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Transcript
Fundamentals of Computer Graphics
Part 8
Hierarchical&Object oriented Graphics
prof.ing.Václav Skala, CSc.
University of West Bohemia
Plzeň, Czech Republic
©2002
Prepared with Angel,E.: Interactive Computer
Graphics – A Top Down Approach with OpenGL,
Addison Wesley, 2001
Symbols&Instances
Extension to transformations – Chapter 4
GLU&GLUT provide objects built on the top
of OpenGL basic primitives
NONHIERARCHICAL APPROACH
• primitives or objects -> SYMBOLS
• world is a collection of symbols
APIs distinguish
• model frame or model coordinates – where the model is
defined
• world frame
Transformation from model frame to world frame is needed
Fundamentals of Computer Graphics
2
Symbols&Instances
M=TRS
In OpenGL
• appropriate transformation set up from the model frame
(frame of symbols) to the world frame
• apply it to the MODEL-VIEW matrix BEFORE
EXECUTING the code
Fundamentals of Computer Graphics
3
Symbols&Instances
glMatrixMode(GL_MODELVIEW);
/* M = T R S */
glLoadIdentity ( );
glTranslatef (....);
glRotatef (...);
glScalef(..);
glutSolidCylinder (.....) /* or other symbol */
Fundamentals of Computer Graphics
4
Symbols&Instances
•
•
equivalent of a model in
the form of the table
contains flat information –
no information on the
actual structure
• how to represent complex structures?
• each part has its own model frame
coordinate system
• how to manipulate with substructures
Fundamentals of Computer Graphics
5
Hierarchical Models
A car chassis & 4 wheels
main ( );
{ float s = ...;/*speed*/
float d[3]= {...}; /* direction */
draw_right_front_wheel (s,d);
draw_left_front_wheel (s,d);
draw_right_rear_wheel (s,d);
draw_left_rear_wheel (s,d);
draw_chassis (s,d);
}/* WE DO NOT WANT THIS*/
two frames of animation
Fundamentals of Computer Graphics
6
Hierarchical Models
Description - as a graph
• nodes & edges
Tree – a directed graph
• root node
tree structure of a car
• parent node
• child nodes
• terminal nodes – leafs
Direct Acyclic Graph (DAG)
• store a position of each wheel
Trees & DAGs – hierarchical methods
expressing the relational-ships
Fundamentals of Computer Graphics
7
A Robot Arm
A robot arm – three parts
•
each has 3 degrees of
freedom – described by joint
angle between components
display ( )
{
glRotatef(theta, 0.0., 1.0., 0.0);
base( );
glTranslatef(0.0, h1, 0.0);
glRotatef(phi, 0.0., 0.0., 1.0);
lower_arm ( );
glTranslatef(0.0, h2, 0.0);
glRotatef(psi, 0.0., 0.0., 1.0);
upper_arm( );
}/* arm positioning independent to
individual parts details */
Fundamentals of Computer Graphics
8
A Robot Arm
If information stored in nodes
(not in edges) – each node
must store at least:
• pointer to a function that
draws the object
represented by the node
• matrix that positions,
scales and orients this
node relative to the node’s
parent (including children)
• pointer to children of the
node
Fundamentals of Computer Graphics
9
Trees and Traversal
All matrices are incremental and any traversal algorithm can be
used (depth-first or breadth-first); - we will traverse left to
right & depth first
Explicit traversal explicitly in the code, using stacks to store
required matrices and attributes
Recursive – code is simpler, storage of matrices&attributes done
implicitly
Fundamentals of Computer Graphics
10
Trees and Traversal
All matrices are incremental and any traversal algorithm can be
used (depth-first or breadth-first); - we will traverse left to
right & depth first
Explicit traversal explicitly in the code, using stacks to store
required matrices and attributes
Recursive – code is simpler, storage of matrices&attributes done
implicitly
Fundamentals of Computer Graphics
11
Stack Based Traversal
figure( )
{
glPushMatrix( ); torso ( );
glTranslatef (..); glRotate3 (..);
head ( ); glPopMatrix ( );
/* restore state for the torso */
glPushMatrix( ); /* save the state for torso*/
glTranslatef (..); glRotate3 (..); left_upper_leg ( );
glTranslatef (..); glRotate3 (..); left_lower_leg ( ); /* incremental change */
glPopMatrix ( ); /* recent state recovery */
/* ----*/
glPushMatrix( );
..........
}
Fundamentals of Computer Graphics
12
Tree Data Structures
typedef struct treenode
{ GLfloat m[16];
void (*f) ( );
struct treenode *sibling;
struct treenode *child;
} treenode;
....
treenode torso_node, head_node, ....;
Fundamentals of Computer Graphics
13
Tree Data Structures
glLoadIdentity ( );
glRotatef(theta[0],0.0, 1.0, 0.0);
glGetFloatv(GL_MODELVIEW_MATRIX, torso_node.m);
/* matrix elements copied to the m of the node */
/* the torso node has no sibling; leftmost child is the head node */
/* rest of the code for the torso node*/
torso_node.f = torso;
torso_node.sibling = NULL;
torso_node.child = &head_node;
Fundamentals of Computer Graphics
14
Tree Data Structures
/* for the upper-arm node */
glLoadIdentity ( );
glTranslatef(-(TORSO_RADIUS+UPPER_ARM_RADIUS),
0.9*TORSO_HEIGHT, 0.0)
glRotatef(theta[3], 1.0, 0.0, 0.0);
glGetFloatv(GL_MODELVIEW_MATRIX, lua_node.m);
/* matrix elements copied to the m of the node */
lua_node.f = left_upper_arm;
lua_node.sibling = &rua_node;
lua_node.child = &lla_node;
Fundamentals of Computer Graphics
15
Tree Data Structures – Recursive Solution
/* assumption MODEL-VIEW state */
void traverse (treenode* root);
{
if (root==NULL) return;
glPushMatrix( );
glMultMatrixf(root->m);
root->f( );
if (root->child!=NULL) traverse(root->child);
glPopMatrix ( );
if (root->sibling!=NULL) traverse(root->sibling);
} /* traversal method is independent from the particular tree !! */
Fundamentals of Computer Graphics
16
Tree Data Structures – Recursive Solution
generic display callback function
void display (void)
{
glClear(GL_COLOR_BUFFER_BIT |
GL_DEPTH_BUFFER_BIT);
glLoadIdentity ( );
traverse ( &torso_node);
glutSwapBuffers( );
}
Read p.346-347 to analyze the whole program including the
interaction, read chapters 8.6 – 8.8 on your own
Fundamentals of Computer Graphics
17
Other Tree Structures
DAG structures provide tools for describing
scenes
• Constructive Solid Geometry – CSG trees
uses solids objects to create the required
object
how to make an object with a hole?
• BSP trees – work wit surface
• Quadtrees & Octrees – discrete technique
& space subdivision
Fundamentals of Computer Graphics
18
Constructive Solid Geometry
CSG – set operations
• union
• intersection
• difference
• complement
AB
AB
A-B
-B
Describe intersection
of 3 orthogonal cylinders
•
•
simple symbolic manipulations
difficult to evaluate and render
Fundamentals of Computer Graphics
19
Constructive Solid Geometry
plane A separates polygons to two groups =>
BINARY SPATIAL-PARTITIONING TREE
• standard tree techniques can be used
• useful for visibility solution
Fundamentals of Computer Graphics
20
Quadtrees & Octrees
BSP trees do not have “a orientation” in
space – application can be costly
Quadtrees – hierarchical space subdivision
technique - often used for image data
compression - pixels
Octree – extension to 3D applications
volume representation - voxels
Fundamentals of Computer Graphics
21
Hierarchical & Object oriented Graphics
In this chapter you have learnt:
• fundamentals how very complex structures can be created
and manipulated
• how the hierarchical structures can be used for real
applications
• what could be a structure of database for geometric objects
Have a look at:
• the SPIDER project at http://herakles.zcu.cz - hierarchical
modeling & animation
• F-rep project – HyperFun language for implicit modeling –
practical use of CSG trees
Fundamentals of Computer Graphics
22
