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This logic determines Euler angles for a given set of input images based on the Common line theorem. This is needed in order to correctly place images (2D projections) in 3D space to get the 3D conformation of the particle
Here, a general/generic description of HOW the logic is USED should be given. Try to be as general as possible, but also mention prerequisites, restrictions, advantages, requirements which are specific of this logic. Basically everything the user needs to know to successfully use this logic.
This mode is used for de-novo assignment of angles only from the input projections themselves
Parameters | Description |
Sinograms | Gives options to read already generated sinograms or to write down sinograms for the images being processed |
Symmetry | Symmetry of the complex studied (if known) |
Input | Description |
In | Image or stack of images (a set of class averages) |
Output | Description |
Out | The input projections with assigned Euler angles |
This logic determines the angles of stack of projections if the set with known angular relations is available (e.g. 3D model from already performed angular reconstitution)
Parameters | Description |
Symmetry | Symmetry of the complex studied (if known) |
Input | Description |
In | Image or stack of images (a set of class averages) |
Anchor set | Projection set with known angular relations (mostly projected 3D-model) |
Output | Description |
Out | The input projections with assigned Euler angles (no anchor dataset in the output) |
This mode is used to adds projections to a set with known/determined Euler angles
Parameters | Description |
Symmetry | Symmetry of the complex studied (if known) |
Input | Description |
In | Image or stack of images (a set of class averages) |
Dataset | Stack of images (projections) with assigned Euler angles |
Output | Description |
Out | The input dataset with added input projections with assigned Euler angles |
This mode is used to create sinograms from the images. These sinograms can be later used in the same logic to reconstitute the angles.
Parameters | Description |
Symmetry | Symmetry of the complex studied (if known) |
Input | Description |
In | Image or stack of images |
Output | Description |
Out | Sinogram |
This logic is needed as an intermediate step to get 3D model from 2D images. In order to reconstruct the full model we need to know the relationship between the images (projections) we have - how they are located in 3D relative to each other.
In case any reference model for the particle is available, it can be used as 'anchor set' that would increase the precision of the output.
However, when no prior model is available for the particles of interest, determination of Euler angles should be done de novo. This logic does it based on Common line theorem.