Inter-particle distances
Table of Contents
1 Squared distance
1.1 qmckl_distance_sq
qmckl_distance_sq computes the matrix of the squared distances
between all pairs of points in two sets, one point within each set:
\[ C_{ij} = \sum_{k=1}^3 (A_{k,i}-B_{k,j})^2 \]
| qmcklcontext | context | in | Global state |
| char | transa | in | Array A is 'N': Normal, 'T': Transposed |
| char | transb | in | Array B is 'N': Normal, 'T': Transposed |
| int64t | m | in | Number of points in the first set |
| int64t | n | in | Number of points in the second set |
| double | A[][lda] | in | Array containing the \(m \times 3\) matrix \(A\) |
| int64t | lda | in | Leading dimension of array A |
| double | B[][ldb] | in | Array containing the \(n \times 3\) matrix \(B\) |
| int64t | ldb | in | Leading dimension of array B |
| double | C[n][ldc] | out | Array containing the \(m \times n\) matrix \(C\) |
| int64t | ldc | in | Leading dimension of array C |
1.1.1 Requirements
contextis notQMCKL_NULL_CONTEXTm > 0n > 0lda >= 3iftransa == 'N'lda >= miftransa == 'T'ldb >= 3iftransb == 'N'ldb >= niftransb == 'T'ldc >= mAis allocated with at least \(3 \times m \times 8\) bytesBis allocated with at least \(3 \times n \times 8\) bytesCis allocated with at least \(m \times n \times 8\) bytes
1.1.2 C header
qmckl_exit_code qmckl_distance_sq ( const qmckl_context context, const char transa, const char transb, const int64_t m, const int64_t n, const double* A, const int64_t lda, const double* B, const int64_t ldb, double* const C, const int64_t ldc );
1.1.3 Source
integer function qmckl_distance_sq_f(context, transa, transb, m, n, A, LDA, B, LDB, C, LDC) result(info) use qmckl implicit none integer(qmckl_context) , intent(in) :: context character , intent(in) :: transa, transb integer*8 , intent(in) :: m, n integer*8 , intent(in) :: lda real*8 , intent(in) :: A(lda,*) integer*8 , intent(in) :: ldb real*8 , intent(in) :: B(ldb,*) integer*8 , intent(in) :: ldc real*8 , intent(out) :: C(ldc,*) integer*8 :: i,j real*8 :: x, y, z integer :: transab info = 0 if (context == QMCKL_NULL_CONTEXT) then info = QMCKL_INVALID_CONTEXT return endif if (m <= 0_8) then info = QMCKL_INVALID_ARG_4 return endif if (n <= 0_8) then info = QMCKL_INVALID_ARG_5 return endif if (transa == 'N' .or. transa == 'n') then transab = 0 else if (transa == 'T' .or. transa == 't') then transab = 1 else transab = -100 endif if (transb == 'N' .or. transb == 'n') then continue else if (transa == 'T' .or. transa == 't') then transab = transab + 2 else transab = -100 endif if (transab < 0) then info = QMCKL_INVALID_ARG_1 return endif if (iand(transab,1) == 0 .and. LDA < 3) then info = QMCKL_INVALID_ARG_7 return endif if (iand(transab,1) == 1 .and. LDA < m) then info = QMCKL_INVALID_ARG_7 return endif if (iand(transab,2) == 0 .and. LDA < 3) then info = QMCKL_INVALID_ARG_7 return endif if (iand(transab,2) == 2 .and. LDA < m) then info = QMCKL_INVALID_ARG_7 return endif select case (transab) case(0) do j=1,n do i=1,m x = A(1,i) - B(1,j) y = A(2,i) - B(2,j) z = A(3,i) - B(3,j) C(i,j) = x*x + y*y + z*z end do end do case(1) do j=1,n do i=1,m x = A(i,1) - B(1,j) y = A(i,2) - B(2,j) z = A(i,3) - B(3,j) C(i,j) = x*x + y*y + z*z end do end do case(2) do j=1,n do i=1,m x = A(1,i) - B(j,1) y = A(2,i) - B(j,2) z = A(3,i) - B(j,3) C(i,j) = x*x + y*y + z*z end do end do case(3) do j=1,n do i=1,m x = A(i,1) - B(j,1) y = A(i,2) - B(j,2) z = A(i,3) - B(j,3) C(i,j) = x*x + y*y + z*z end do end do end select end function qmckl_distance_sq_f
1.1.4 Performance
This function might be more efficient when A and B are
transposed.