hpr¶

Computes a rank-1 update of a Hermitian packed matrix.

hpr supports the following precisions.

T

std::complex<float>

std::complex<double>

Description

The hpr routines compute a scalar-vector-vector product and add the result to a Hermitian packed matrix. The operation is defined as

A <- alpha*x*x ^H + A

where:

alpha is scalar,

A is an n-by-n Hermitian matrix, supplied in packed form,

x is a vector of length n.

hpr (Buffer Version)¶

Syntax

void onemkl::blas::hpr(sycl::queue &queue, onemkl::uplo upper_lower, std::int64_t n, T alpha, sycl::buffer<T, 1> &x, std::int64_t incx, sycl::buffer<T, 1> &a)¶

Input Parameters

queue

The queue where the routine should be executed.

upper_lower

Specifies whether A is upper or lower triangular. See oneMKL defined datatypes for more details.

n

Number of rows and columns of A. Must be at least zero.

alpha

Scaling factor for the matrix-vector product.

x

Buffer holding input vector x. The buffer must be of size at least (1 + (n - 1)*abs(incx)). See Matrix and Vector Storage for more details.

incx

Stride of vector x.

a

Buffer holding input matrix A. Must have size at least (n*(n-1))/2. See Matrix and Vector Storage for more details.

The imaginary part of the diagonal elements need not be set and are assumed to be zero.

Output Parameters

a

Buffer holding the updated upper triangular part of the Hermitian matrix A if upper_lower =upper, or the updated lower triangular part of the Hermitian matrix A if upper_lower =lower.

The imaginary parts of the diagonal elements are set to zero.

hpr (USM Version)¶

Syntax

sycl::event onemkl::blas::hpr(sycl::queue &queue, onemkl::uplo upper_lower, std::int64_t n, T alpha, const T *x, std::int64_t incx, T *a, const sycl::vector_class<sycl::event> &dependencies = {})¶

Input Parameters

queue

The queue where the routine should be executed.

upper_lower

Specifies whether A is upper or lower triangular. See oneMKL defined datatypes for more details.

n

Number of rows and columns of A. Must be at least zero.

alpha

Scaling factor for the matrix-vector product.

x

Pointer to input vector x. The array holding input vector x must be of size at least (1 + (n - 1)*abs(incx)). See Matrix and Vector Storage for more details.

incx

Stride of vector x.

a

Pointer to input matrix A. The array holding input matrix A must have size at least (n*(n-1))/2. See Matrix and Vector Storage for more details.

The imaginary part of the diagonal elements need not be set and are assumed to be zero.

dependencies

List of events to wait for before starting computation, if any. If omitted, defaults to no dependencies.

Output Parameters

a

Pointer to the updated upper triangular part of the Hermitian matrix A if upper_lower =upper, or the updated lower triangular part of the Hermitian matrix A if upper_lower =lower.

The imaginary parts of the diagonal elements are set to zero.

Return Values

Output event to wait on to ensure computation is complete.

Parent topic: BLAS Level 2 Routines