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-rw-r--r--src/libcamera/meson.build1
-rw-r--r--src/libcamera/transform.cpp322
2 files changed, 323 insertions, 0 deletions
diff --git a/src/libcamera/meson.build b/src/libcamera/meson.build
index 18ea3261..1351dbba 100644
--- a/src/libcamera/meson.build
+++ b/src/libcamera/meson.build
@@ -44,6 +44,7 @@ libcamera_sources = files([
'sysfs.cpp',
'thread.cpp',
'timer.cpp',
+ 'transform.cpp',
'utils.cpp',
'v4l2_controls.cpp',
'v4l2_device.cpp',
diff --git a/src/libcamera/transform.cpp b/src/libcamera/transform.cpp
new file mode 100644
index 00000000..f3e37f31
--- /dev/null
+++ b/src/libcamera/transform.cpp
@@ -0,0 +1,322 @@
+/* SPDX-License-Identifier: LGPL-2.1-or-later */
+/*
+ * Copyright (C) 2020, Raspberry Pi (Trading) Limited
+ *
+ * transform.cpp - 2D plane transforms.
+ */
+
+#include <libcamera/transform.h>
+
+/**
+ * \file transform.h
+ * \brief Enum to represent and manipulate 2D plane transforms
+ */
+
+namespace libcamera {
+
+/**
+ * \enum Transform
+ * \brief Enum to represent a 2D plane transform
+ *
+ * The Transform can take 8 distinct values, representing the usual 2D plane
+ * transforms listed below. Each of these transforms can be constructed
+ * out of 3 basic operations, namely a horizontal flip (mirror), a vertical
+ * flip, and a transposition (about the main diagonal). The transforms are
+ * encoded such that a single bit indicates the presence of each of the 3
+ * basic operations:
+ *
+ * - bit 0 - presence of a horizontal flip
+ * - bit 1 - presence of a vertical flip
+ * - bit 2 - presence of a transposition.
+ *
+ * We regard these 3 basic operations as being applied in a specific order:
+ * first the two flip operations (actually they commute, so the order between
+ * them is unimportant) and finally any transpose operation.
+ *
+ * Functions are provided to manipulate directly the bits within the transform
+ * encoding, but there are also higher-level functions to invert and compose
+ * transforms. Transforms are composed according to the usual mathematical
+ * convention such that the right transform is applied first, and the left
+ * transform is applied second.
+ *
+ * Finally, we have a total of 8 distinct transformations, as follows (a
+ * couple of them have additional synonyms for convenience). We illustrate each
+ * with its nominal effect on a rectangle with vertices labelled A, B, C and D.
+ *
+ * **Identity**
+ *
+ * Identity transform.
+~~~
+ A-B A-B
+Input image | | goes to output image | |
+ C-D C-D
+~~~
+ * Numeric value: 0 (no bits set).
+ *
+ * **Rot0**
+ *
+ * Synonym for `Identity` (zero degree rotation).
+ *
+ * **HFlip**
+ *
+ * Horizontal flip.
+~~~
+ A-B B-A
+Input image | | goes to output image | |
+ C-D D-C
+~~~
+ * Numeric value: 1 (horizontal flip bit set only).
+ *
+ * **VFlip**
+ *
+ * Vertical flip.
+~~~
+ A-B C-D
+Input image | | goes to output image | |
+ C-D A-B
+~~~
+ * Numeric value: 2 (vertical flip bit set only).
+ *
+ * **HVFlip**
+ *
+ * Horizontal and vertical flip (identical to a 180 degree rotation).
+~~~
+ A-B D-C
+Input image | | goes to output image | |
+ C-D B-A
+~~~
+ * Numeric value: 3 (horizontal and vertical flip bits set).
+ *
+ * **Rot180**
+ *
+ * Synonym for `HVFlip` (180 degree rotation).
+ *
+ * **Transpose**
+ *
+ * Transpose (about the main diagonal).
+~~~
+ A-B A-C
+Input image | | goes to output image | |
+ C-D B-D
+~~~
+ * Numeric value: 4 (transpose bit set only).
+ *
+ * **Rot270**
+ *
+ * Rotation by 270 degrees clockwise (90 degrees anticlockwise).
+~~~
+ A-B B-D
+Input image | | goes to output image | |
+ C-D A-C
+~~~
+ * Numeric value: 5 (transpose and horizontal flip bits set).
+ *
+ * **Rot90**
+ *
+ * Rotation by 90 degrees clockwise (270 degrees anticlockwise).
+~~~
+ A-B C-A
+Input image | | goes to output image | |
+ C-D D-B
+~~~
+ * Numeric value: 6 (transpose and vertical flip bits set).
+ *
+ * **Rot180Transpose**
+ *
+ * Rotation by 180 degrees followed by transpose (alternatively, transposition
+ * about the "opposite diagonal").
+~~~
+ A-B D-B
+Input image | | goes to output image | |
+ C-D C-A
+~~~
+ * Numeric value: 7 (all bits set).
+ *
+ * \sa https://en.wikipedia.org/wiki/Examples_of_groups#dihedral_group_of_order_8
+ *
+ * The set of 2D plane transforms is also known as the symmetry group of a
+ * square, described in the link. Note that the group can be generated by
+ * only 2 elements (the horizontal flip and a 90 degree rotation, for
+ * example), however, the encoding used here makes the presence of the vertical
+ * flip explicit.
+ */
+
+/**
+ * \fn operator &(Transform t0, Transform t1)
+ * \brief Apply bitwise AND operator between the bits in the two transforms
+ * \param[in] t0 The first transform
+ * \param[in] t1 The second transform
+ */
+
+/**
+ * \fn operator |(Transform t0, Transform t1)
+ * \brief Apply bitwise OR operator between the bits in the two transforms
+ * \param[in] t0 The first transform
+ * \param[in] t1 The second transform
+ */
+
+/**
+ * \fn operator ^(Transform t0, Transform t1)
+ * \brief Apply bitwise XOR operator between the bits in the two transforms
+ * \param[in] t0 The first transform
+ * \param[in] t1 The second transform
+ */
+
+/**
+ * \fn operator &=(Transform &t0, Transform t1)
+ * \brief Apply bitwise AND-assignment operator between the bits in the two
+ * transforms
+ * \param[in] t0 The first transform
+ * \param[in] t1 The second transform
+ */
+
+/**
+ * \fn operator |=(Transform &t0, Transform t1)
+ * \brief Apply bitwise OR-assignment operator between the bits in the two
+ * transforms
+ * \param[in] t0 The first transform
+ * \param[in] t1 The second transform
+ */
+
+/**
+ * \fn operator ^=(Transform &t0, Transform t1)
+ * \brief Apply bitwise XOR-assignment operator between the bits in the two
+ * transforms
+ * \param[in] t0 The first transform
+ * \param[in] t1 The second transform
+ */
+
+/**
+ * \brief Compose two transforms together
+ * \param[in] t1 The second transform
+ * \param[in] t0 The first transform
+ *
+ * Composing transforms follows the usual mathematical convention for
+ * composing functions. That is, when performing `t1 * t0`, \a t0 is applied
+ * first, and then \a t1.
+ * For example, `Transpose * HFlip` performs `HFlip` first and then the
+ * `Transpose` yielding `Rot270`, as shown below.
+~~~
+ A-B B-A B-D
+Input image | | -> HFLip -> | | -> Transpose -> | | = Rot270
+ C-D D-C A-C
+~~~
+ * Note that composition is generally non-commutative for Transforms,
+ * and not the same as XOR-ing the underlying bit representations.
+ */
+Transform operator*(Transform t1, Transform t0)
+{
+ /*
+ * Reorder the operations so that we imagine doing t0's transpose
+ * (if any) after t1's flips. The effect is to swap t1's hflips for
+ * vflips and vice versa, after which we can just xor all the bits.
+ */
+ Transform reordered = t1;
+ if (!!(t0 & Transform::Transpose)) {
+ reordered = t1 & Transform::Transpose;
+ if (!!(t1 & Transform::HFlip))
+ reordered |= Transform::VFlip;
+ if (!!(t1 & Transform::VFlip))
+ reordered |= Transform::HFlip;
+ }
+
+ return reordered ^ t0;
+}
+
+/**
+ * \brief Invert a transform
+ * \param[in] t The transform to be inverted
+ *
+ * That is, we return the transform such that `t * (-t)` and `(-t) * t` both
+ * yield the identity transform.
+ */
+Transform operator-(Transform t)
+{
+ /* All are self-inverses, except for Rot270 and Rot90. */
+ static const Transform inverses[] = {
+ Transform::Identity,
+ Transform::HFlip,
+ Transform::VFlip,
+ Transform::HVFlip,
+ Transform::Transpose,
+ Transform::Rot90,
+ Transform::Rot270,
+ Transform::Rot180Transpose
+ };
+
+ return inverses[static_cast<int>(t)];
+}
+
+/**
+ * \fn operator!(Transform t)
+ * \brief Return `true` if the transform is the `Identity`, otherwise `false`
+ * \param[in] t The transform to be tested
+ */
+
+/**
+ * \fn operator~(Transform t)
+ * \brief Return the transform with all the bits inverted individually
+ * \param[in] t The transform of which the bits will be inverted
+ *
+ * This inverts the bits that encode the transform in a bitwise manner. Note
+ * that this is not the proper inverse of transform \a t (for which use \a
+ * operator-).
+ */
+
+/**
+ * \brief Return the transform representing a rotation of the given angle
+ * clockwise
+ * \param[in] angle The angle of rotation in a clockwise sense. Negative values
+ * can be used to represent anticlockwise rotations
+ * \param[out] success Set to `true` if the angle is a multiple of 90 degrees,
+ * otherwise `false`
+ * \return The transform corresponding to the rotation if \a success was set to
+ * `true`, otherwise the `Identity` transform
+ */
+Transform transformFromRotation(int angle, bool *success)
+{
+ angle = angle % 360;
+ if (angle < 0)
+ angle += 360;
+
+ if (success != nullptr)
+ *success = true;
+
+ switch (angle) {
+ case 0:
+ return Transform::Identity;
+ case 90:
+ return Transform::Rot90;
+ case 180:
+ return Transform::Rot180;
+ case 270:
+ return Transform::Rot270;
+ }
+
+ if (success != nullptr)
+ *success = false;
+
+ return Transform::Identity;
+}
+
+/**
+ * \brief Return a character string describing the transform
+ * \param[in] t The transform to be described.
+ */
+const char *transformToString(Transform t)
+{
+ static const char *strings[] = {
+ "identity",
+ "hflip",
+ "vflip",
+ "hvflip",
+ "transpose",
+ "rot270",
+ "rot90",
+ "rot180transpose"
+ };
+
+ return strings[static_cast<int>(t)];
+}
+
+} /* namespace libcamera */