Geometry and Appearances【转】
https://github.com/AnalyticalGraphicsInc/cesium/wiki/Geometry-and-Appearances
Geometry and Appearances
Part I is now on the Cesium website.
Part II: Creating Custom Geometry and Appearances
This is now out-of-date. There will be a new version as part of #1683.
Cesium supports many common geometries and appearances out of the box. However, we may need to visualize a new type of geometry or apply custom shading to existing geometries.
Since geometries and appearances are decoupled, we can add new geometries that are compatible with many appearances and vice-versa. Doing so requires some knowledge of computer graphics and geometry. In this tutorial, we create a simple new Geometry
and Appearance
.
To follow along, download the latest full version of Cesium, or fork the Cesium repo. See the Contributor's Guide for details. If you develop new geometries or appearances that would be useful to the Cesium community, please consider contributing them.
Geometry
Geometry
is a geometry representation that supports indexed or non-indexed triangles, lines, or points. Let's start by making a simple geometry for a tetrahedron, which is a solid composed of four equilateral triangles forming a pyramid. To begin, create the file TetrahedronGeometry.js
in the Cesium Source/Core/
directory and add the following code:
/*global define*/
define([
'./Cartesian3',
'./ComponentDatatype',
'./PrimitiveType',
'./BoundingSphere',
'./GeometryAttribute',
'./GeometryAttributes',
'./GeometryPipeline',
'./VertexFormat',
'./Geometry'
], function(
Cartesian3,
ComponentDatatype,
PrimitiveType,
BoundingSphere,
GeometryAttribute,
GeometryAttributes,
GeometryPipeline,
VertexFormat,
Geometry) {
"use strict";
var TetrahedronGeometry = function() {
var negativeRootTwoOverThree = -Math.sqrt(2.0) / 3.0;
var negativeOneThird = -1.0 / 3.0;
var rootSixOverThree = Math.sqrt(6.0) / 3.0;
var positions = new Float64Array(4 * 3);
// position 0
positions[0] = 0.0;
positions[1] = 0.0;
positions[2] = 1.0;
// position 1
positions[3] = 0.0;
positions[4] = (2.0 * Math.sqrt(2.0)) / 3.0;
positions[5] = negativeOneThird;
// position 2
positions[6] = -rootSixOverThree;
positions[7] = negativeRootTwoOverThree;
positions[8] = negativeOneThird;
// position 3
positions[9] = rootSixOverThree;
positions[10] = negativeRootTwoOverThree;
positions[11] = negativeOneThird;
var attributes = new GeometryAttributes({
position : new GeometryAttribute({
componentDatatype : ComponentDatatype.DOUBLE,
componentsPerAttribute : 3,
values : positions
})
});
var indices = new Uint16Array(4 * 3);
// back triangle
indices[0] = 0;
indices[1] = 1;
indices[2] = 2;
// left triangle
indices[3] = 0;
indices[4] = 2;
indices[5] = 3;
// right triangle
indices[6] = 0;
indices[7] = 3;
indices[8] = 1;
// bottom triangle
indices[9] = 2;
indices[10] = 1;
indices[11] = 3;
this.attributes = attributes;
this.indices = indices;
this.primitiveType = PrimitiveType.TRIANGLES;
this.boundingSphere = undefined;
};
return TetrahedronGeometry;
});
The tetrahedron is made up of four vertices, whose positions lie on the unit sphere. For precision, we always store positions in a Float64Array
.
Each of the tetrahedron's four triangles is defined by three indices. Using indices - as opposed to defining three vertices per triangle - allows us to reuse vertices to save memory. For our tetrahedron, each vertex is indexed three times since each vertex has three incident triangles. Indices are stored in a Uint16Array
, but can also be stored in a Uint32Array
if more than 64K vertices are used.
Tip: Use IndexDatatype.createTypedArray
to allocate the right typed array for indices.
As shown with the blue arrow on the back triangle, the outward-facing side of the triangle is defined by ordering indices in counter-clockwise order. If we wrapped four fingers of our righthand around the back triangle in the orders the indices are defined, 0 - 1 - 2
, our thumb points in the direction that is considered outward facing. In Cesium, this counter-clockwise winding order is required.
Our tetrahedron assigns to four public properties, which are required to meet the Geometry
interface.
this.attributes = attributes;
this.indices = indices;
this.primitiveType = Cesium.PrimitiveType.TRIANGLES;
this.boundingSphere = undefined;
attributes
- AGeometryAttributes
object where each property is aGeometryAttribute
. Each attribute defines one characteristic of the vertices in the geometry, and data is stored in a typed array. Examples of attributes include positions, normals, and colors.indices
(optional) - Index data that indexes intoattributes
. Using indices allows us to reuse vertices without duplicating them (and avoiding duplication is virtually always a win). For example, our tetrahedron has 4 vertices and each vertex is part of 3 different triangles. Using indices allows us to reuse the same vertex for each triangle instead of creating a copy.primitiveType
- The primitive that composes the geometry. Most often this isTRIANGLES
orLINES
, which provide the most flexibility. This determines how the indices (or vertices) are interpreted. For example, whenTRIANGLES
is used, every three vertices is interpreted as a triangle.boundingSphere
(optional) - A sphere that encloses the geometry. This is used to improve drawing performance via culling.
Bounding Spheres
We can improve the performance of drawing our tetrahedron by computing the bounding sphere.
this.boundingSphere = BoundingSphere.fromVertices(positions);
BoundingSphere
has functions to compute a tight bounding sphere like fromVertices
, but in many cases we can use our knowledge of the geometry to quickly create a tighter bounding sphere. Since we know the tetrahedron's vertices lie on the unit sphere, we can just use the unit sphere as the bounding sphere:
this.boundingSphere = new BoundingSphere(new Cartesian3(0.0, 0.0, 0.0), 1.0);
Visualizing the Tetrahedron with a Primitive
Our tetrahedron is centered in its local coordinate system and inscribed in the unit sphere. To visualize it, we need to compute a modelMatrix
to position and scale it. In addition, since it only has position attributes, we'll use an appearance with flat
shading so normals are not required. First, build the code and run the HTTP server for testing (.\Tools\apache-ant-1.8.2\bin\ant combine runServer
). Navigate to http://localhost:8080/Apps/Sandcastle/index.html
, your local version of Cesium Sandcastle. Paste the following code in the Sandcastle Hello World demo:
var widget = new Cesium.CesiumWidget('cesiumContainer');
var scene = widget.scene;
var ellipsoid = widget.centralBody.ellipsoid;
var modelMatrix = Cesium.Matrix4.multiplyByUniformScale(
Cesium.Matrix4.multiplyByTranslation(
Cesium.Transforms.eastNorthUpToFixedFrame(ellipsoid.cartographicToCartesian(
Cesium.Cartographic.fromDegrees(-100.0, 40.0))),
new Cesium.Cartesian3(0.0, 0.0, 200000.0)),
500000.0);
var instance = new Cesium.GeometryInstance({
geometry : new Cesium.TetrahedronGeometry(),
modelMatrix : modelMatrix,
attributes : {
color : Cesium.ColorGeometryInstanceAttribute.fromColor(Cesium.Color.WHITE)
}
});
scene.primitives.add(new Cesium.Primitive({
geometryInstances : instance,
appearance : new Cesium.PerInstanceColorAppearance({
flat : true,
translucent : false
})
}));
Here's our tetrahedron, scaled and positioned, without shading:
Without shading, it is hard to see the surfaces. To view a wireframe, we could change the primitiveType
to LINES
and change the indices to represent a line segment per unique triangle edge. However, GeometryPipeline
is a collection of functions that transform geometries. The function GeometryPipeline.toWireframe transforms a geometry to use the LINES
primitive type. Replace the instance with this:
var instance = new Cesium.GeometryInstance({
geometry : Cesium.GeometryPipeline.toWireframe(new Cesium.TetrahedronGeometry()),
modelMatrix : modelMatrix,
attributes : {
color : Cesium.ColorGeometryInstanceAttribute.fromColor(Cesium.Color.WHITE)
}
});
Tip: Use GeometryPipeline.toWireframe
for debugging to visualize a geometry's primitives.
Adding Normals for Shading
To use an appearance with shading, the geometry must have a normal
attribute. The normal to a triangle is a unit vector that is perpendicular to the triangle.
In our case, we need to compute the normals for each vertex to determine the shading of the geometry. The normal to a vertex is a vector in the direction of the sum of the normals for each triangle the vertex composes and with a magnitude of 1. Below shows how we can add the normals of
Normal vectors can be computed after the geometry is created using GeometryPipeline.computeNormal. Lets take a look at how the generated normals effect shading. In TetrahedronGeometry,js
, replace the last few lines of the constructor (after we set the values of the indices) with the following:
var boundingSphere = new BoundingSphere(new Cartesian3(0.0, 0.0, 0.0), 1.0);
var geometry = GeometryPipeline.computeNormal(new Geometry({
attributes: attributes,
indices: indices,
primitiveType: PrimitiveType.TRIANGLES,
boundingSphere: boundingSphere
}));
this.attributes = geometry.attributes;
this.indices = geometry.indices;
this.primitiveType = geometry.primitiveType;
this.boundingSphere = geometry.boundingSphere;
Build Cesium then reload the sandcastle example to see the results:
This is not what we would expect shading to look like. To better understand what's happening, we can visualize the normal vectors with createTangentSpaceDebugPrimitive
. Add the following code to the end of the Sandcastle example:
scene.primitives.add(Cesium.createTangentSpaceDebugPrimitive({
geometry: tetrahedron,
modelMatrix: modelMatrix,
length: 0.2
}));
As you can see, the normal vectors aren't very "normal" to any of the triangles of the tetrahedron. Using single vertices works best when angle between adjacent triangles is close to 180 degrees (like the triangles in a sphere), and thus the normals for the adjacent triangles are pointing in the same general direction. To get better shading, we must duplicate each vertex so that adjacent triangles no longer share vertices.
In TetrahedronGeometry.js
, replace the positions and indices with the following:
var positions = new Float64Array(4 * 3 * 3);
// back triangle
positions[0] = 0.0;
positions[1] = 0.0;
positions[2] = 1.0;
positions[3] = 0.0;
positions[4] = (2.0 * Math.sqrt(2.0)) / 3.0;
positions[5] = negativeOneThird;
positions[6] = -rootSixOverThree;
positions[7] = negativeRootTwoOverThree;
positions[8] = negativeOneThird;
// left triangle
positions[9] = 0.0;
positions[10] = 0.0;
positions[11] = 1.0;
positions[12] = -rootSixOverThree;
positions[13] = negativeRootTwoOverThree;
positions[14] = negativeOneThird;
positions[15] = rootSixOverThree;
positions[16] = negativeRootTwoOverThree;
positions[17] = negativeOneThird;
// right triangle
positions[18] = 0.0;
positions[19] = 0.0;
positions[20] = 1.0;
positions[21] = rootSixOverThree;
positions[22] = negativeRootTwoOverThree;
positions[23] = negativeOneThird;
positions[24] = 0.0;
positions[25] = (2.0 * Math.sqrt(2.0)) / 3.0;
positions[26] = negativeOneThird;
// bottom triangle
positions[27] = -rootSixOverThree;
positions[28] = negativeRootTwoOverThree;
positions[29] = negativeOneThird;
positions[30] = 0.0;
positions[31] = (2.0 * Math.sqrt(2.0)) / 3.0;
positions[32] = negativeOneThird;
positions[33] = rootSixOverThree;
positions[34] = negativeRootTwoOverThree;
positions[35] = negativeOneThird;
var indices = new Uint16Array(4 * 3);
// back triangle
indices[0] = 0;
indices[1] = 1;
indices[2] = 2;
// left triangle
indices[3] = 3;
indices[4] = 4;
indices[5] = 5;
// right triangle
indices[6] = 6;
indices[7] = 7;
indices[8] = 8;
// bottom triangle
indices[9] = 9;
indices[10] = 10;
indices[11] = 11;
We can still use GeometryPipeline.computeNormal
to find the normal vectors. To see the results, build Cesium and reload the sandcastle example.
Now that we've duplicated the positions, the normal vector for each position is perpendicular to the triangle that vertices composes. This corrects the shading.
Using a Web Worker
Using a web workers for a geometry allows the computation to happen asynchronously, which keeps the UI responsive. The computation for our tetrahedron is pretty trivial, but many geometry computations can be complicated so all built-in Cesium geometries use a web worker.
The first step is to add createTetrahedronGeometry.js
to the Source/Workers/
directory. This will contain a function to instruct the web worker what do to when it is triggered. In this case, we want to create the geometry in the worker. Copy and paste the following code into the createTetrahedronGeometry.js
file:
/*global define*/
define([
'../Core/TetrahedronGeometry',
'../Scene/PrimitivePipeline',
'./createTaskProcessorWorker'
], function(
TetrahedronGeometry,
PrimitivePipeline,
createTaskProcessorWorker) {
"use strict";
function createTetrahedronGeometry(parameters, transferableObjects) {
var geometry = TetrahedronGeometry.createGeometry();
PrimitivePipeline.transferGeometry(geometry, transferableObjects);
return {
geometry : geometry,
index : parameters.index
};
}
return createTaskProcessorWorker(createTetrahedronGeometry);
});
Now we're going to modify TetrahedronGeometry.js
. We don't want the computation of positions and indices to happen until TetrahedronGeometry.computeGeometry
is called. Change the current TetrahedronGeometry
constructor to:
TetrahedronGeometry.createGeometry = function() {
...
};
This function is going to return a Geometry
. Replace the last four lines of the function (this.attributes = attributes;
....) with
return new Geometry({
attributes : attributes,
indices : indices,
primitiveType : PrimitiveType.TRIANGLES,
boundingSphere : new BoundingSphere(new Cartesian3(0.0, 0.0, 0.0), 1.0)
});
The next step is to introduce a new constructor. Add the following code:
var TetrahedronGeometry = function() {
this._workerName = 'createTetrahedronGeometry';
};
With these changes, we can generate the tetrahedron asynchronously using the same syntax we were using before. We also have the option to generate it synchronously by calling TetrahedronGeometry.createGeometry
from the code.