gemm¶
Computes a matrix-matrix product with general matrices.
Description
The gemm
routines compute a scalar-matrix-matrix product and add the
result to a scalar-matrix product, with general matrices. The
operation is defined as:
where:
op(X
) is one of op(X
) = X
, or op(X
) = X
T, or
op(X
) = X
H,
alpha
and beta
are scalars,
A
, B
and C
are matrices,
op(A)
is an m
-by-k
matrix,
op(B)
is a k
-by-n
matrix,
C
is an m
-by-n
matrix.
gemm
supports the following precisions.
Ts
Ta
Tb
Tc
float
half
half
float
half
half
half
half
float
bfloat16
bfloat16
float
float
float
float
float
double
double
double
double
std::complex<float>
std::complex<float>
std::complex<float>
std::complex<float>
std::complex<double>
std::complex<double>
std::complex<double>
std::complex<double>
gemm (Buffer Version)¶
Syntax
namespace oneapi::mkl::blas::column_major {
void gemm(sycl::queue &queue,
onemkl::transpose transa,
onemkl::transpose transb,
std::int64_t m,
std::int64_t n,
std::int64_t k,
Ts alpha,
sycl::buffer<Ta,1> &a,
std::int64_t lda,
sycl::buffer<Tb,1> &b,
std::int64_t ldb,
Ts beta,
sycl::buffer<Tc,1> &c,
std::int64_t ldc)
}
namespace oneapi::mkl::blas::row_major {
void gemm(sycl::queue &queue,
onemkl::transpose transa,
onemkl::transpose transb,
std::int64_t m,
std::int64_t n,
std::int64_t k,
Ts alpha,
sycl::buffer<Ta,1> &a,
std::int64_t lda,
sycl::buffer<Tb,1> &b,
std::int64_t ldb,
Ts beta,
sycl::buffer<Tc,1> &c,
std::int64_t ldc)
}
Input Parameters
- queue
The queue where the routine should be executed.
- transa
Specifies the form of op(
A
), the transposition operation applied toA
.- transb
Specifies the form of op(
B
), the transposition operation applied toB
.- m
Specifies the number of rows of the matrix op(
A
) and of the matrixC
. The value of m must be at least zero.- n
Specifies the number of columns of the matrix op(
B
) and the number of columns of the matrixC
. The value of n must be at least zero.- k
Specifies the number of columns of the matrix op(
A
) and the number of rows of the matrix op(B
). The value of k must be at least zero.- alpha
Scaling factor for the matrix-matrix product.
- a
The buffer holding the input matrix
A
.A
not transposedA
transposedColumn major
A
is anm
-by-k
matrix so the arraya
must have size at leastlda
*k
.A
is ank
-by-m
matrix so the arraya
must have size at leastlda
*m
Row major
A
is anm
-by-k
matrix so the arraya
must have size at leastlda
*m
.A
is ank
-by-m
matrix so the arraya
must have size at leastlda
*k
See Matrix Storage for more details.
- lda
The leading dimension of
A
. It must be positive.A
not transposedA
transposedColumn major
lda
must be at leastm
.lda
must be at leastk
.Row major
lda
must be at leastk
.lda
must be at leastm
.- b
The buffer holding the input matrix
B
.B
not transposedB
transposedColumn major
B
is ank
-by-n
matrix so the arrayb
must have size at leastldb
*n
.B
is ann
-by-k
matrix so the arrayb
must have size at leastldb
*k
Row major
B
is ank
-by-n
matrix so the arrayb
must have size at leastldb
*k
.B
is ann
-by-k
matrix so the arrayb
must have size at leastldb
*n
See Matrix Storage for more details.
- ldb
The leading dimension of
B
. It must be positive.B
not transposedB
transposedColumn major
ldb
must be at leastk
.ldb
must be at leastn
.Row major
ldb
must be at leastn
.ldb
must be at leastk
.- beta
Scaling factor for matrix
C
.- c
The buffer holding the input/output matrix
C
. It must have a size of at leastldc
*n
if column major layout is used to store matrices or at leastldc
*m
if row major layout is used to store matrices . See Matrix Storage for more details.- ldc
The leading dimension of
C
. It must be positive and at leastm
if column major layout is used to store matrices or at leastn
if column major layout is used to store matrices.
Output Parameters
- c
The buffer, which is overwritten by
alpha
*op(A
)*op(B
) +beta
*C
.
Notes
If beta
= 0, matrix C
does not need to be initialized before
calling gemm
.
Throws
This routine shall throw the following exceptions if the associated condition is detected. An implementation may throw additional implementation-specific exception(s) in case of error conditions not covered here.
gemm (USM Version)¶
Syntax
namespace oneapi::mkl::blas::column_major {
sycl::event gemm(sycl::queue &queue,
onemkl::transpose transa,
onemkl::transpose transb,
std::int64_t m,
std::int64_t n,
std::int64_t k,
Ts alpha,
const Ta *a,
std::int64_t lda,
const Tb *b,
std::int64_t ldb,
Ts beta,
Tc *c,
std::int64_t ldc,
const std::vector<sycl::event> &dependencies = {})
}
namespace oneapi::mkl::blas::row_major {
sycl::event gemm(sycl::queue &queue,
onemkl::transpose transa,
onemkl::transpose transb,
std::int64_t m,
std::int64_t n,
std::int64_t k,
Ts alpha,
const Ta *a,
std::int64_t lda,
const Tb *b,
std::int64_t ldb,
Ts beta,
Tc *c,
std::int64_t ldc,
const std::vector<sycl::event> &dependencies = {})
}
Input Parameters
- queue
The queue where the routine should be executed.
- transa
Specifies the form of op(
A
), the transposition operation applied toA
.- transb
Specifies the form of op(
B
), the transposition operation applied toB
.- m
Specifies the number of rows of the matrix op(
A
) and of the matrixC
. The value of m must be at least zero.- n
Specifies the number of columns of the matrix op(
B
) and the number of columns of the matrixC
. The value of n must be at least zero.- k
Specifies the number of columns of the matrix op(
A
) and the number of rows of the matrix op(B
). The value of k must be at least zero.- alpha
Scaling factor for the matrix-matrix product.
- a
Pointer to input matrix
A
.A
not transposedA
transposedColumn major
A
is anm
-by-k
matrix so the arraya
must have size at leastlda
*k
.A
is ank
-by-m
matrix so the arraya
must have size at leastlda
*m
Row major
A
is anm
-by-k
matrix so the arraya
must have size at leastlda
*m
.A
is ank
-by-m
matrix so the arraya
must have size at leastlda
*k
See Matrix Storage for more details.
- lda
The leading dimension of
A
. It must be positive.A
not transposedA
transposedColumn major
lda
must be at leastm
.lda
must be at leastk
.Row major
lda
must be at leastk
.lda
must be at leastm
.- b
Pointer to input matrix
B
.B
not transposedB
transposedColumn major
B
is ank
-by-n
matrix so the arrayb
must have size at leastldb
*n
.B
is ann
-by-k
matrix so the arrayb
must have size at leastldb
*k
Row major
B
is ank
-by-n
matrix so the arrayb
must have size at leastldb
*k
.B
is ann
-by-k
matrix so the arrayb
must have size at leastldb
*n
See Matrix Storage for more details.
- ldb
The leading dimension of
B
. It must be positive.B
not transposedB
transposedColumn major
ldb
must be at leastk
.ldb
must be at leastn
.Row major
ldb
must be at leastn
.ldb
must be at leastk
.- beta
Scaling factor for matrix
C
.- c
The pointer to input/output matrix
C
. It must have a size of at leastldc
*n
if column major layout is used to store matrices or at leastldc
*m
if row major layout is used to store matrices . See Matrix Storage for more details.- ldc
The leading dimension of
C
. It must be positive and at leastm
if column major layout is used to store matrices or at leastn
if column major layout is used to store matrices.- dependencies
List of events to wait for before starting computation, if any. If omitted, defaults to no dependencies.
Output Parameters
- c
Pointer to the output matrix, overwritten by
alpha
*op(A
)*op(B
) +beta
*C
.
Notes
If beta
= 0, matrix C
does not need to be initialized
before calling gemm
.
Return Values
Output event to wait on to ensure computation is complete.
Throws
This routine shall throw the following exceptions if the associated condition is detected. An implementation may throw additional implementation-specific exception(s) in case of error conditions not covered here.
oneapi::mkl::unsupported_device
Parent topic: BLAS Level 3 Routines