GEMM on empty matrices: properly take the beta parameter into account.
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@ -565,7 +565,14 @@ where
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);
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if ncols2 == 0 {
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// NOTE: we can't just always multiply by beta
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// because we documented the guaranty that `self` is
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// never read if `beta` is zero.
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if beta.is_zero() {
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self.fill(N::zero());
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} else {
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*self *= beta;
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}
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return;
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}
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@ -992,11 +999,29 @@ where N: Scalar + Zero + ClosedAdd + ClosedMul
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#[cfg(feature = "std")]
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{
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// We assume large matrices will be Dynamic but small matrices static.
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// We could use matrixmultiply for large statically-sized matrices but the performance
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// threshold to activate it would be different from SMALL_DIM because our code optimizes
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// better for statically-sized matrices.
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if R1::is::<Dynamic>()
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|| C1::is::<Dynamic>()
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|| R2::is::<Dynamic>()
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|| C2::is::<Dynamic>()
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|| R3::is::<Dynamic>()
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|| C3::is::<Dynamic>() {
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// matrixmultiply can be used only if the std feature is available.
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let nrows1 = self.nrows();
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let (nrows2, ncols2) = a.shape();
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let (nrows3, ncols3) = b.shape();
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// Threshold determined empirically.
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const SMALL_DIM: usize = 5;
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if nrows1 > SMALL_DIM
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&& ncols1 > SMALL_DIM
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&& nrows2 > SMALL_DIM
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&& ncols2 > SMALL_DIM
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{
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assert_eq!(
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ncols2, nrows3,
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"gemm: dimensions mismatch for multiplication."
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@ -1007,31 +1032,22 @@ where N: Scalar + Zero + ClosedAdd + ClosedMul
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"gemm: dimensions mismatch for addition."
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);
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if a.ncols() == 0 {
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// NOTE: this case should never happen because we enter this
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// codepath only when ncols2 > SMALL_DIM. Though we keep this
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// here just in case if in the future we change the conditions to
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// enter this codepath.
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if ncols2 == 0 {
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// NOTE: we can't just always multiply by beta
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// because we documented the guaranty that `self` is
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// never read if `beta` is zero.
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if beta.is_zero() {
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self.fill(N::zero());
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} else {
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*self *= beta;
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}
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return;
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}
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// We assume large matrices will be Dynamic but small matrices static.
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// We could use matrixmultiply for large statically-sized matrices but the performance
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// threshold to activate it would be different from SMALL_DIM because our code optimizes
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// better for statically-sized matrices.
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let is_dynamic = R1::is::<Dynamic>()
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|| C1::is::<Dynamic>()
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|| R2::is::<Dynamic>()
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|| C2::is::<Dynamic>()
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|| R3::is::<Dynamic>()
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|| C3::is::<Dynamic>();
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// Threshold determined empirically.
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const SMALL_DIM: usize = 5;
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if is_dynamic
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&& nrows1 > SMALL_DIM
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&& ncols1 > SMALL_DIM
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&& nrows2 > SMALL_DIM
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&& ncols2 > SMALL_DIM
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{
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if N::is::<f32>() {
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let (rsa, csa) = a.strides();
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let (rsb, csb) = b.strides();
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@ -1083,6 +1099,8 @@ where N: Scalar + Zero + ClosedAdd + ClosedMul
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}
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}
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}
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}
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for j1 in 0..ncols1 {
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// FIXME: avoid bound checks.
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@ -13,6 +13,11 @@ fn empty_matrix_mul_matrix() {
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let m1 = DMatrix::<f32>::zeros(3, 0);
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let m2 = DMatrix::<f32>::zeros(0, 4);
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assert_eq!(m1 * m2, DMatrix::zeros(3, 4));
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// Still works with larger matrices.
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let m1 = DMatrix::<f32>::zeros(13, 0);
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let m2 = DMatrix::<f32>::zeros(0, 14);
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assert_eq!(m1 * m2, DMatrix::zeros(13, 14));
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}
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#[test]
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@ -28,3 +33,28 @@ fn empty_matrix_tr_mul_matrix() {
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let m2 = DMatrix::<f32>::zeros(0, 4);
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assert_eq!(m1.tr_mul(&m2), DMatrix::zeros(3, 4));
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}
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#[test]
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fn empty_matrix_gemm() {
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let mut res = DMatrix::repeat(3, 4, 1.0);
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let m1 = DMatrix::<f32>::zeros(3, 0);
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let m2 = DMatrix::<f32>::zeros(0, 4);
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res.gemm(1.0, &m1, &m2, 0.5);
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assert_eq!(res, DMatrix::repeat(3, 4, 0.5));
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// Still works with lager matrices.
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let mut res = DMatrix::repeat(13, 14, 1.0);
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let m1 = DMatrix::<f32>::zeros(13, 0);
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let m2 = DMatrix::<f32>::zeros(0, 14);
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res.gemm(1.0, &m1, &m2, 0.5);
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assert_eq!(res, DMatrix::repeat(13, 14, 0.5));
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}
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#[test]
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fn empty_matrix_gemm_tr() {
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let mut res = DMatrix::repeat(3, 4, 1.0);
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let m1 = DMatrix::<f32>::zeros(0, 3);
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let m2 = DMatrix::<f32>::zeros(0, 4);
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res.gemm_tr(1.0, &m1, &m2, 0.5);
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assert_eq!(res, DMatrix::repeat(3, 4, 0.5));
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}
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