/src/main/res/raw/main_vertex_shader.glsl - Annotate - Distorted Android

library / src / main / res / raw / main_vertex_shader.glsl @ e54bfada

1	d333eb6b	Leszek Koltunski	//////////////////////////////////////////////////////////////////////////////////////////////
2			// Copyright 2016 Leszek Koltunski //
3			// //
4	7602a827	Leszek Koltunski	// This file is part of DistortedLibrary. //
5	d333eb6b	Leszek Koltunski	// //
6	7602a827	Leszek Koltunski	// DistortedLibrary is free software: you can redistribute it and/or modify //
7	d333eb6b	Leszek Koltunski	// it under the terms of the GNU General Public License as published by //
8			// the Free Software Foundation, either version 2 of the License, or //
9			// (at your option) any later version. //
10			// //
11	7602a827	Leszek Koltunski	// DistortedLibrary is distributed in the hope that it will be useful, //
12	d333eb6b	Leszek Koltunski	// but WITHOUT ANY WARRANTY; without even the implied warranty of //
13			// MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the //
14			// GNU General Public License for more details. //
15			// //
16			// You should have received a copy of the GNU General Public License //
17	7602a827	Leszek Koltunski	// along with DistortedLibrary. If not, see <http://www.gnu.org/licenses/>. //
18	d333eb6b	Leszek Koltunski	//////////////////////////////////////////////////////////////////////////////////////////////
19
20	341151fc	Leszek Koltunski	precision highp float;
21	c1a38ba3	Leszek Koltunski	precision highp int;
22	2e7ad49f	Leszek Koltunski
23	94f6d472	Leszek Koltunski	in vec3 a_Position; // Per-vertex position.
24			in vec3 a_Normal; // Per-vertex normal vector.
25	6f2d931d	Leszek Koltunski	in vec3 a_Inflate; // This vector describes the direction this vertex needs to go when we 'inflate' the whole mesh.
26			// If the mesh is locally smooth, this is equal to the normal vector. Otherwise (on sharp edges) - no.
27	94f6d472	Leszek Koltunski	in vec2 a_TexCoordinate; // Per-vertex texture coordinate.
28	6f2d931d	Leszek Koltunski
29	94f6d472	Leszek Koltunski	out vec3 v_Position; //
30	3fc9327a	Leszek Koltunski	out vec3 v_endPosition; // for Transform Feedback only
31	e54bfada	Leszek Koltunski
32			#ifdef PREAPPLY
33			out vec3 v_Inflate; // Transform Feedback for preapply effects
34			#endif
35
36	94f6d472	Leszek Koltunski	out vec3 v_Normal; //
37			out vec2 v_TexCoordinate; //
38	5e331bc8	Leszek Koltunski
39	bfe2c61b	Leszek Koltunski	uniform mat4 u_MVPMatrix; // the combined model/view/projection matrix.
40			uniform mat4 u_MVMatrix; // the combined model/view matrix.
41	7a5e538a	Leszek Koltunski	uniform float u_Inflate; // how much should we inflate (>0.0) or deflate (<0.0) the mesh.
42	6a06a912	Leszek Koltunski
43			#if NUM_VERTEX>0
44	ad33f883	Leszek Koltunski	uniform int vNumEffects; // total number of vertex effects
45	15aa7d94	Leszek Koltunski	uniform int vName[NUM_VERTEX]; // their names.
46	f6cac1f6	Leszek Koltunski	uniform vec4 vUniforms[3NUM_VERTEX];// i-th effect is 3 consecutive vec4's: [3i], [3i+1], [3i+2].
47			// The first vec4 is the Interpolated values,
48	4aa38649	Leszek Koltunski	// second vec4: first float - cache, next 3: Center, the third - the Region.
49	341c803d	Leszek Koltunski
50			//////////////////////////////////////////////////////////////////////////////////////////////
51			// HELPER FUNCTIONS
52			//////////////////////////////////////////////////////////////////////////////////////////////
53	353f7580	Leszek Koltunski	// Return degree of the point as defined by the Region. Currently only supports spherical regions.
54	9420f2fe	Leszek Koltunski	//
55			// Let 'PS' be the vector from point P (the current vertex) to point S (the center of the effect).
56	353f7580	Leszek Koltunski	// Let region.xyz be the vector from point S to point O (the center point of the region sphere)
57			// Let region.w be the radius of the region sphere.
58			// (This all should work regardless if S is inside or outside of the sphere).
59	73af5285	Leszek Koltunski	//
60	353f7580	Leszek Koltunski	// Then, the degree of a point with respect to a given (spherical!) Region is defined by:
61	9420f2fe	Leszek Koltunski	//
62	353f7580	Leszek Koltunski	// If P is outside the sphere, return 0.
63	50be8733	Leszek Koltunski	// Otherwise, let X be the point where the halfline SP meets the sphere - then return \|PX\|/\|SX\|,
64	9420f2fe	Leszek Koltunski	// aka the 'degree' of point P.
65			//
66	ff8ad0a7	Leszek Koltunski	// We solve the triangle OPX.
67	9420f2fe	Leszek Koltunski	// We know the lengths \|PO\|, \|OX\| and the angle OPX, because cos(OPX) = cos(180-OPS) = -cos(OPS) = -PSPO/(\|PS\|\|PO\|)
68			// then from the law of cosines PX^2 + PO^2 - 2PXPO*cos(OPX) = OX^2 so PX = -a + sqrt(a^2 + OX^2 - PO^2)
69			// where a = PS*PO/\|PS\| but we are really looking for d = \|PX\|/(\|PX\|+\|PS\|) = 1/(1+ (\|PS\|/\|PX\|) ) and
70			// \|PX\|/\|PS\| = -b + sqrt(b^2 + (OX^2-PO^2)/PS^2) where b=PS*PO/\|PS\|^2 which can be computed with only one sqrt.
71	341c803d	Leszek Koltunski
72	0f10a0b6	Leszek Koltunski	float degree(in vec4 region, in vec3 PS)
73	341c803d	Leszek Koltunski	{
74	4aa38649	Leszek Koltunski	vec3 PO = PS + region.xyz;
75			float D = region.w*region.w-dot(PO,PO); // D = \|OX\|^2 - \|PO\|^2
76	9420f2fe	Leszek Koltunski
77			if( D<=0.0 ) return 0.0;
78
79	341c803d	Leszek Koltunski	float ps_sq = dot(PS,PS);
80	20af7b69	Leszek Koltunski	float one_over_ps_sq = 1.0/(ps_sq-(sign(ps_sq)-1.0)); // return 1.0 if ps_sq = 0.0
81			// Important: if we want to write
82			// b = 1/a if a!=0, b=1 otherwise
83			// we need to write that as
84			// b = 1 / ( a-(sign(a)-1) )
85			// [ and NOT 1 / ( a + 1 - sign(a) ) ]
86			// because the latter, if 0<a<2^-24,
87			// will suffer from round-off error and in this case
88			// a + 1.0 = 1.0 !! so 1 / (a+1-sign(a)) = 1/0 !
89	7c227ed2	Leszek Koltunski	float DOT = dot(PS,PO)*one_over_ps_sq;
90	341c803d	Leszek Koltunski
91	9420f2fe	Leszek Koltunski	return 1.0 / (1.0 + 1.0/(sqrt(DOTDOT+Done_over_ps_sq)-DOT));
92	341c803d	Leszek Koltunski	}
93
94	81a0b906	leszek	#endif // NUM_VERTEX>0
95
96	6a06a912	Leszek Koltunski	//////////////////////////////////////////////////////////////////////////////////////////////
97	b2dc3c19	Leszek Koltunski
98			void main()
99			{
100	277eddbb	Leszek Koltunski	vec3 v = a_Position + u_Inflate*a_Inflate;
101	a8537f43	Leszek Koltunski	vec3 n = a_Normal;
102	6a06a912	Leszek Koltunski
103	e54bfada	Leszek Koltunski	#ifdef PREAPPLY
104			vec3 inf = a_Inflate;
105			#endif
106
107	6a06a912	Leszek Koltunski	#if NUM_VERTEX>0
108	7cd24173	leszek	int effect=0;
109	b2b83871	Leszek Koltunski
110	6a06a912	Leszek Koltunski	for(int i=0; i<vNumEffects; i++)
111			{
112	7cd24173	leszek	// ENABLED EFFECTS WILL BE INSERTED HERE
113	b2b83871	Leszek Koltunski
114	7cd24173	leszek	effect+=3;
115	6a06a912	Leszek Koltunski	}
116			#endif
117	f80337b5	leszek
118	a8537f43	Leszek Koltunski	v_Position = v;
119	667884b0	Leszek Koltunski
120			#ifdef PREAPPLY
121			v_endPosition = n;
122	e54bfada	Leszek Koltunski	v_Inflate = inf;
123	667884b0	Leszek Koltunski	#else
124			v_endPosition = v + 0.5*n;
125			#endif
126
127	2dacdeb2	Leszek Koltunski	v_TexCoordinate = a_TexCoordinate;
128	f80337b5	leszek	v_Normal = normalize(vec3(u_MVMatrix*vec4(n,0.0)));
129	3fc9327a	Leszek Koltunski	gl_Position = u_MVPMatrix*vec4(v,1.0);
130	d333eb6b	Leszek Koltunski	}

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library / src / main / res / raw / main_vertex_shader.glsl @ e54bfada