Operator Reference
hom_mat2d_slant_local (Operator)
hom_mat2d_slant_local
— Add a slant to a homogeneous 2D transformation matrix.
Signature
hom_mat2d_slant_local( : : HomMat2D, Theta, Axis : HomMat2DSlant)
Description
hom_mat2d_slant_local
adds a slant by the angle Theta
to the
homogeneous 2D transformation matrix HomMat2D
and returns the
resulting matrix in HomMat2DSlant
. A slant is an affine
transformation in which one coordinate axis remains fixed, while the other
coordinate axis is rotated counterclockwise by an angle Theta
. The
parameter Axis
determines which coordinate axis is slanted. For
Axis
= 'x' , the x-axis is slanted and the y-axis remains
fixed, while for Axis
= 'y' the y-axis is slanted and the
x-axis remains fixed. In contrast to
hom_mat2d_slant
, the slanting is performed
relative to the local coordinate system, i.e., the coordinate system
described by HomMat2D
; this corresponds to the following chains of
transformation matrices:
The fixed point of the transformation is the origin of the local
coordinate system, i.e., this point remains unchanged when
transformed using HomMat2DSlant
.
Attention
It should be noted that homogeneous transformation matrices refer to
a general right-handed mathematical coordinate system. If a
homogeneous transformation matrix is used to transform images,
regions, XLD contours, or any other data that has been extracted
from images, the row coordinates of the transformation must be
passed in the x coordinates, while the column coordinates must be
passed in the y coordinates. Consequently, the order of passing row
and column coordinates follows the usual order
(Row
,Column
). This convention is essential to
obtain a right-handed coordinate system for the transformation of
iconic data, and consequently to ensure in particular that rotations
are performed in the correct mathematical direction.
Note that homogeneous matrices are stored row-by-row as a tuple; the last row is usually not stored because it is identical for all homogeneous matrices that describe an affine transformation. For example, the homogeneous matrix is stored as the tuple [ra, rb, tc, rd, re, tf]. However, it is also possible to process full 3×3 matrices, which represent a projective 2D transformation.
Execution Information
- Multithreading type: reentrant (runs in parallel with non-exclusive operators).
- Multithreading scope: global (may be called from any thread).
- Processed without parallelization.
Parameters
HomMat2D
(input_control) hom_mat2d →
(real)
Input transformation matrix.
Theta
(input_control) angle.rad →
(real / integer)
Slant angle.
Default: 0.78
Suggested values: 0.1, 0.2, 0.3, 0.4, 0.78, 1.57, 3.14
Value range:
0
≤
Theta
≤
6.28318530718
Axis
(input_control) string →
(string)
Coordinate axis that is slanted.
Default: 'x'
List of values: 'x' , 'y'
HomMat2DSlant
(output_control) hom_mat2d →
(real)
Output transformation matrix.
Result
If the parameters are valid, the operator
hom_mat2d_slant_local
returns
2 (
H_MSG_TRUE)
. If necessary, an exception is raised.
Possible Predecessors
hom_mat2d_identity
,
hom_mat2d_translate_local
,
hom_mat2d_scale_local
,
hom_mat2d_rotate_local
,
hom_mat2d_slant_local
,
hom_mat2d_reflect
Possible Successors
hom_mat2d_translate_local
,
hom_mat2d_scale_local
,
hom_mat2d_rotate_local
,
hom_mat2d_slant_local
,
hom_mat2d_reflect_local
See also
Module
Foundation