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| import sys | |
| import torch | |
| from torch._C import _add_docstr, _fft # type: ignore[attr-defined] | |
| from torch._torch_docs import factory_common_args, common_args | |
| __all__ = ['fft', 'ifft', 'fft2', 'ifft2', 'fftn', 'ifftn', | |
| 'rfft', 'irfft', 'rfft2', 'irfft2', 'rfftn', 'irfftn', | |
| 'hfft', 'ihfft', 'fftfreq', 'rfftfreq', 'fftshift', 'ifftshift', | |
| 'Tensor'] | |
| Tensor = torch.Tensor | |
| # Note: This not only adds the doc strings for the spectral ops, but | |
| # connects the torch.fft Python namespace to the torch._C._fft builtins. | |
| fft = _add_docstr(_fft.fft_fft, r""" | |
| fft(input, n=None, dim=-1, norm=None, *, out=None) -> Tensor | |
| Computes the one dimensional discrete Fourier transform of :attr:`input`. | |
| Note: | |
| The Fourier domain representation of any real signal satisfies the | |
| Hermitian property: `X[i] = conj(X[-i])`. This function always returns both | |
| the positive and negative frequency terms even though, for real inputs, the | |
| negative frequencies are redundant. :func:`~torch.fft.rfft` returns the | |
| more compact one-sided representation where only the positive frequencies | |
| are returned. | |
| Note: | |
| Supports torch.half and torch.chalf on CUDA with GPU Architecture SM53 or greater. | |
| However it only supports powers of 2 signal length in every transformed dimension. | |
| Args: | |
| input (Tensor): the input tensor | |
| n (int, optional): Signal length. If given, the input will either be zero-padded | |
| or trimmed to this length before computing the FFT. | |
| dim (int, optional): The dimension along which to take the one dimensional FFT. | |
| norm (str, optional): Normalization mode. For the forward transform | |
| (:func:`~torch.fft.fft`), these correspond to: | |
| * ``"forward"`` - normalize by ``1/n`` | |
| * ``"backward"`` - no normalization | |
| * ``"ortho"`` - normalize by ``1/sqrt(n)`` (making the FFT orthonormal) | |
| Calling the backward transform (:func:`~torch.fft.ifft`) with the same | |
| normalization mode will apply an overall normalization of ``1/n`` between | |
| the two transforms. This is required to make :func:`~torch.fft.ifft` | |
| the exact inverse. | |
| Default is ``"backward"`` (no normalization). | |
| Keyword args: | |
| {out} | |
| Example: | |
| >>> t = torch.arange(4) | |
| >>> t | |
| tensor([0, 1, 2, 3]) | |
| >>> torch.fft.fft(t) | |
| tensor([ 6.+0.j, -2.+2.j, -2.+0.j, -2.-2.j]) | |
| >>> t = torch.tensor([0.+1.j, 2.+3.j, 4.+5.j, 6.+7.j]) | |
| >>> torch.fft.fft(t) | |
| tensor([12.+16.j, -8.+0.j, -4.-4.j, 0.-8.j]) | |
| """.format(**common_args)) | |
| ifft = _add_docstr(_fft.fft_ifft, r""" | |
| ifft(input, n=None, dim=-1, norm=None, *, out=None) -> Tensor | |
| Computes the one dimensional inverse discrete Fourier transform of :attr:`input`. | |
| Note: | |
| Supports torch.half and torch.chalf on CUDA with GPU Architecture SM53 or greater. | |
| However it only supports powers of 2 signal length in every transformed dimension. | |
| Args: | |
| input (Tensor): the input tensor | |
| n (int, optional): Signal length. If given, the input will either be zero-padded | |
| or trimmed to this length before computing the IFFT. | |
| dim (int, optional): The dimension along which to take the one dimensional IFFT. | |
| norm (str, optional): Normalization mode. For the backward transform | |
| (:func:`~torch.fft.ifft`), these correspond to: | |
| * ``"forward"`` - no normalization | |
| * ``"backward"`` - normalize by ``1/n`` | |
| * ``"ortho"`` - normalize by ``1/sqrt(n)`` (making the IFFT orthonormal) | |
| Calling the forward transform (:func:`~torch.fft.fft`) with the same | |
| normalization mode will apply an overall normalization of ``1/n`` between | |
| the two transforms. This is required to make :func:`~torch.fft.ifft` | |
| the exact inverse. | |
| Default is ``"backward"`` (normalize by ``1/n``). | |
| Keyword args: | |
| {out} | |
| Example: | |
| >>> t = torch.tensor([ 6.+0.j, -2.+2.j, -2.+0.j, -2.-2.j]) | |
| >>> torch.fft.ifft(t) | |
| tensor([0.+0.j, 1.+0.j, 2.+0.j, 3.+0.j]) | |
| """.format(**common_args)) | |
| fft2 = _add_docstr(_fft.fft_fft2, r""" | |
| fft2(input, s=None, dim=(-2, -1), norm=None, *, out=None) -> Tensor | |
| Computes the 2 dimensional discrete Fourier transform of :attr:`input`. | |
| Equivalent to :func:`~torch.fft.fftn` but FFTs only the last two dimensions by default. | |
| Note: | |
| The Fourier domain representation of any real signal satisfies the | |
| Hermitian property: ``X[i, j] = conj(X[-i, -j])``. This | |
| function always returns all positive and negative frequency terms even | |
| though, for real inputs, half of these values are redundant. | |
| :func:`~torch.fft.rfft2` returns the more compact one-sided representation | |
| where only the positive frequencies of the last dimension are returned. | |
| Note: | |
| Supports torch.half and torch.chalf on CUDA with GPU Architecture SM53 or greater. | |
| However it only supports powers of 2 signal length in every transformed dimensions. | |
| Args: | |
| input (Tensor): the input tensor | |
| s (Tuple[int], optional): Signal size in the transformed dimensions. | |
| If given, each dimension ``dim[i]`` will either be zero-padded or | |
| trimmed to the length ``s[i]`` before computing the FFT. | |
| If a length ``-1`` is specified, no padding is done in that dimension. | |
| Default: ``s = [input.size(d) for d in dim]`` | |
| dim (Tuple[int], optional): Dimensions to be transformed. | |
| Default: last two dimensions. | |
| norm (str, optional): Normalization mode. For the forward transform | |
| (:func:`~torch.fft.fft2`), these correspond to: | |
| * ``"forward"`` - normalize by ``1/n`` | |
| * ``"backward"`` - no normalization | |
| * ``"ortho"`` - normalize by ``1/sqrt(n)`` (making the FFT orthonormal) | |
| Where ``n = prod(s)`` is the logical FFT size. | |
| Calling the backward transform (:func:`~torch.fft.ifft2`) with the same | |
| normalization mode will apply an overall normalization of ``1/n`` | |
| between the two transforms. This is required to make | |
| :func:`~torch.fft.ifft2` the exact inverse. | |
| Default is ``"backward"`` (no normalization). | |
| Keyword args: | |
| {out} | |
| Example: | |
| >>> x = torch.rand(10, 10, dtype=torch.complex64) | |
| >>> fft2 = torch.fft.fft2(x) | |
| The discrete Fourier transform is separable, so :func:`~torch.fft.fft2` | |
| here is equivalent to two one-dimensional :func:`~torch.fft.fft` calls: | |
| >>> two_ffts = torch.fft.fft(torch.fft.fft(x, dim=0), dim=1) | |
| >>> torch.testing.assert_close(fft2, two_ffts, check_stride=False) | |
| """.format(**common_args)) | |
| ifft2 = _add_docstr(_fft.fft_ifft2, r""" | |
| ifft2(input, s=None, dim=(-2, -1), norm=None, *, out=None) -> Tensor | |
| Computes the 2 dimensional inverse discrete Fourier transform of :attr:`input`. | |
| Equivalent to :func:`~torch.fft.ifftn` but IFFTs only the last two dimensions by default. | |
| Note: | |
| Supports torch.half and torch.chalf on CUDA with GPU Architecture SM53 or greater. | |
| However it only supports powers of 2 signal length in every transformed dimensions. | |
| Args: | |
| input (Tensor): the input tensor | |
| s (Tuple[int], optional): Signal size in the transformed dimensions. | |
| If given, each dimension ``dim[i]`` will either be zero-padded or | |
| trimmed to the length ``s[i]`` before computing the IFFT. | |
| If a length ``-1`` is specified, no padding is done in that dimension. | |
| Default: ``s = [input.size(d) for d in dim]`` | |
| dim (Tuple[int], optional): Dimensions to be transformed. | |
| Default: last two dimensions. | |
| norm (str, optional): Normalization mode. For the backward transform | |
| (:func:`~torch.fft.ifft2`), these correspond to: | |
| * ``"forward"`` - no normalization | |
| * ``"backward"`` - normalize by ``1/n`` | |
| * ``"ortho"`` - normalize by ``1/sqrt(n)`` (making the IFFT orthonormal) | |
| Where ``n = prod(s)`` is the logical IFFT size. | |
| Calling the forward transform (:func:`~torch.fft.fft2`) with the same | |
| normalization mode will apply an overall normalization of ``1/n`` between | |
| the two transforms. This is required to make :func:`~torch.fft.ifft2` | |
| the exact inverse. | |
| Default is ``"backward"`` (normalize by ``1/n``). | |
| Keyword args: | |
| {out} | |
| Example: | |
| >>> x = torch.rand(10, 10, dtype=torch.complex64) | |
| >>> ifft2 = torch.fft.ifft2(x) | |
| The discrete Fourier transform is separable, so :func:`~torch.fft.ifft2` | |
| here is equivalent to two one-dimensional :func:`~torch.fft.ifft` calls: | |
| >>> two_iffts = torch.fft.ifft(torch.fft.ifft(x, dim=0), dim=1) | |
| >>> torch.testing.assert_close(ifft2, two_iffts, check_stride=False) | |
| """.format(**common_args)) | |
| fftn = _add_docstr(_fft.fft_fftn, r""" | |
| fftn(input, s=None, dim=None, norm=None, *, out=None) -> Tensor | |
| Computes the N dimensional discrete Fourier transform of :attr:`input`. | |
| Note: | |
| The Fourier domain representation of any real signal satisfies the | |
| Hermitian property: ``X[i_1, ..., i_n] = conj(X[-i_1, ..., -i_n])``. This | |
| function always returns all positive and negative frequency terms even | |
| though, for real inputs, half of these values are redundant. | |
| :func:`~torch.fft.rfftn` returns the more compact one-sided representation | |
| where only the positive frequencies of the last dimension are returned. | |
| Note: | |
| Supports torch.half and torch.chalf on CUDA with GPU Architecture SM53 or greater. | |
| However it only supports powers of 2 signal length in every transformed dimensions. | |
| Args: | |
| input (Tensor): the input tensor | |
| s (Tuple[int], optional): Signal size in the transformed dimensions. | |
| If given, each dimension ``dim[i]`` will either be zero-padded or | |
| trimmed to the length ``s[i]`` before computing the FFT. | |
| If a length ``-1`` is specified, no padding is done in that dimension. | |
| Default: ``s = [input.size(d) for d in dim]`` | |
| dim (Tuple[int], optional): Dimensions to be transformed. | |
| Default: all dimensions, or the last ``len(s)`` dimensions if :attr:`s` is given. | |
| norm (str, optional): Normalization mode. For the forward transform | |
| (:func:`~torch.fft.fftn`), these correspond to: | |
| * ``"forward"`` - normalize by ``1/n`` | |
| * ``"backward"`` - no normalization | |
| * ``"ortho"`` - normalize by ``1/sqrt(n)`` (making the FFT orthonormal) | |
| Where ``n = prod(s)`` is the logical FFT size. | |
| Calling the backward transform (:func:`~torch.fft.ifftn`) with the same | |
| normalization mode will apply an overall normalization of ``1/n`` | |
| between the two transforms. This is required to make | |
| :func:`~torch.fft.ifftn` the exact inverse. | |
| Default is ``"backward"`` (no normalization). | |
| Keyword args: | |
| {out} | |
| Example: | |
| >>> x = torch.rand(10, 10, dtype=torch.complex64) | |
| >>> fftn = torch.fft.fftn(x) | |
| The discrete Fourier transform is separable, so :func:`~torch.fft.fftn` | |
| here is equivalent to two one-dimensional :func:`~torch.fft.fft` calls: | |
| >>> two_ffts = torch.fft.fft(torch.fft.fft(x, dim=0), dim=1) | |
| >>> torch.testing.assert_close(fftn, two_ffts, check_stride=False) | |
| """.format(**common_args)) | |
| ifftn = _add_docstr(_fft.fft_ifftn, r""" | |
| ifftn(input, s=None, dim=None, norm=None, *, out=None) -> Tensor | |
| Computes the N dimensional inverse discrete Fourier transform of :attr:`input`. | |
| Note: | |
| Supports torch.half and torch.chalf on CUDA with GPU Architecture SM53 or greater. | |
| However it only supports powers of 2 signal length in every transformed dimensions. | |
| Args: | |
| input (Tensor): the input tensor | |
| s (Tuple[int], optional): Signal size in the transformed dimensions. | |
| If given, each dimension ``dim[i]`` will either be zero-padded or | |
| trimmed to the length ``s[i]`` before computing the IFFT. | |
| If a length ``-1`` is specified, no padding is done in that dimension. | |
| Default: ``s = [input.size(d) for d in dim]`` | |
| dim (Tuple[int], optional): Dimensions to be transformed. | |
| Default: all dimensions, or the last ``len(s)`` dimensions if :attr:`s` is given. | |
| norm (str, optional): Normalization mode. For the backward transform | |
| (:func:`~torch.fft.ifftn`), these correspond to: | |
| * ``"forward"`` - no normalization | |
| * ``"backward"`` - normalize by ``1/n`` | |
| * ``"ortho"`` - normalize by ``1/sqrt(n)`` (making the IFFT orthonormal) | |
| Where ``n = prod(s)`` is the logical IFFT size. | |
| Calling the forward transform (:func:`~torch.fft.fftn`) with the same | |
| normalization mode will apply an overall normalization of ``1/n`` between | |
| the two transforms. This is required to make :func:`~torch.fft.ifftn` | |
| the exact inverse. | |
| Default is ``"backward"`` (normalize by ``1/n``). | |
| Keyword args: | |
| {out} | |
| Example: | |
| >>> x = torch.rand(10, 10, dtype=torch.complex64) | |
| >>> ifftn = torch.fft.ifftn(x) | |
| The discrete Fourier transform is separable, so :func:`~torch.fft.ifftn` | |
| here is equivalent to two one-dimensional :func:`~torch.fft.ifft` calls: | |
| >>> two_iffts = torch.fft.ifft(torch.fft.ifft(x, dim=0), dim=1) | |
| >>> torch.testing.assert_close(ifftn, two_iffts, check_stride=False) | |
| """.format(**common_args)) | |
| rfft = _add_docstr(_fft.fft_rfft, r""" | |
| rfft(input, n=None, dim=-1, norm=None, *, out=None) -> Tensor | |
| Computes the one dimensional Fourier transform of real-valued :attr:`input`. | |
| The FFT of a real signal is Hermitian-symmetric, ``X[i] = conj(X[-i])`` so | |
| the output contains only the positive frequencies below the Nyquist frequency. | |
| To compute the full output, use :func:`~torch.fft.fft` | |
| Note: | |
| Supports torch.half on CUDA with GPU Architecture SM53 or greater. | |
| However it only supports powers of 2 signal length in every transformed dimension. | |
| Args: | |
| input (Tensor): the real input tensor | |
| n (int, optional): Signal length. If given, the input will either be zero-padded | |
| or trimmed to this length before computing the real FFT. | |
| dim (int, optional): The dimension along which to take the one dimensional real FFT. | |
| norm (str, optional): Normalization mode. For the forward transform | |
| (:func:`~torch.fft.rfft`), these correspond to: | |
| * ``"forward"`` - normalize by ``1/n`` | |
| * ``"backward"`` - no normalization | |
| * ``"ortho"`` - normalize by ``1/sqrt(n)`` (making the FFT orthonormal) | |
| Calling the backward transform (:func:`~torch.fft.irfft`) with the same | |
| normalization mode will apply an overall normalization of ``1/n`` between | |
| the two transforms. This is required to make :func:`~torch.fft.irfft` | |
| the exact inverse. | |
| Default is ``"backward"`` (no normalization). | |
| Keyword args: | |
| {out} | |
| Example: | |
| >>> t = torch.arange(4) | |
| >>> t | |
| tensor([0, 1, 2, 3]) | |
| >>> torch.fft.rfft(t) | |
| tensor([ 6.+0.j, -2.+2.j, -2.+0.j]) | |
| Compare against the full output from :func:`~torch.fft.fft`: | |
| >>> torch.fft.fft(t) | |
| tensor([ 6.+0.j, -2.+2.j, -2.+0.j, -2.-2.j]) | |
| Notice that the symmetric element ``T[-1] == T[1].conj()`` is omitted. | |
| At the Nyquist frequency ``T[-2] == T[2]`` is it's own symmetric pair, | |
| and therefore must always be real-valued. | |
| """.format(**common_args)) | |
| irfft = _add_docstr(_fft.fft_irfft, r""" | |
| irfft(input, n=None, dim=-1, norm=None, *, out=None) -> Tensor | |
| Computes the inverse of :func:`~torch.fft.rfft`. | |
| :attr:`input` is interpreted as a one-sided Hermitian signal in the Fourier | |
| domain, as produced by :func:`~torch.fft.rfft`. By the Hermitian property, the | |
| output will be real-valued. | |
| Note: | |
| Some input frequencies must be real-valued to satisfy the Hermitian | |
| property. In these cases the imaginary component will be ignored. | |
| For example, any imaginary component in the zero-frequency term cannot | |
| be represented in a real output and so will always be ignored. | |
| Note: | |
| The correct interpretation of the Hermitian input depends on the length of | |
| the original data, as given by :attr:`n`. This is because each input shape | |
| could correspond to either an odd or even length signal. By default, the | |
| signal is assumed to be even length and odd signals will not round-trip | |
| properly. So, it is recommended to always pass the signal length :attr:`n`. | |
| Note: | |
| Supports torch.half and torch.chalf on CUDA with GPU Architecture SM53 or greater. | |
| However it only supports powers of 2 signal length in every transformed dimension. | |
| With default arguments, size of the transformed dimension should be (2^n + 1) as argument | |
| `n` defaults to even output size = 2 * (transformed_dim_size - 1) | |
| Args: | |
| input (Tensor): the input tensor representing a half-Hermitian signal | |
| n (int, optional): Output signal length. This determines the length of the | |
| output signal. If given, the input will either be zero-padded or trimmed to this | |
| length before computing the real IFFT. | |
| Defaults to even output: ``n=2*(input.size(dim) - 1)``. | |
| dim (int, optional): The dimension along which to take the one dimensional real IFFT. | |
| norm (str, optional): Normalization mode. For the backward transform | |
| (:func:`~torch.fft.irfft`), these correspond to: | |
| * ``"forward"`` - no normalization | |
| * ``"backward"`` - normalize by ``1/n`` | |
| * ``"ortho"`` - normalize by ``1/sqrt(n)`` (making the real IFFT orthonormal) | |
| Calling the forward transform (:func:`~torch.fft.rfft`) with the same | |
| normalization mode will apply an overall normalization of ``1/n`` between | |
| the two transforms. This is required to make :func:`~torch.fft.irfft` | |
| the exact inverse. | |
| Default is ``"backward"`` (normalize by ``1/n``). | |
| Keyword args: | |
| {out} | |
| Example: | |
| >>> t = torch.linspace(0, 1, 5) | |
| >>> t | |
| tensor([0.0000, 0.2500, 0.5000, 0.7500, 1.0000]) | |
| >>> T = torch.fft.rfft(t) | |
| >>> T | |
| tensor([ 2.5000+0.0000j, -0.6250+0.8602j, -0.6250+0.2031j]) | |
| Without specifying the output length to :func:`~torch.fft.irfft`, the output | |
| will not round-trip properly because the input is odd-length: | |
| >>> torch.fft.irfft(T) | |
| tensor([0.1562, 0.3511, 0.7812, 1.2114]) | |
| So, it is recommended to always pass the signal length :attr:`n`: | |
| >>> roundtrip = torch.fft.irfft(T, t.numel()) | |
| >>> torch.testing.assert_close(roundtrip, t, check_stride=False) | |
| """.format(**common_args)) | |
| rfft2 = _add_docstr(_fft.fft_rfft2, r""" | |
| rfft2(input, s=None, dim=(-2, -1), norm=None, *, out=None) -> Tensor | |
| Computes the 2-dimensional discrete Fourier transform of real :attr:`input`. | |
| Equivalent to :func:`~torch.fft.rfftn` but FFTs only the last two dimensions by default. | |
| The FFT of a real signal is Hermitian-symmetric, ``X[i, j] = conj(X[-i, -j])``, | |
| so the full :func:`~torch.fft.fft2` output contains redundant information. | |
| :func:`~torch.fft.rfft2` instead omits the negative frequencies in the last | |
| dimension. | |
| Note: | |
| Supports torch.half on CUDA with GPU Architecture SM53 or greater. | |
| However it only supports powers of 2 signal length in every transformed dimensions. | |
| Args: | |
| input (Tensor): the input tensor | |
| s (Tuple[int], optional): Signal size in the transformed dimensions. | |
| If given, each dimension ``dim[i]`` will either be zero-padded or | |
| trimmed to the length ``s[i]`` before computing the real FFT. | |
| If a length ``-1`` is specified, no padding is done in that dimension. | |
| Default: ``s = [input.size(d) for d in dim]`` | |
| dim (Tuple[int], optional): Dimensions to be transformed. | |
| Default: last two dimensions. | |
| norm (str, optional): Normalization mode. For the forward transform | |
| (:func:`~torch.fft.rfft2`), these correspond to: | |
| * ``"forward"`` - normalize by ``1/n`` | |
| * ``"backward"`` - no normalization | |
| * ``"ortho"`` - normalize by ``1/sqrt(n)`` (making the real FFT orthonormal) | |
| Where ``n = prod(s)`` is the logical FFT size. | |
| Calling the backward transform (:func:`~torch.fft.irfft2`) with the same | |
| normalization mode will apply an overall normalization of ``1/n`` between | |
| the two transforms. This is required to make :func:`~torch.fft.irfft2` | |
| the exact inverse. | |
| Default is ``"backward"`` (no normalization). | |
| Keyword args: | |
| {out} | |
| Example: | |
| >>> t = torch.rand(10, 10) | |
| >>> rfft2 = torch.fft.rfft2(t) | |
| >>> rfft2.size() | |
| torch.Size([10, 6]) | |
| Compared against the full output from :func:`~torch.fft.fft2`, we have all | |
| elements up to the Nyquist frequency. | |
| >>> fft2 = torch.fft.fft2(t) | |
| >>> torch.testing.assert_close(fft2[..., :6], rfft2, check_stride=False) | |
| The discrete Fourier transform is separable, so :func:`~torch.fft.rfft2` | |
| here is equivalent to a combination of :func:`~torch.fft.fft` and | |
| :func:`~torch.fft.rfft`: | |
| >>> two_ffts = torch.fft.fft(torch.fft.rfft(t, dim=1), dim=0) | |
| >>> torch.testing.assert_close(rfft2, two_ffts, check_stride=False) | |
| """.format(**common_args)) | |
| irfft2 = _add_docstr(_fft.fft_irfft2, r""" | |
| irfft2(input, s=None, dim=(-2, -1), norm=None, *, out=None) -> Tensor | |
| Computes the inverse of :func:`~torch.fft.rfft2`. | |
| Equivalent to :func:`~torch.fft.irfftn` but IFFTs only the last two dimensions by default. | |
| :attr:`input` is interpreted as a one-sided Hermitian signal in the Fourier | |
| domain, as produced by :func:`~torch.fft.rfft2`. By the Hermitian property, the | |
| output will be real-valued. | |
| Note: | |
| Some input frequencies must be real-valued to satisfy the Hermitian | |
| property. In these cases the imaginary component will be ignored. | |
| For example, any imaginary component in the zero-frequency term cannot | |
| be represented in a real output and so will always be ignored. | |
| Note: | |
| The correct interpretation of the Hermitian input depends on the length of | |
| the original data, as given by :attr:`s`. This is because each input shape | |
| could correspond to either an odd or even length signal. By default, the | |
| signal is assumed to be even length and odd signals will not round-trip | |
| properly. So, it is recommended to always pass the signal shape :attr:`s`. | |
| Note: | |
| Supports torch.half and torch.chalf on CUDA with GPU Architecture SM53 or greater. | |
| However it only supports powers of 2 signal length in every transformed dimensions. | |
| With default arguments, the size of last dimension should be (2^n + 1) as argument | |
| `s` defaults to even output size = 2 * (last_dim_size - 1) | |
| Args: | |
| input (Tensor): the input tensor | |
| s (Tuple[int], optional): Signal size in the transformed dimensions. | |
| If given, each dimension ``dim[i]`` will either be zero-padded or | |
| trimmed to the length ``s[i]`` before computing the real FFT. | |
| If a length ``-1`` is specified, no padding is done in that dimension. | |
| Defaults to even output in the last dimension: | |
| ``s[-1] = 2*(input.size(dim[-1]) - 1)``. | |
| dim (Tuple[int], optional): Dimensions to be transformed. | |
| The last dimension must be the half-Hermitian compressed dimension. | |
| Default: last two dimensions. | |
| norm (str, optional): Normalization mode. For the backward transform | |
| (:func:`~torch.fft.irfft2`), these correspond to: | |
| * ``"forward"`` - no normalization | |
| * ``"backward"`` - normalize by ``1/n`` | |
| * ``"ortho"`` - normalize by ``1/sqrt(n)`` (making the real IFFT orthonormal) | |
| Where ``n = prod(s)`` is the logical IFFT size. | |
| Calling the forward transform (:func:`~torch.fft.rfft2`) with the same | |
| normalization mode will apply an overall normalization of ``1/n`` between | |
| the two transforms. This is required to make :func:`~torch.fft.irfft2` | |
| the exact inverse. | |
| Default is ``"backward"`` (normalize by ``1/n``). | |
| Keyword args: | |
| {out} | |
| Example: | |
| >>> t = torch.rand(10, 9) | |
| >>> T = torch.fft.rfft2(t) | |
| Without specifying the output length to :func:`~torch.fft.irfft2`, the output | |
| will not round-trip properly because the input is odd-length in the last | |
| dimension: | |
| >>> torch.fft.irfft2(T).size() | |
| torch.Size([10, 8]) | |
| So, it is recommended to always pass the signal shape :attr:`s`. | |
| >>> roundtrip = torch.fft.irfft2(T, t.size()) | |
| >>> roundtrip.size() | |
| torch.Size([10, 9]) | |
| >>> torch.testing.assert_close(roundtrip, t, check_stride=False) | |
| """.format(**common_args)) | |
| rfftn = _add_docstr(_fft.fft_rfftn, r""" | |
| rfftn(input, s=None, dim=None, norm=None, *, out=None) -> Tensor | |
| Computes the N-dimensional discrete Fourier transform of real :attr:`input`. | |
| The FFT of a real signal is Hermitian-symmetric, | |
| ``X[i_1, ..., i_n] = conj(X[-i_1, ..., -i_n])`` so the full | |
| :func:`~torch.fft.fftn` output contains redundant information. | |
| :func:`~torch.fft.rfftn` instead omits the negative frequencies in the | |
| last dimension. | |
| Note: | |
| Supports torch.half on CUDA with GPU Architecture SM53 or greater. | |
| However it only supports powers of 2 signal length in every transformed dimensions. | |
| Args: | |
| input (Tensor): the input tensor | |
| s (Tuple[int], optional): Signal size in the transformed dimensions. | |
| If given, each dimension ``dim[i]`` will either be zero-padded or | |
| trimmed to the length ``s[i]`` before computing the real FFT. | |
| If a length ``-1`` is specified, no padding is done in that dimension. | |
| Default: ``s = [input.size(d) for d in dim]`` | |
| dim (Tuple[int], optional): Dimensions to be transformed. | |
| Default: all dimensions, or the last ``len(s)`` dimensions if :attr:`s` is given. | |
| norm (str, optional): Normalization mode. For the forward transform | |
| (:func:`~torch.fft.rfftn`), these correspond to: | |
| * ``"forward"`` - normalize by ``1/n`` | |
| * ``"backward"`` - no normalization | |
| * ``"ortho"`` - normalize by ``1/sqrt(n)`` (making the real FFT orthonormal) | |
| Where ``n = prod(s)`` is the logical FFT size. | |
| Calling the backward transform (:func:`~torch.fft.irfftn`) with the same | |
| normalization mode will apply an overall normalization of ``1/n`` between | |
| the two transforms. This is required to make :func:`~torch.fft.irfftn` | |
| the exact inverse. | |
| Default is ``"backward"`` (no normalization). | |
| Keyword args: | |
| {out} | |
| Example: | |
| >>> t = torch.rand(10, 10) | |
| >>> rfftn = torch.fft.rfftn(t) | |
| >>> rfftn.size() | |
| torch.Size([10, 6]) | |
| Compared against the full output from :func:`~torch.fft.fftn`, we have all | |
| elements up to the Nyquist frequency. | |
| >>> fftn = torch.fft.fftn(t) | |
| >>> torch.testing.assert_close(fftn[..., :6], rfftn, check_stride=False) | |
| The discrete Fourier transform is separable, so :func:`~torch.fft.rfftn` | |
| here is equivalent to a combination of :func:`~torch.fft.fft` and | |
| :func:`~torch.fft.rfft`: | |
| >>> two_ffts = torch.fft.fft(torch.fft.rfft(t, dim=1), dim=0) | |
| >>> torch.testing.assert_close(rfftn, two_ffts, check_stride=False) | |
| """.format(**common_args)) | |
| irfftn = _add_docstr(_fft.fft_irfftn, r""" | |
| irfftn(input, s=None, dim=None, norm=None, *, out=None) -> Tensor | |
| Computes the inverse of :func:`~torch.fft.rfftn`. | |
| :attr:`input` is interpreted as a one-sided Hermitian signal in the Fourier | |
| domain, as produced by :func:`~torch.fft.rfftn`. By the Hermitian property, the | |
| output will be real-valued. | |
| Note: | |
| Some input frequencies must be real-valued to satisfy the Hermitian | |
| property. In these cases the imaginary component will be ignored. | |
| For example, any imaginary component in the zero-frequency term cannot | |
| be represented in a real output and so will always be ignored. | |
| Note: | |
| The correct interpretation of the Hermitian input depends on the length of | |
| the original data, as given by :attr:`s`. This is because each input shape | |
| could correspond to either an odd or even length signal. By default, the | |
| signal is assumed to be even length and odd signals will not round-trip | |
| properly. So, it is recommended to always pass the signal shape :attr:`s`. | |
| Note: | |
| Supports torch.half and torch.chalf on CUDA with GPU Architecture SM53 or greater. | |
| However it only supports powers of 2 signal length in every transformed dimensions. | |
| With default arguments, the size of last dimension should be (2^n + 1) as argument | |
| `s` defaults to even output size = 2 * (last_dim_size - 1) | |
| Args: | |
| input (Tensor): the input tensor | |
| s (Tuple[int], optional): Signal size in the transformed dimensions. | |
| If given, each dimension ``dim[i]`` will either be zero-padded or | |
| trimmed to the length ``s[i]`` before computing the real FFT. | |
| If a length ``-1`` is specified, no padding is done in that dimension. | |
| Defaults to even output in the last dimension: | |
| ``s[-1] = 2*(input.size(dim[-1]) - 1)``. | |
| dim (Tuple[int], optional): Dimensions to be transformed. | |
| The last dimension must be the half-Hermitian compressed dimension. | |
| Default: all dimensions, or the last ``len(s)`` dimensions if :attr:`s` is given. | |
| norm (str, optional): Normalization mode. For the backward transform | |
| (:func:`~torch.fft.irfftn`), these correspond to: | |
| * ``"forward"`` - no normalization | |
| * ``"backward"`` - normalize by ``1/n`` | |
| * ``"ortho"`` - normalize by ``1/sqrt(n)`` (making the real IFFT orthonormal) | |
| Where ``n = prod(s)`` is the logical IFFT size. | |
| Calling the forward transform (:func:`~torch.fft.rfftn`) with the same | |
| normalization mode will apply an overall normalization of ``1/n`` between | |
| the two transforms. This is required to make :func:`~torch.fft.irfftn` | |
| the exact inverse. | |
| Default is ``"backward"`` (normalize by ``1/n``). | |
| Keyword args: | |
| {out} | |
| Example: | |
| >>> t = torch.rand(10, 9) | |
| >>> T = torch.fft.rfftn(t) | |
| Without specifying the output length to :func:`~torch.fft.irfft`, the output | |
| will not round-trip properly because the input is odd-length in the last | |
| dimension: | |
| >>> torch.fft.irfftn(T).size() | |
| torch.Size([10, 8]) | |
| So, it is recommended to always pass the signal shape :attr:`s`. | |
| >>> roundtrip = torch.fft.irfftn(T, t.size()) | |
| >>> roundtrip.size() | |
| torch.Size([10, 9]) | |
| >>> torch.testing.assert_close(roundtrip, t, check_stride=False) | |
| """.format(**common_args)) | |
| hfft = _add_docstr(_fft.fft_hfft, r""" | |
| hfft(input, n=None, dim=-1, norm=None, *, out=None) -> Tensor | |
| Computes the one dimensional discrete Fourier transform of a Hermitian | |
| symmetric :attr:`input` signal. | |
| Note: | |
| :func:`~torch.fft.hfft`/:func:`~torch.fft.ihfft` are analogous to | |
| :func:`~torch.fft.rfft`/:func:`~torch.fft.irfft`. The real FFT expects | |
| a real signal in the time-domain and gives a Hermitian symmetry in the | |
| frequency-domain. The Hermitian FFT is the opposite; Hermitian symmetric in | |
| the time-domain and real-valued in the frequency-domain. For this reason, | |
| special care needs to be taken with the length argument :attr:`n`, in the | |
| same way as with :func:`~torch.fft.irfft`. | |
| Note: | |
| Because the signal is Hermitian in the time-domain, the result will be | |
| real in the frequency domain. Note that some input frequencies must be | |
| real-valued to satisfy the Hermitian property. In these cases the imaginary | |
| component will be ignored. For example, any imaginary component in | |
| ``input[0]`` would result in one or more complex frequency terms which | |
| cannot be represented in a real output and so will always be ignored. | |
| Note: | |
| The correct interpretation of the Hermitian input depends on the length of | |
| the original data, as given by :attr:`n`. This is because each input shape | |
| could correspond to either an odd or even length signal. By default, the | |
| signal is assumed to be even length and odd signals will not round-trip | |
| properly. So, it is recommended to always pass the signal length :attr:`n`. | |
| Note: | |
| Supports torch.half and torch.chalf on CUDA with GPU Architecture SM53 or greater. | |
| However it only supports powers of 2 signal length in every transformed dimension. | |
| With default arguments, size of the transformed dimension should be (2^n + 1) as argument | |
| `n` defaults to even output size = 2 * (transformed_dim_size - 1) | |
| Args: | |
| input (Tensor): the input tensor representing a half-Hermitian signal | |
| n (int, optional): Output signal length. This determines the length of the | |
| real output. If given, the input will either be zero-padded or trimmed to this | |
| length before computing the Hermitian FFT. | |
| Defaults to even output: ``n=2*(input.size(dim) - 1)``. | |
| dim (int, optional): The dimension along which to take the one dimensional Hermitian FFT. | |
| norm (str, optional): Normalization mode. For the forward transform | |
| (:func:`~torch.fft.hfft`), these correspond to: | |
| * ``"forward"`` - normalize by ``1/n`` | |
| * ``"backward"`` - no normalization | |
| * ``"ortho"`` - normalize by ``1/sqrt(n)`` (making the Hermitian FFT orthonormal) | |
| Calling the backward transform (:func:`~torch.fft.ihfft`) with the same | |
| normalization mode will apply an overall normalization of ``1/n`` between | |
| the two transforms. This is required to make :func:`~torch.fft.ihfft` | |
| the exact inverse. | |
| Default is ``"backward"`` (no normalization). | |
| Keyword args: | |
| {out} | |
| Example: | |
| Taking a real-valued frequency signal and bringing it into the time domain | |
| gives Hermitian symmetric output: | |
| >>> t = torch.linspace(0, 1, 5) | |
| >>> t | |
| tensor([0.0000, 0.2500, 0.5000, 0.7500, 1.0000]) | |
| >>> T = torch.fft.ifft(t) | |
| >>> T | |
| tensor([ 0.5000-0.0000j, -0.1250-0.1720j, -0.1250-0.0406j, -0.1250+0.0406j, | |
| -0.1250+0.1720j]) | |
| Note that ``T[1] == T[-1].conj()`` and ``T[2] == T[-2].conj()`` is | |
| redundant. We can thus compute the forward transform without considering | |
| negative frequencies: | |
| >>> torch.fft.hfft(T[:3], n=5) | |
| tensor([0.0000, 0.2500, 0.5000, 0.7500, 1.0000]) | |
| Like with :func:`~torch.fft.irfft`, the output length must be given in order | |
| to recover an even length output: | |
| >>> torch.fft.hfft(T[:3]) | |
| tensor([0.1250, 0.2809, 0.6250, 0.9691]) | |
| """.format(**common_args)) | |
| ihfft = _add_docstr(_fft.fft_ihfft, r""" | |
| ihfft(input, n=None, dim=-1, norm=None, *, out=None) -> Tensor | |
| Computes the inverse of :func:`~torch.fft.hfft`. | |
| :attr:`input` must be a real-valued signal, interpreted in the Fourier domain. | |
| The IFFT of a real signal is Hermitian-symmetric, ``X[i] = conj(X[-i])``. | |
| :func:`~torch.fft.ihfft` represents this in the one-sided form where only the | |
| positive frequencies below the Nyquist frequency are included. To compute the | |
| full output, use :func:`~torch.fft.ifft`. | |
| Note: | |
| Supports torch.half on CUDA with GPU Architecture SM53 or greater. | |
| However it only supports powers of 2 signal length in every transformed dimension. | |
| Args: | |
| input (Tensor): the real input tensor | |
| n (int, optional): Signal length. If given, the input will either be zero-padded | |
| or trimmed to this length before computing the Hermitian IFFT. | |
| dim (int, optional): The dimension along which to take the one dimensional Hermitian IFFT. | |
| norm (str, optional): Normalization mode. For the backward transform | |
| (:func:`~torch.fft.ihfft`), these correspond to: | |
| * ``"forward"`` - no normalization | |
| * ``"backward"`` - normalize by ``1/n`` | |
| * ``"ortho"`` - normalize by ``1/sqrt(n)`` (making the IFFT orthonormal) | |
| Calling the forward transform (:func:`~torch.fft.hfft`) with the same | |
| normalization mode will apply an overall normalization of ``1/n`` between | |
| the two transforms. This is required to make :func:`~torch.fft.ihfft` | |
| the exact inverse. | |
| Default is ``"backward"`` (normalize by ``1/n``). | |
| Keyword args: | |
| {out} | |
| Example: | |
| >>> t = torch.arange(5) | |
| >>> t | |
| tensor([0, 1, 2, 3, 4]) | |
| >>> torch.fft.ihfft(t) | |
| tensor([ 2.0000-0.0000j, -0.5000-0.6882j, -0.5000-0.1625j]) | |
| Compare against the full output from :func:`~torch.fft.ifft`: | |
| >>> torch.fft.ifft(t) | |
| tensor([ 2.0000-0.0000j, -0.5000-0.6882j, -0.5000-0.1625j, -0.5000+0.1625j, | |
| -0.5000+0.6882j]) | |
| """.format(**common_args)) | |
| hfft2 = _add_docstr(_fft.fft_hfft2, r""" | |
| hfft2(input, s=None, dim=(-2, -1), norm=None, *, out=None) -> Tensor | |
| Computes the 2-dimensional discrete Fourier transform of a Hermitian symmetric | |
| :attr:`input` signal. Equivalent to :func:`~torch.fft.hfftn` but only | |
| transforms the last two dimensions by default. | |
| :attr:`input` is interpreted as a one-sided Hermitian signal in the time | |
| domain. By the Hermitian property, the Fourier transform will be real-valued. | |
| Note: | |
| Supports torch.half and torch.chalf on CUDA with GPU Architecture SM53 or greater. | |
| However it only supports powers of 2 signal length in every transformed dimensions. | |
| With default arguments, the size of last dimension should be (2^n + 1) as argument | |
| `s` defaults to even output size = 2 * (last_dim_size - 1) | |
| Args: | |
| input (Tensor): the input tensor | |
| s (Tuple[int], optional): Signal size in the transformed dimensions. | |
| If given, each dimension ``dim[i]`` will either be zero-padded or | |
| trimmed to the length ``s[i]`` before computing the Hermitian FFT. | |
| If a length ``-1`` is specified, no padding is done in that dimension. | |
| Defaults to even output in the last dimension: | |
| ``s[-1] = 2*(input.size(dim[-1]) - 1)``. | |
| dim (Tuple[int], optional): Dimensions to be transformed. | |
| The last dimension must be the half-Hermitian compressed dimension. | |
| Default: last two dimensions. | |
| norm (str, optional): Normalization mode. For the forward transform | |
| (:func:`~torch.fft.hfft2`), these correspond to: | |
| * ``"forward"`` - normalize by ``1/n`` | |
| * ``"backward"`` - no normalization | |
| * ``"ortho"`` - normalize by ``1/sqrt(n)`` (making the Hermitian FFT orthonormal) | |
| Where ``n = prod(s)`` is the logical FFT size. | |
| Calling the backward transform (:func:`~torch.fft.ihfft2`) with the same | |
| normalization mode will apply an overall normalization of ``1/n`` between | |
| the two transforms. This is required to make :func:`~torch.fft.ihfft2` | |
| the exact inverse. | |
| Default is ``"backward"`` (no normalization). | |
| Keyword args: | |
| {out} | |
| Example: | |
| Starting from a real frequency-space signal, we can generate a | |
| Hermitian-symmetric time-domain signal: | |
| >>> T = torch.rand(10, 9) | |
| >>> t = torch.fft.ihfft2(T) | |
| Without specifying the output length to :func:`~torch.fft.hfftn`, the | |
| output will not round-trip properly because the input is odd-length in the | |
| last dimension: | |
| >>> torch.fft.hfft2(t).size() | |
| torch.Size([10, 10]) | |
| So, it is recommended to always pass the signal shape :attr:`s`. | |
| >>> roundtrip = torch.fft.hfft2(t, T.size()) | |
| >>> roundtrip.size() | |
| torch.Size([10, 9]) | |
| >>> torch.allclose(roundtrip, T) | |
| True | |
| """.format(**common_args)) | |
| ihfft2 = _add_docstr(_fft.fft_ihfft2, r""" | |
| ihfft2(input, s=None, dim=(-2, -1), norm=None, *, out=None) -> Tensor | |
| Computes the 2-dimensional inverse discrete Fourier transform of real | |
| :attr:`input`. Equivalent to :func:`~torch.fft.ihfftn` but transforms only the | |
| two last dimensions by default. | |
| Note: | |
| Supports torch.half on CUDA with GPU Architecture SM53 or greater. | |
| However it only supports powers of 2 signal length in every transformed dimensions. | |
| Args: | |
| input (Tensor): the input tensor | |
| s (Tuple[int], optional): Signal size in the transformed dimensions. | |
| If given, each dimension ``dim[i]`` will either be zero-padded or | |
| trimmed to the length ``s[i]`` before computing the Hermitian IFFT. | |
| If a length ``-1`` is specified, no padding is done in that dimension. | |
| Default: ``s = [input.size(d) for d in dim]`` | |
| dim (Tuple[int], optional): Dimensions to be transformed. | |
| Default: last two dimensions. | |
| norm (str, optional): Normalization mode. For the backward transform | |
| (:func:`~torch.fft.ihfft2`), these correspond to: | |
| * ``"forward"`` - no normalization | |
| * ``"backward"`` - normalize by ``1/n`` | |
| * ``"ortho"`` - normalize by ``1/sqrt(n)`` (making the Hermitian IFFT orthonormal) | |
| Where ``n = prod(s)`` is the logical IFFT size. | |
| Calling the forward transform (:func:`~torch.fft.hfft2`) with the same | |
| normalization mode will apply an overall normalization of ``1/n`` between | |
| the two transforms. This is required to make :func:`~torch.fft.ihfft2` | |
| the exact inverse. | |
| Default is ``"backward"`` (normalize by ``1/n``). | |
| Keyword args: | |
| {out} | |
| Example: | |
| >>> T = torch.rand(10, 10) | |
| >>> t = torch.fft.ihfft2(t) | |
| >>> t.size() | |
| torch.Size([10, 6]) | |
| Compared against the full output from :func:`~torch.fft.ifft2`, the | |
| Hermitian time-space signal takes up only half the space. | |
| >>> fftn = torch.fft.ifft2(t) | |
| >>> torch.allclose(fftn[..., :6], rfftn) | |
| True | |
| The discrete Fourier transform is separable, so :func:`~torch.fft.ihfft2` | |
| here is equivalent to a combination of :func:`~torch.fft.ifft` and | |
| :func:`~torch.fft.ihfft`: | |
| >>> two_ffts = torch.fft.ifft(torch.fft.ihfft(t, dim=1), dim=0) | |
| >>> torch.allclose(t, two_ffts) | |
| True | |
| """.format(**common_args)) | |
| hfftn = _add_docstr(_fft.fft_hfftn, r""" | |
| hfftn(input, s=None, dim=None, norm=None, *, out=None) -> Tensor | |
| Computes the n-dimensional discrete Fourier transform of a Hermitian symmetric | |
| :attr:`input` signal. | |
| :attr:`input` is interpreted as a one-sided Hermitian signal in the time | |
| domain. By the Hermitian property, the Fourier transform will be real-valued. | |
| Note: | |
| :func:`~torch.fft.hfftn`/:func:`~torch.fft.ihfftn` are analogous to | |
| :func:`~torch.fft.rfftn`/:func:`~torch.fft.irfftn`. The real FFT expects | |
| a real signal in the time-domain and gives Hermitian symmetry in the | |
| frequency-domain. The Hermitian FFT is the opposite; Hermitian symmetric in | |
| the time-domain and real-valued in the frequency-domain. For this reason, | |
| special care needs to be taken with the shape argument :attr:`s`, in the | |
| same way as with :func:`~torch.fft.irfftn`. | |
| Note: | |
| Some input frequencies must be real-valued to satisfy the Hermitian | |
| property. In these cases the imaginary component will be ignored. | |
| For example, any imaginary component in the zero-frequency term cannot | |
| be represented in a real output and so will always be ignored. | |
| Note: | |
| The correct interpretation of the Hermitian input depends on the length of | |
| the original data, as given by :attr:`s`. This is because each input shape | |
| could correspond to either an odd or even length signal. By default, the | |
| signal is assumed to be even length and odd signals will not round-trip | |
| properly. It is recommended to always pass the signal shape :attr:`s`. | |
| Note: | |
| Supports torch.half and torch.chalf on CUDA with GPU Architecture SM53 or greater. | |
| However it only supports powers of 2 signal length in every transformed dimensions. | |
| With default arguments, the size of last dimension should be (2^n + 1) as argument | |
| `s` defaults to even output size = 2 * (last_dim_size - 1) | |
| Args: | |
| input (Tensor): the input tensor | |
| s (Tuple[int], optional): Signal size in the transformed dimensions. | |
| If given, each dimension ``dim[i]`` will either be zero-padded or | |
| trimmed to the length ``s[i]`` before computing the real FFT. | |
| If a length ``-1`` is specified, no padding is done in that dimension. | |
| Defaults to even output in the last dimension: | |
| ``s[-1] = 2*(input.size(dim[-1]) - 1)``. | |
| dim (Tuple[int], optional): Dimensions to be transformed. | |
| The last dimension must be the half-Hermitian compressed dimension. | |
| Default: all dimensions, or the last ``len(s)`` dimensions if :attr:`s` is given. | |
| norm (str, optional): Normalization mode. For the forward transform | |
| (:func:`~torch.fft.hfftn`), these correspond to: | |
| * ``"forward"`` - normalize by ``1/n`` | |
| * ``"backward"`` - no normalization | |
| * ``"ortho"`` - normalize by ``1/sqrt(n)`` (making the Hermitian FFT orthonormal) | |
| Where ``n = prod(s)`` is the logical FFT size. | |
| Calling the backward transform (:func:`~torch.fft.ihfftn`) with the same | |
| normalization mode will apply an overall normalization of ``1/n`` between | |
| the two transforms. This is required to make :func:`~torch.fft.ihfftn` | |
| the exact inverse. | |
| Default is ``"backward"`` (no normalization). | |
| Keyword args: | |
| {out} | |
| Example: | |
| Starting from a real frequency-space signal, we can generate a | |
| Hermitian-symmetric time-domain signal: | |
| >>> T = torch.rand(10, 9) | |
| >>> t = torch.fft.ihfftn(T) | |
| Without specifying the output length to :func:`~torch.fft.hfftn`, the | |
| output will not round-trip properly because the input is odd-length in the | |
| last dimension: | |
| >>> torch.fft.hfftn(t).size() | |
| torch.Size([10, 10]) | |
| So, it is recommended to always pass the signal shape :attr:`s`. | |
| >>> roundtrip = torch.fft.hfftn(t, T.size()) | |
| >>> roundtrip.size() | |
| torch.Size([10, 9]) | |
| >>> torch.allclose(roundtrip, T) | |
| True | |
| """.format(**common_args)) | |
| ihfftn = _add_docstr(_fft.fft_ihfftn, r""" | |
| ihfftn(input, s=None, dim=None, norm=None, *, out=None) -> Tensor | |
| Computes the N-dimensional inverse discrete Fourier transform of real :attr:`input`. | |
| :attr:`input` must be a real-valued signal, interpreted in the Fourier domain. | |
| The n-dimensional IFFT of a real signal is Hermitian-symmetric, | |
| ``X[i, j, ...] = conj(X[-i, -j, ...])``. :func:`~torch.fft.ihfftn` represents | |
| this in the one-sided form where only the positive frequencies below the | |
| Nyquist frequency are included in the last signal dimension. To compute the | |
| full output, use :func:`~torch.fft.ifftn`. | |
| Note: | |
| Supports torch.half on CUDA with GPU Architecture SM53 or greater. | |
| However it only supports powers of 2 signal length in every transformed dimensions. | |
| Args: | |
| input (Tensor): the input tensor | |
| s (Tuple[int], optional): Signal size in the transformed dimensions. | |
| If given, each dimension ``dim[i]`` will either be zero-padded or | |
| trimmed to the length ``s[i]`` before computing the Hermitian IFFT. | |
| If a length ``-1`` is specified, no padding is done in that dimension. | |
| Default: ``s = [input.size(d) for d in dim]`` | |
| dim (Tuple[int], optional): Dimensions to be transformed. | |
| Default: all dimensions, or the last ``len(s)`` dimensions if :attr:`s` is given. | |
| norm (str, optional): Normalization mode. For the backward transform | |
| (:func:`~torch.fft.ihfftn`), these correspond to: | |
| * ``"forward"`` - no normalization | |
| * ``"backward"`` - normalize by ``1/n`` | |
| * ``"ortho"`` - normalize by ``1/sqrt(n)`` (making the Hermitian IFFT orthonormal) | |
| Where ``n = prod(s)`` is the logical IFFT size. | |
| Calling the forward transform (:func:`~torch.fft.hfftn`) with the same | |
| normalization mode will apply an overall normalization of ``1/n`` between | |
| the two transforms. This is required to make :func:`~torch.fft.ihfftn` | |
| the exact inverse. | |
| Default is ``"backward"`` (normalize by ``1/n``). | |
| Keyword args: | |
| {out} | |
| Example: | |
| >>> T = torch.rand(10, 10) | |
| >>> ihfftn = torch.fft.ihfftn(T) | |
| >>> ihfftn.size() | |
| torch.Size([10, 6]) | |
| Compared against the full output from :func:`~torch.fft.ifftn`, we have all | |
| elements up to the Nyquist frequency. | |
| >>> ifftn = torch.fft.ifftn(t) | |
| >>> torch.allclose(ifftn[..., :6], ihfftn) | |
| True | |
| The discrete Fourier transform is separable, so :func:`~torch.fft.ihfftn` | |
| here is equivalent to a combination of :func:`~torch.fft.ihfft` and | |
| :func:`~torch.fft.ifft`: | |
| >>> two_iffts = torch.fft.ifft(torch.fft.ihfft(t, dim=1), dim=0) | |
| >>> torch.allclose(ihfftn, two_iffts) | |
| True | |
| """.format(**common_args)) | |
| fftfreq = _add_docstr(_fft.fft_fftfreq, r""" | |
| fftfreq(n, d=1.0, *, out=None, dtype=None, layout=torch.strided, device=None, requires_grad=False) -> Tensor | |
| Computes the discrete Fourier Transform sample frequencies for a signal of size :attr:`n`. | |
| Note: | |
| By convention, :func:`~torch.fft.fft` returns positive frequency terms | |
| first, followed by the negative frequencies in reverse order, so that | |
| ``f[-i]`` for all :math:`0 < i \leq n/2`` in Python gives the negative | |
| frequency terms. For an FFT of length :attr:`n` and with inputs spaced in | |
| length unit :attr:`d`, the frequencies are:: | |
| f = [0, 1, ..., (n - 1) // 2, -(n // 2), ..., -1] / (d * n) | |
| Note: | |
| For even lengths, the Nyquist frequency at ``f[n/2]`` can be thought of as | |
| either negative or positive. :func:`~torch.fft.fftfreq` follows NumPy's | |
| convention of taking it to be negative. | |
| Args: | |
| n (int): the FFT length | |
| d (float, optional): The sampling length scale. | |
| The spacing between individual samples of the FFT input. | |
| The default assumes unit spacing, dividing that result by the actual | |
| spacing gives the result in physical frequency units. | |
| Keyword Args: | |
| {out} | |
| {dtype} | |
| {layout} | |
| {device} | |
| {requires_grad} | |
| Example: | |
| >>> torch.fft.fftfreq(5) | |
| tensor([ 0.0000, 0.2000, 0.4000, -0.4000, -0.2000]) | |
| For even input, we can see the Nyquist frequency at ``f[2]`` is given as | |
| negative: | |
| >>> torch.fft.fftfreq(4) | |
| tensor([ 0.0000, 0.2500, -0.5000, -0.2500]) | |
| """.format(**factory_common_args)) | |
| rfftfreq = _add_docstr(_fft.fft_rfftfreq, r""" | |
| rfftfreq(n, d=1.0, *, out=None, dtype=None, layout=torch.strided, device=None, requires_grad=False) -> Tensor | |
| Computes the sample frequencies for :func:`~torch.fft.rfft` with a signal of size :attr:`n`. | |
| Note: | |
| :func:`~torch.fft.rfft` returns Hermitian one-sided output, so only the | |
| positive frequency terms are returned. For a real FFT of length :attr:`n` | |
| and with inputs spaced in length unit :attr:`d`, the frequencies are:: | |
| f = torch.arange((n + 1) // 2) / (d * n) | |
| Note: | |
| For even lengths, the Nyquist frequency at ``f[n/2]`` can be thought of as | |
| either negative or positive. Unlike :func:`~torch.fft.fftfreq`, | |
| :func:`~torch.fft.rfftfreq` always returns it as positive. | |
| Args: | |
| n (int): the real FFT length | |
| d (float, optional): The sampling length scale. | |
| The spacing between individual samples of the FFT input. | |
| The default assumes unit spacing, dividing that result by the actual | |
| spacing gives the result in physical frequency units. | |
| Keyword Args: | |
| {out} | |
| {dtype} | |
| {layout} | |
| {device} | |
| {requires_grad} | |
| Example: | |
| >>> torch.fft.rfftfreq(5) | |
| tensor([0.0000, 0.2000, 0.4000]) | |
| >>> torch.fft.rfftfreq(4) | |
| tensor([0.0000, 0.2500, 0.5000]) | |
| Compared to the output from :func:`~torch.fft.fftfreq`, we see that the | |
| Nyquist frequency at ``f[2]`` has changed sign: | |
| >>> torch.fft.fftfreq(4) | |
| tensor([ 0.0000, 0.2500, -0.5000, -0.2500]) | |
| """.format(**factory_common_args)) | |
| fftshift = _add_docstr(_fft.fft_fftshift, r""" | |
| fftshift(input, dim=None) -> Tensor | |
| Reorders n-dimensional FFT data, as provided by :func:`~torch.fft.fftn`, to have | |
| negative frequency terms first. | |
| This performs a periodic shift of n-dimensional data such that the origin | |
| ``(0, ..., 0)`` is moved to the center of the tensor. Specifically, to | |
| ``input.shape[dim] // 2`` in each selected dimension. | |
| Note: | |
| By convention, the FFT returns positive frequency terms first, followed by | |
| the negative frequencies in reverse order, so that ``f[-i]`` for all | |
| :math:`0 < i \leq n/2` in Python gives the negative frequency terms. | |
| :func:`~torch.fft.fftshift` rearranges all frequencies into ascending order | |
| from negative to positive with the zero-frequency term in the center. | |
| Note: | |
| For even lengths, the Nyquist frequency at ``f[n/2]`` can be thought of as | |
| either negative or positive. :func:`~torch.fft.fftshift` always puts the | |
| Nyquist term at the 0-index. This is the same convention used by | |
| :func:`~torch.fft.fftfreq`. | |
| Args: | |
| input (Tensor): the tensor in FFT order | |
| dim (int, Tuple[int], optional): The dimensions to rearrange. | |
| Only dimensions specified here will be rearranged, any other dimensions | |
| will be left in their original order. | |
| Default: All dimensions of :attr:`input`. | |
| Example: | |
| >>> f = torch.fft.fftfreq(4) | |
| >>> f | |
| tensor([ 0.0000, 0.2500, -0.5000, -0.2500]) | |
| >>> torch.fft.fftshift(f) | |
| tensor([-0.5000, -0.2500, 0.0000, 0.2500]) | |
| Also notice that the Nyquist frequency term at ``f[2]`` was moved to the | |
| beginning of the tensor. | |
| This also works for multi-dimensional transforms: | |
| >>> x = torch.fft.fftfreq(5, d=1/5) + 0.1 * torch.fft.fftfreq(5, d=1/5).unsqueeze(1) | |
| >>> x | |
| tensor([[ 0.0000, 1.0000, 2.0000, -2.0000, -1.0000], | |
| [ 0.1000, 1.1000, 2.1000, -1.9000, -0.9000], | |
| [ 0.2000, 1.2000, 2.2000, -1.8000, -0.8000], | |
| [-0.2000, 0.8000, 1.8000, -2.2000, -1.2000], | |
| [-0.1000, 0.9000, 1.9000, -2.1000, -1.1000]]) | |
| >>> torch.fft.fftshift(x) | |
| tensor([[-2.2000, -1.2000, -0.2000, 0.8000, 1.8000], | |
| [-2.1000, -1.1000, -0.1000, 0.9000, 1.9000], | |
| [-2.0000, -1.0000, 0.0000, 1.0000, 2.0000], | |
| [-1.9000, -0.9000, 0.1000, 1.1000, 2.1000], | |
| [-1.8000, -0.8000, 0.2000, 1.2000, 2.2000]]) | |
| :func:`~torch.fft.fftshift` can also be useful for spatial data. If our | |
| data is defined on a centered grid (``[-(N//2), (N-1)//2]``) then we can | |
| use the standard FFT defined on an uncentered grid (``[0, N)``) by first | |
| applying an :func:`~torch.fft.ifftshift`. | |
| >>> x_centered = torch.arange(-5, 5) | |
| >>> x_uncentered = torch.fft.ifftshift(x_centered) | |
| >>> fft_uncentered = torch.fft.fft(x_uncentered) | |
| Similarly, we can convert the frequency domain components to centered | |
| convention by applying :func:`~torch.fft.fftshift`. | |
| >>> fft_centered = torch.fft.fftshift(fft_uncentered) | |
| The inverse transform, from centered Fourier space back to centered spatial | |
| data, can be performed by applying the inverse shifts in reverse order: | |
| >>> x_centered_2 = torch.fft.fftshift(torch.fft.ifft(torch.fft.ifftshift(fft_centered))) | |
| >>> torch.testing.assert_close(x_centered.to(torch.complex64), x_centered_2, check_stride=False) | |
| """) | |
| ifftshift = _add_docstr(_fft.fft_ifftshift, r""" | |
| ifftshift(input, dim=None) -> Tensor | |
| Inverse of :func:`~torch.fft.fftshift`. | |
| Args: | |
| input (Tensor): the tensor in FFT order | |
| dim (int, Tuple[int], optional): The dimensions to rearrange. | |
| Only dimensions specified here will be rearranged, any other dimensions | |
| will be left in their original order. | |
| Default: All dimensions of :attr:`input`. | |
| Example: | |
| >>> f = torch.fft.fftfreq(5) | |
| >>> f | |
| tensor([ 0.0000, 0.2000, 0.4000, -0.4000, -0.2000]) | |
| A round-trip through :func:`~torch.fft.fftshift` and | |
| :func:`~torch.fft.ifftshift` gives the same result: | |
| >>> shifted = torch.fft.fftshift(f) | |
| >>> torch.fft.ifftshift(shifted) | |
| tensor([ 0.0000, 0.2000, 0.4000, -0.4000, -0.2000]) | |
| """) | |