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FastTransforms
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FastTransforms
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| Cdouble3 | |
| Cft_annulus_fftw_plan | |
| Cft_disk_fftw_plan | |
| Cft_gradient_plan | |
| Cft_harmonic_plan | Data structure to store ft_rotation_plans, arrays to represent 1D orthogonal polynomial transforms and their inverses, and Greek parameters |
| Cft_helmholtzhodge_plan | |
| Cft_mpfr_triangular_banded | |
| Cft_orthogonal_transformation | A static struct to store an orthogonal matrix \(Q \in \mathbb{R}^{3\times3}\), such that \(Q^\top Q = I\). \(Q\) has column-major storage |
| Cft_partial_sph_isometry_plan | |
| Cft_rectdisk_fftw_plan | |
| Cft_reflection | A static struct to store a reflection about the plane \(w\cdot x = 0\) in \(\mathbb{R}^3\) |
| Cft_sph_isometry_plan | |
| Cft_sphere_fftw_plan | |
| Cft_spin_harmonic_plan | Data structure to store a ft_spin_rotation_plan, and various arrays to represent 1D orthogonal polynomial transforms |
| Cft_spinsphere_fftw_plan | |
| Cft_tetrahedron_fftw_plan | |
| Cft_triangle_fftw_plan | |
| Cft_ZYZR | Every orthogonal matrix \(Q \in \mathbb{R}^{3\times3}\) can be decomposed as a product of \(ZYZ\) Euler angles and, if necessary, a reflection \(R\) about the \(xy\)-plane |
1.12.0