allocator<T, DimNameDiff<D, U1>>, 

Computes the transformation equal to a translation followed by self.

impl<T: RealField, D: DimNameSub<U1>, S: Storage<T, D, D>> SquareMatrix<T, D, S> where
    DefaultAllocator: Allocator<T, D, D> + Allocator<T, DimNameDiff<D, U1>> + Allocator<T, DimNameDiff<D, U1>, DimNameDiff<D, U1>>, 

Transformation of vectors and points

pub fn transform_vector(
    &self,
    v: &OVector<T, DimNameDiff<D, U1>>
) -> OVector<T, DimNameDiff<D, U1>>

Transforms the given vector, assuming the matrix self uses homogeneous coordinates.

impl<T: RealField, S: Storage<T, Const<3>, Const<3>>> SquareMatrix<T, Const<3>, S>

pub fn transform_point(&self, pt: &Point<T, 2>) -> Point<T, 2>

Transforms the given point, assuming the matrix self uses homogeneous coordinates.

impl<T: RealField, S: Storage<T, Const<4>, Const<4>>> SquareMatrix<T, Const<4>, S>

pub fn transform_point(&self, pt: &Point<T, 3>) -> Point<T, 3>

Transforms the given point, assuming the matrix self uses homogeneous coordinates.

impl<T: Scalar, D: Dim, S: RawStorage<T, D, D>> SquareMatrix<T, D, S>

pub fn diagonal(&self) -> OVector<T, D> where
    DefaultAllocator: Allocator<T, D>, 

The diagonal of this matrix.

pub fn map_diagonal<T2: Scalar>(&self, f: impl FnMut(T) -> T2) -> OVector<T2, D> where
    DefaultAllocator: Allocator<T2, D>, 

Apply the given function to this matrix’s diagonal and returns it.

This is a more efficient version of self.diagonal().map(f) since this allocates only once.

pub fn trace(&self) -> T where
    T: Scalar + Zero + ClosedAdd, 

Computes a trace of a square matrix, i.e., the sum of its diagonal elements.

impl<T: SimdComplexField, D: Dim, S: Storage<T, D, D>> SquareMatrix<T, D, S>

pub fn symmetric_part(&self) -> OMatrix<T, D, D> where
    DefaultAllocator: Allocator<T, D, D>, 

The symmetric part of self, i.e., 0.5 * (self + self.transpose()).

pub fn hermitian_part(&self) -> OMatrix<T, D, D> where
    DefaultAllocator: Allocator<T, D, D>, 

The hermitian part of self, i.e., 0.5 * (self + self.adjoint()).

impl<T: RealField, D: Dim, S: Storage<T, D, D>> SquareMatrix<T, D, S> where
    DefaultAllocator: Allocator<T, D, D>, 

pub fn is_special_orthogonal(&self, eps: T) -> bool where
    D: DimMin<D, Output = D>,
    DefaultAllocator: Allocator<(usize, usize), D>, 

Checks that this matrix is orthogonal and has a determinant equal to 1.

pub fn is_invertible(&self) -> bool

Returns true if this matrix is invertible.

impl<T: ComplexField, D: DimMin<D, Output = D>, S: Storage<T, D, D>> SquareMatrix<T, D, S>

pub fn determinant(&self) -> T where
    DefaultAllocator: Allocator<T, D, D> + Allocator<(usize, usize), D>, 

Computes the matrix determinant.

If the matrix has a dimension larger than 3, an LU decomposition is used.

impl<T: ComplexField, D: Dim, S: Storage<T, D, D>> SquareMatrix<T, D, S>

pub fn try_inverse(self) -> Option<OMatrix<T, D, D>> where
    DefaultAllocator: Allocator<T, D, D>, 

Attempts to invert this matrix.

impl<T: ComplexField, D: Dim, S: StorageMut<T, D, D>> SquareMatrix<T, D, S>

pub fn try_inverse_mut(&mut self) -> bool where
    DefaultAllocator: Allocator<T, D, D>, 

Attempts to invert this matrix in-place. Returns false and leaves self untouched if inversion fails.

impl<T: ComplexField, D: Dim, S: Storage<T, D, D>> SquareMatrix<T, D, S> where
    D: DimSub<U1>,
    DefaultAllocator: Allocator<T, D, DimDiff<D, U1>> + Allocator<T, DimDiff<D, U1>> + Allocator<T, D, D> + Allocator<T, D>, 

pub fn eigenvalues(&self) -> Option<OVector<T, D>>

Computes the eigenvalues of this matrix.

pub fn complex_eigenvalues(&self) -> OVector<NumComplex<T>, D> where
    T: RealField,
    DefaultAllocator: Allocator<NumComplex<T>, D>, 

Computes the eigenvalues of this matrix.

impl<T: ComplexField, D: Dim, S: Storage<T, D, D>> SquareMatrix<T, D, S>

pub fn solve_lower_triangular<R2: Dim, C2: Dim, S2>(
    &self,
    b: &Matrix<T, R2, C2, S2>
) -> Option<OMatrix<T, R2, C2>> where
    S2: Storage<T, R2, C2>,
    DefaultAllocator: Allocator<T, R2, C2>,
    ShapeConstraint: SameNumberOfRows<R2, D>, 

Computes the solution of the linear system self . x = b where x is the unknown and only the lower-triangular part of self (including the diagonal) is considered not-zero.

pub fn solve_upper_triangular<R2: Dim, C2: Dim, S2>(
    &self,
    b: &Matrix<T, R2, C2, S2>
) -> Option<OMatrix<T, R2, C2>> where
    S2: Storage<T, R2, C2>,
    DefaultAllocator: Allocator<T, R2, C2>,
    ShapeConstraint: SameNumberOfRows<R2, D>, 

Computes the solution of the linear system self . x = b where x is the unknown and only the upper-triangular part of self (including the diagonal) is considered not-zero.

pub fn solve_lower_triangular_mut<R2: Dim, C2: Dim, S2>(
    &self,
    b: &mut Matrix<T, R2, C2, S2>
) -> bool where
    S2: StorageMut<T, R2, C2>,
    ShapeConstraint: SameNumberOfRows<R2, D>, 

Solves the linear system self . x = b where x is the unknown and only the lower-triangular part of self (including the diagonal) is considered not-zero.

pub fn solve_lower_triangular_with_diag_mut<R2: Dim, C2: Dim, S2>(
    &self,
    b: &mut Matrix<T, R2, C2, S2>,
    diag: T
) -> bool where
    S2: StorageMut<T, R2, C2>,
    ShapeConstraint: SameNumberOfRows<R2, D>, 

Solves the linear system self . x = b where x is the unknown and only the lower-triangular part of self is considered not-zero. The diagonal is never read as it is assumed to be equal to diag. Returns false and does not modify its inputs if diag is zero.

pub fn solve_upper_triangular_mut<R2: Dim, C2: Dim, S2>(
    &self,
    b: &mut Matrix<T, R2, C2, S2>
) -> bool where
    S2: StorageMut<T, R2, C2>,
    ShapeConstraint: SameNumberOfRows<R2, D>, 

Solves the linear system self . x = b where x is the unknown and only the upper-triangular part of self (including the diagonal) is considered not-zero.

pub fn tr_solve_lower_triangular<R2: Dim, C2: Dim, S2>(
    &self,
    b: &Matrix<T, R2, C2, S2>
) -> Option<OMatrix<T, R2, C2>> where
    S2: Storage<T, R2, C2>,
    DefaultAllocator: Allocator<T, R2, C2>,
    ShapeConstraint: SameNumberOfRows<R2, D>, 

Computes the solution of the linear system self.transpose() . x = b where x is the unknown and only the lower-triangular part of self (including the diagonal) is considered not-zero.

pub fn tr_solve_upper_triangular<R2: Dim, C2: Dim, S2>(
    &self,
    b: &Matrix<T, R2, C2, S2>
) -> Option<OMatrix<T, R2, C2>> where
    S2: Storage<T, R2, C2>,
    DefaultAllocator: Allocator<T, R2, C2>,
    ShapeConstraint: SameNumberOfRows<R2, D>, 

Computes the solution of the linear system self.transpose() . x = b where x is the unknown and only the upper-triangular part of self (including the diagonal) is considered not-zero.

pub fn tr_solve_lower_triangular_mut<R2: Dim, C2: Dim, S2>(
    &self,
    b: &mut Matrix<T, R2, C2, S2>
) -> bool where
    S2: StorageMut<T, R2, C2>,
    ShapeConstraint: SameNumberOfRows<R2, D>, 

Solves the linear system self.transpose() . x = b where x is the unknown and only the lower-triangular part of self (including the diagonal) is considered not-zero.

pub fn tr_solve_upper_triangular_mut<R2: Dim, C2: Dim, S2>(
    &self,
    b: &mut Matrix<T, R2, C2, S2>
) -> bool where
    S2: StorageMut<T, R2, C2>,
    ShapeConstraint: SameNumberOfRows<R2, D>, 

Solves the linear system self.transpose() . x = b where x is the unknown and only the upper-triangular part of self (including the diagonal) is considered not-zero.

pub fn ad_solve_lower_triangular<R2: Dim, C2: Dim, S2>(
    &self,
    b: &Matrix<T, R2, C2, S2>
) -> Option<OMatrix<T, R2, C2>> where
    S2: Storage<T, R2, C2>,
    DefaultAllocator: Allocator<T, R2, C2>,
    ShapeConstraint: SameNumberOfRows<R2, D>, 

Computes the solution of the linear system self.adjoint() . x = b where x is the unknown and only the lower-triangular part of self (including the diagonal) is considered not-zero.

pub fn ad_solve_upper_triangular<R2: Dim, C2: Dim, S2>(
    &self,
    b: &Matrix<T, R2, C2, S2>
) -> Option<OMatrix<T, R2, C2>> where
    S2: Storage<T, R2, C2>,
    DefaultAllocator: Allocator<T, R2, C2>,
    ShapeConstraint: SameNumberOfRows<R2, D>, 

Computes the solution of the linear system self.adjoint() . x = b where x is the unknown and only the upper-triangular part of self (including the diagonal) is considered not-zero.

pub fn ad_solve_lower_triangular_mut<R2: Dim, C2: Dim, S2>(
    &self,
    b: &mut Matrix<T, R2, C2, S2>
) -> bool where
    S2: StorageMut<T, R2, C2>,
    ShapeConstraint: SameNumberOfRows<R2, D>, 

Solves the linear system self.adjoint() . x = b where x is the unknown and only the lower-triangular part of self (including the diagonal) is considered not-zero.

pub fn ad_solve_upper_triangular_mut<R2: Dim, C2: Dim, S2>(
    &self,
    b: &mut Matrix<T, R2, C2, S2>
) -> bool where
    S2: StorageMut<T, R2, C2>,
    ShapeConstraint: SameNumberOfRows<R2, D>, 

Solves the linear system self.adjoint() . x = b where x is the unknown and only the upper-triangular part of self (including the diagonal) is considered not-zero.

impl<T: SimdComplexField, D: Dim, S: Storage<T, D, D>> SquareMatrix<T, D, S>

pub fn solve_lower_triangular_unchecked<R2: Dim, C2: Dim, S2>(
    &self,
    b: &Matrix<T, R2, C2, S2>
) -> OMatrix<T, R2, C2> where
    S2: Storage<T, R2, C2>,
    DefaultAllocator: Allocator<T, R2, C2>,
    ShapeConstraint: SameNumberOfRows<R2, D>, 

Computes the solution of the linear system self . x = b where x is the unknown and only the lower-triangular part of self (including the diagonal) is considered not-zero.

pub fn solve_upper_triangular_unchecked<R2: Dim, C2: Dim, S2>(
    &self,
    b: &Matrix<T, R2, C2, S2>
) -> OMatrix<T, R2, C2> where
    S2: Storage<T, R2, C2>,
    DefaultAllocator: Allocator<T, R2, C2>,
    ShapeConstraint: SameNumberOfRows<R2, D>, 

Computes the solution of the linear system self . x = b where x is the unknown and only the upper-triangular part of self (including the diagonal) is considered not-zero.

pub fn solve_lower_triangular_unchecked_mut<R2: Dim, C2: Dim, S2>(
    &self,
    b: &mut Matrix<T, R2, C2, S2>
) where
    S2: StorageMut<T, R2, C2>,
    ShapeConstraint: SameNumberOfRows<R2, D>, 

Solves the linear system self . x = b where x is the unknown and only the lower-triangular part of self (including the diagonal) is considered not-zero.

pub fn solve_lower_triangular_with_diag_unchecked_mut<R2: Dim, C2: Dim, S2>(
    &self,
    b: &mut Matrix<T, R2, C2, S2>,
    diag: T
) where
    S2: StorageMut<T, R2, C2>,
    ShapeConstraint: SameNumberOfRows<R2, D>, 

Solves the linear system self . x = b where x is the unknown and only the lower-triangular part of self is considered not-zero. The diagonal is never read as it is assumed to be equal to diag. Returns false and does not modify its inputs if diag is zero.

pub fn solve_upper_triangular_unchecked_mut<R2: Dim, C2: Dim, S2>(
    &self,
    b: &mut Matrix<T, R2, C2, S2>
) where
    S2: StorageMut<T, R2, C2>,
    ShapeConstraint: SameNumberOfRows<R2, D>, 

Solves the linear system self . x = b where x is the unknown and only the upper-triangular part of self (including the diagonal) is considered not-zero.

pub fn tr_solve_lower_triangular_unchecked<R2: Dim, C2: Dim, S2>(
    &self,
    b: &Matrix<T, R2, C2, S2>
) -> OMatrix<T, R2, C2> where
    S2: Storage<T, R2, C2>,
    DefaultAllocator: Allocator<T, R2, C2>,
    ShapeConstraint: SameNumberOfRows<R2, D>, 

Computes the solution of the linear system self.transpose() . x = b where x is the unknown and only the lower-triangular part of self (including the diagonal) is considered not-zero.

pub fn tr_solve_upper_triangular_unchecked<R2: Dim, C2: Dim, S2>(
    &self,
    b: &Matrix<T, R2, C2, S2>
) -> OMatrix<T, R2, C2> where
    S2: Storage<T, R2, C2>,
    DefaultAllocator: Allocator<T, R2, C2>,
    ShapeConstraint: SameNumberOfRows<R2, D>, 

Computes the solution of the linear system self.transpose() . x = b where x is the unknown and only the upper-triangular part of self (including the diagonal) is considered not-zero.

pub fn tr_solve_lower_triangular_unchecked_mut<R2: Dim, C2: Dim, S2>(
    &self,
    b: &mut Matrix<T, R2, C2, S2>
) where
    S2: StorageMut<T, R2, C2>,
    ShapeConstraint: SameNumberOfRows<R2, D>, 

Solves the linear system self.transpose() . x = b where x is the unknown and only the lower-triangular part of self (including the diagonal) is considered not-zero.

pub fn tr_solve_upper_triangular_unchecked_mut<R2: Dim, C2: Dim, S2>(
    &self,
    b: &mut Matrix<T, R2, C2, S2>
) where
    S2: StorageMut<T, R2, C2>,
    ShapeConstraint: SameNumberOfRows<R2, D>, 

Solves the linear system self.transpose() . x = b where x is the unknown and only the upper-triangular part of self (including the diagonal) is considered not-zero.

pub fn ad_solve_lower_triangular_unchecked<R2: Dim, C2: Dim, S2>(
    &self,
    b: &Matrix<T, R2, C2, S2>
) -> OMatrix<T, R2, C2> where
    S2: Storage<T, R2, C2>,
    DefaultAllocator: Allocator<T, R2, C2>,
    ShapeConstraint: SameNumberOfRows<R2, D>, 

Computes the solution of the linear system self.adjoint() . x = b where x is the unknown and only the lower-triangular part of self (including the diagonal) is considered not-zero.

pub fn ad_solve_upper_triangular_unchecked<R2: Dim, C2: Dim, S2>(
    &self,
    b: &Matrix<T, R2, C2, S2>
) -> OMatrix<T, R2, C2> where
    S2: Storage<T, R2, C2>,
    DefaultAllocator: Allocator<T, R2, C2>,
    ShapeConstraint: SameNumberOfRows<R2, D>, 

Computes the solution of the linear system self.adjoint() . x = b where x is the unknown and only the upper-triangular part of self (including the diagonal) is considered not-zero.

pub fn ad_solve_lower_triangular_unchecked_mut<R2: Dim, C2: Dim, S2>(
    &self,
    b: &mut Matrix<T, R2, C2, S2>
) where
    S2: StorageMut<T, R2, C2>,
    ShapeConstraint: SameNumberOfRows<R2, D>, 

Solves the linear system self.adjoint() . x = b where x is the unknown and only the lower-triangular part of self (including the diagonal) is considered not-zero.

pub fn ad_solve_upper_triangular_unchecked_mut<R2: Dim, C2: Dim, S2>(
    &self,
    b: &mut Matrix<T, R2, C2, S2>
) where
    S2: StorageMut<T, R2, C2>,
    ShapeConstraint: SameNumberOfRows<R2, D>, 

Solves the linear system self.adjoint() . x = b where x is the unknown and only the upper-triangular part of self (including the diagonal) is considered not-zero.

impl<T: ComplexField, D: DimSub<U1>, S: Storage<T, D, D>> SquareMatrix<T, D, S> where
    DefaultAllocator: Allocator<T, D, D> + Allocator<T, DimDiff<D, U1>> + Allocator<T::RealField, D> + Allocator<T::RealField, DimDiff<D, U1>>, 

pub fn symmetric_eigenvalues(&self) -> OVector<T::RealField, D>

Computes the eigenvalues of this symmetric matrix.

Only the lower-triangular part of the matrix is read.