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Diffstat (limited to 'pixman/pixman/pixman-radial-gradient.c')
-rw-r--r-- | pixman/pixman/pixman-radial-gradient.c | 347 |
1 files changed, 347 insertions, 0 deletions
diff --git a/pixman/pixman/pixman-radial-gradient.c b/pixman/pixman/pixman-radial-gradient.c new file mode 100644 index 000000000..a3b591673 --- /dev/null +++ b/pixman/pixman/pixman-radial-gradient.c @@ -0,0 +1,347 @@ +/* + * + * Copyright © 2000 Keith Packard, member of The XFree86 Project, Inc. + * Copyright © 2000 SuSE, Inc. + * 2005 Lars Knoll & Zack Rusin, Trolltech + * Copyright © 2007 Red Hat, Inc. + * + * + * Permission to use, copy, modify, distribute, and sell this software and its + * documentation for any purpose is hereby granted without fee, provided that + * the above copyright notice appear in all copies and that both that + * copyright notice and this permission notice appear in supporting + * documentation, and that the name of Keith Packard not be used in + * advertising or publicity pertaining to distribution of the software without + * specific, written prior permission. Keith Packard makes no + * representations about the suitability of this software for any purpose. It + * is provided "as is" without express or implied warranty. + * + * THE COPYRIGHT HOLDERS DISCLAIM ALL WARRANTIES WITH REGARD TO THIS + * SOFTWARE, INCLUDING ALL IMPLIED WARRANTIES OF MERCHANTABILITY AND + * FITNESS, IN NO EVENT SHALL THE COPYRIGHT HOLDERS BE LIABLE FOR ANY + * SPECIAL, INDIRECT OR CONSEQUENTIAL DAMAGES OR ANY DAMAGES + * WHATSOEVER RESULTING FROM LOSS OF USE, DATA OR PROFITS, WHETHER IN + * AN ACTION OF CONTRACT, NEGLIGENCE OR OTHER TORTIOUS ACTION, ARISING + * OUT OF OR IN CONNECTION WITH THE USE OR PERFORMANCE OF THIS + * SOFTWARE. + */ + +#ifdef HAVE_CONFIG_H +#include <config.h> +#endif +#include <stdlib.h> +#include <math.h> +#include "pixman-private.h" + +static void +radial_gradient_get_scanline_32 (pixman_image_t *image, + int x, + int y, + int width, + uint32_t * buffer, + const uint32_t *mask, + uint32_t mask_bits) +{ + /* + * In the radial gradient problem we are given two circles (c₁,r₁) and + * (c₂,r₂) that define the gradient itself. Then, for any point p, we + * must compute the value(s) of t within [0.0, 1.0] representing the + * circle(s) that would color the point. + * + * There are potentially two values of t since the point p can be + * colored by both sides of the circle, (which happens whenever one + * circle is not entirely contained within the other). + * + * If we solve for a value of t that is outside of [0.0, 1.0] then we + * use the extend mode (NONE, REPEAT, REFLECT, or PAD) to map to a + * value within [0.0, 1.0]. + * + * Here is an illustration of the problem: + * + * p₂ + * p • + * • ╲ + * · ╲r₂ + * p₁ · ╲ + * • θ╲ + * ╲ ╌╌• + * ╲r₁ · c₂ + * θ╲ · + * ╌╌• + * c₁ + * + * Given (c₁,r₁), (c₂,r₂) and p, we must find an angle θ such that two + * points p₁ and p₂ on the two circles are collinear with p. Then, the + * desired value of t is the ratio of the length of p₁p to the length + * of p₁p₂. + * + * So, we have six unknown values: (p₁x, p₁y), (p₂x, p₂y), θ and t. + * We can also write six equations that constrain the problem: + * + * Point p₁ is a distance r₁ from c₁ at an angle of θ: + * + * 1. p₁x = c₁x + r₁·cos θ + * 2. p₁y = c₁y + r₁·sin θ + * + * Point p₂ is a distance r₂ from c₂ at an angle of θ: + * + * 3. p₂x = c₂x + r2·cos θ + * 4. p₂y = c₂y + r2·sin θ + * + * Point p lies at a fraction t along the line segment p₁p₂: + * + * 5. px = t·p₂x + (1-t)·p₁x + * 6. py = t·p₂y + (1-t)·p₁y + * + * To solve, first subtitute 1-4 into 5 and 6: + * + * px = t·(c₂x + r₂·cos θ) + (1-t)·(c₁x + r₁·cos θ) + * py = t·(c₂y + r₂·sin θ) + (1-t)·(c₁y + r₁·sin θ) + * + * Then solve each for cos θ and sin θ expressed as a function of t: + * + * cos θ = (-(c₂x - c₁x)·t + (px - c₁x)) / ((r₂-r₁)·t + r₁) + * sin θ = (-(c₂y - c₁y)·t + (py - c₁y)) / ((r₂-r₁)·t + r₁) + * + * To simplify this a bit, we define new variables for several of the + * common terms as shown below: + * + * p₂ + * p • + * • ╲ + * · ┆ ╲r₂ + * p₁ · ┆ ╲ + * • pdy┆ ╲ + * ╲ ┆ •c₂ + * ╲r₁ ┆ · ┆ + * ╲ ·┆ ┆cdy + * •╌╌╌╌┴╌╌╌╌╌╌╌┘ + * c₁ pdx cdx + * + * cdx = (c₂x - c₁x) + * cdy = (c₂y - c₁y) + * dr = r₂-r₁ + * pdx = px - c₁x + * pdy = py - c₁y + * + * Note that cdx, cdy, and dr do not depend on point p at all, so can + * be pre-computed for the entire gradient. The simplifed equations + * are now: + * + * cos θ = (-cdx·t + pdx) / (dr·t + r₁) + * sin θ = (-cdy·t + pdy) / (dr·t + r₁) + * + * Finally, to get a single function of t and eliminate the last + * unknown θ, we use the identity sin²θ + cos²θ = 1. First, square + * each equation, (we knew a quadratic was coming since it must be + * possible to obtain two solutions in some cases): + * + * cos²θ = (cdx²t² - 2·cdx·pdx·t + pdx²) / (dr²·t² + 2·r₁·dr·t + r₁²) + * sin²θ = (cdy²t² - 2·cdy·pdy·t + pdy²) / (dr²·t² + 2·r₁·dr·t + r₁²) + * + * Then add both together, set the result equal to 1, and express as a + * standard quadratic equation in t of the form At² + Bt + C = 0 + * + * (cdx² + cdy² - dr²)·t² - 2·(cdx·pdx + cdy·pdy + r₁·dr)·t + (pdx² + pdy² - r₁²) = 0 + * + * In other words: + * + * A = cdx² + cdy² - dr² + * B = -2·(pdx·cdx + pdy·cdy + r₁·dr) + * C = pdx² + pdy² - r₁² + * + * And again, notice that A does not depend on p, so can be + * precomputed. From here we just use the quadratic formula to solve + * for t: + * + * t = (-2·B ± ⎷(B² - 4·A·C)) / 2·A + */ + + gradient_t *gradient = (gradient_t *)image; + source_image_t *source = (source_image_t *)image; + radial_gradient_t *radial = (radial_gradient_t *)image; + uint32_t *end = buffer + width; + pixman_gradient_walker_t walker; + pixman_bool_t affine = TRUE; + double cx = 1.; + double cy = 0.; + double cz = 0.; + double rx = x + 0.5; + double ry = y + 0.5; + double rz = 1.; + + _pixman_gradient_walker_init (&walker, gradient, source->common.repeat); + + if (source->common.transform) + { + pixman_vector_t v; + /* reference point is the center of the pixel */ + v.vector[0] = pixman_int_to_fixed (x) + pixman_fixed_1 / 2; + v.vector[1] = pixman_int_to_fixed (y) + pixman_fixed_1 / 2; + v.vector[2] = pixman_fixed_1; + + if (!pixman_transform_point_3d (source->common.transform, &v)) + return; + + cx = source->common.transform->matrix[0][0] / 65536.; + cy = source->common.transform->matrix[1][0] / 65536.; + cz = source->common.transform->matrix[2][0] / 65536.; + + rx = v.vector[0] / 65536.; + ry = v.vector[1] / 65536.; + rz = v.vector[2] / 65536.; + + affine = + source->common.transform->matrix[2][0] == 0 && + v.vector[2] == pixman_fixed_1; + } + + if (affine) + { + while (buffer < end) + { + if (!mask || *mask++ & mask_bits) + { + double pdx, pdy; + double B, C; + double det; + double c1x = radial->c1.x / 65536.0; + double c1y = radial->c1.y / 65536.0; + double r1 = radial->c1.radius / 65536.0; + pixman_fixed_48_16_t t; + + pdx = rx - c1x; + pdy = ry - c1y; + + B = -2 * (pdx * radial->cdx + + pdy * radial->cdy + + r1 * radial->dr); + C = pdx * pdx + pdy * pdy - r1 * r1; + + det = (B * B) - (4 * radial->A * C); + if (det < 0.0) + det = 0.0; + + if (radial->A < 0) + t = (pixman_fixed_48_16_t) ((-B - sqrt (det)) / (2.0 * radial->A) * 65536); + else + t = (pixman_fixed_48_16_t) ((-B + sqrt (det)) / (2.0 * radial->A) * 65536); + + *buffer = _pixman_gradient_walker_pixel (&walker, t); + } + ++buffer; + + rx += cx; + ry += cy; + } + } + else + { + /* projective */ + while (buffer < end) + { + if (!mask || *mask++ & mask_bits) + { + double pdx, pdy; + double B, C; + double det; + double c1x = radial->c1.x / 65536.0; + double c1y = radial->c1.y / 65536.0; + double r1 = radial->c1.radius / 65536.0; + pixman_fixed_48_16_t t; + double x, y; + + if (rz != 0) + { + x = rx / rz; + y = ry / rz; + } + else + { + x = y = 0.; + } + + pdx = x - c1x; + pdy = y - c1y; + + B = -2 * (pdx * radial->cdx + + pdy * radial->cdy + + r1 * radial->dr); + C = (pdx * pdx + pdy * pdy - r1 * r1); + + det = (B * B) - (4 * radial->A * C); + if (det < 0.0) + det = 0.0; + + if (radial->A < 0) + t = (pixman_fixed_48_16_t) ((-B - sqrt (det)) / (2.0 * radial->A) * 65536); + else + t = (pixman_fixed_48_16_t) ((-B + sqrt (det)) / (2.0 * radial->A) * 65536); + + *buffer = _pixman_gradient_walker_pixel (&walker, t); + } + + ++buffer; + + rx += cx; + ry += cy; + rz += cz; + } + } +} + +static void +radial_gradient_property_changed (pixman_image_t *image) +{ + image->common.get_scanline_32 = radial_gradient_get_scanline_32; + image->common.get_scanline_64 = _pixman_image_get_scanline_generic_64; +} + +PIXMAN_EXPORT pixman_image_t * +pixman_image_create_radial_gradient (pixman_point_fixed_t * inner, + pixman_point_fixed_t * outer, + pixman_fixed_t inner_radius, + pixman_fixed_t outer_radius, + const pixman_gradient_stop_t *stops, + int n_stops) +{ + pixman_image_t *image; + radial_gradient_t *radial; + + return_val_if_fail (n_stops >= 2, NULL); + + image = _pixman_image_allocate (); + + if (!image) + return NULL; + + radial = &image->radial; + + if (!_pixman_init_gradient (&radial->common, stops, n_stops)) + { + free (image); + return NULL; + } + + image->type = RADIAL; + + radial->c1.x = inner->x; + radial->c1.y = inner->y; + radial->c1.radius = inner_radius; + radial->c2.x = outer->x; + radial->c2.y = outer->y; + radial->c2.radius = outer_radius; + radial->cdx = pixman_fixed_to_double (radial->c2.x - radial->c1.x); + radial->cdy = pixman_fixed_to_double (radial->c2.y - radial->c1.y); + radial->dr = pixman_fixed_to_double (radial->c2.radius - radial->c1.radius); + radial->A = (radial->cdx * radial->cdx + + radial->cdy * radial->cdy - + radial->dr * radial->dr); + + image->common.property_changed = radial_gradient_property_changed; + + radial_gradient_property_changed (image); + + return image; +} + |