[−][src]Trait ndarray_linalg::solveh::SolveH
An interface for solving systems of Hermitian (or real symmetric) linear equations.
If you plan to solve many equations with the same Hermitian (or real
symmetric) coefficient matrix A but different b vectors, it's faster to
factor the A matrix once using the FactorizeH trait, and then solve
using the BKFactorized struct.
Required methods
fn solveh_inplace<'a, S: DataMut<Elem = A>>(
&self,
b: &'a mut ArrayBase<S, Ix1>
) -> Result<&'a mut ArrayBase<S, Ix1>>
&self,
b: &'a mut ArrayBase<S, Ix1>
) -> Result<&'a mut ArrayBase<S, Ix1>>
Solves a system of linear equations A * x = b with Hermitian (or real
symmetric) matrix A, where A is self, b is the argument, and
x is the successful result. The value of x is also assigned to the
argument.
Provided methods
fn solveh<S: Data<Elem = A>>(&self, b: &ArrayBase<S, Ix1>) -> Result<Array1<A>>
Solves a system of linear equations A * x = b with Hermitian (or real
symmetric) matrix A, where A is self, b is the argument, and
x is the successful result.
fn solveh_into<S: DataMut<Elem = A>>(
&self,
b: ArrayBase<S, Ix1>
) -> Result<ArrayBase<S, Ix1>>
&self,
b: ArrayBase<S, Ix1>
) -> Result<ArrayBase<S, Ix1>>
Solves a system of linear equations A * x = b with Hermitian (or real
symmetric) matrix A, where A is self, b is the argument, and
x is the successful result.
Implementations on Foreign Types
impl<A, S> SolveH<A> for ArrayBase<S, Ix2> where
A: Scalar + Lapack,
S: Data<Elem = A>, [src]
A: Scalar + Lapack,
S: Data<Elem = A>,
fn solveh_inplace<'a, Sb>(
&self,
rhs: &'a mut ArrayBase<Sb, Ix1>
) -> Result<&'a mut ArrayBase<Sb, Ix1>> where
Sb: DataMut<Elem = A>, [src]
&self,
rhs: &'a mut ArrayBase<Sb, Ix1>
) -> Result<&'a mut ArrayBase<Sb, Ix1>> where
Sb: DataMut<Elem = A>,
Implementors
impl<A, S> SolveH<A> for BKFactorized<S> where
A: Scalar + Lapack,
S: Data<Elem = A>, [src]
A: Scalar + Lapack,
S: Data<Elem = A>,