table of contents
- unstable 0.11-11
GRAPHMAT(3) | Library Functions Manual | GRAPHMAT(3) |
NAME¶
m_alloc2, m_free2, v_alloc2, v_free2, m_alloc3, m_free3, v_alloc3, v_free3, m_cpy2, m_unity2, v_cpy2, v_fill2, v_unity2, v_zero2, m_cpy3, m_unity3, v_cpy3, v_fill3, v_unity3, v_zero3, m_det2, v_len2, vtmv_mul2, vv_inprod2, m_inv2, m_tra2, mm_add2, mm_mul2, mm_sub2, mtmm_mul2, sm_mul2, mv_mul2, sv_mul2, v_homo2, v_norm2, vv_add2, vv_sub2, vvt_mul2, m_det3, v_len3, vtmv_mul3, vv_inprod3, m_inv3, m_tra3, mm_add3, mm_mul3, mm_sub3, mtmm_mul3, sm_mul3, mv_mul3, sv_mul3, v_homo3, v_norm3, vv_add3, vv_cross3, vv_sub3, vvt_mul3, miraxis2, mirorig2, mirplane2, rot2, scaorig2, scaplane2, scaxis2, transl2, miraxis3, mirorig3, mirplane3, prjorthaxis, prjpersaxis, rot3, scaorig3, scaplane3, scaxis3, transl3 - 3d graphics and associated matrix and vector routines
SYNOPSIS¶
#include <graphmat.h>
/* Data initialisation */
hmat2_t *m_alloc2(m_result)
hmat2_t *m_result; void m_free2(matrix)
hmat2_t *matrix; hvec2_t *v_alloc2(v_result)
hvec2_t *v_result; void v_free2(vector)
hmat2_t *vector; hmat3_t *m_alloc3(m_result)
hmat3_t *m_result; void m_free3(matrix)
hmat3_t *matrix; hvec3_t *v_alloc3(v_result)
hvec3_t *v_result; void v_free3(vector)
hmat3_t *vector; hmat2_t *m_cpy2(m_source, m_result)
hmat2_t *m_source, *m_result; hmat2_t *m_unity2( m_result)
hmat2_t *m_result; hvec2_t *v_cpy2(v_source, v_result)
hvec2_t *v_source, *v_result; hvec2_t *v_fill2(x, y, w, v_result)
double x, y, w;
hvec2_t *v_result; hvec2_t *v_unity2(axis, v_result)
b_axis axis;
hvec2_t *v_result; hvec2_t *v_zero2(v_result)
hvec2_t *v_result; hmat3_t *m_cpy3(m_source, m_result)
hmat3_t *m_source, *m_result; hmat3_t *m_unity3(m_result)
hmat3_t *m_result; hvec3_t *v_cpy3(v_source, v_result)
hvec3_t *v_source, *v_result; hvec3_t *v_fill3(x, y, z, w, v_result)
double x, y, z, w;
hvec3_t *v_result; hvec3_t *v_unity3(axis, v_result)
b_axis axis;
hvec3_t *v_result; hvec3_t *v_zero3(vector)
hvec3_t *vector;
/* Basic Linear Algebra */
double m_det2(matrix)
hmat2_t *matrix; double v_len2(vector)
hvec2_t *vector; double vtmv_mul2(vector, matrix)
hvec2_t *vector;
hmat2_t *matrix; double vv_inprod2(vectorA, vectorB)
hvec2_t *vectorA, *vectorB; hmat2_t *m_inv2(matrix, m_result)
hmat2_t *matrix, *m_result; hmat2_t *m_tra2(matrix, m_result)
hmat2_t *matrix, *m_result; hmat2_t *mm_add2(matrixA, matrixB, m_result)
hmat2_t *matrixA, *matrixB, *m_result; hmat2_t *mm_mul2(matrixA, matrixB, m_result)
hmat2_t *matrixA, *matrixB, *m_result; hmat2_t *mm_sub2(matrixA, matrixB, m_result)
hmat2_t *matrixA, *matrixB, *m_result; hmat2_t *mtmm_mul2(matrixA, matrixB, m_result)
hmat2_t *matrixA, *matrixB, *m_result; hmat2_t *sm_mul2(scalar, matrix, m_result)
double scalar;
hmat2_t *matrix, *m_result; hmat2_t *vvt_mul2(vectorA, vectorB, m_result)
hvec2_t *vectorA, *vectorB;
hmat2_t *m_result; hvec2_t *mv_mul2(matrix, vector, v_result)
hmat2 *matrix;
hvec2_t *vector, *v_result; hvec2_t *sv_mul2(scalar, vector, v_result)
double scalar;
hvec2_t *vector, *v_result; hvec2_t *v_homo2(vector, v_result)
hvec2_t *vector, *v_result; hvec2_t *v_norm2(vector, v_result)
hvec2_t *vector, *v_result; hvec2_t *vv_add2(vectorA, vectorB, v_result)
hvec2_t *vectorA, *vectorB, *v_result; hvec2_t *vv_sub2(vectorA, vectorB, v_result)
hvec2_t *vectorA, *vectorB, *v_result; double m_det3(matrix)
hmat3_t *matrix; double v_len3(vector)
hvec3_t *vector; double vtmv_mul3(vector, matrix)
hvec3_t *vector;
hmat3_t *matrix; double vv_inprod3(vectorA, vectorB)
hvec3_t *vectorA, *vectorB; hmat3_t *m_inv3(matrix, m_result)
hmat3_t *matrix, *m_result; hmat3_t *m_tra3(matrix, m_result)
hmat3_t *matrix, *m_result; hmat3_t *mm_add3(matrixA, matrixB, m_result)
hmat3_t *matrixA, *matrixB, *m_result; hmat3_t *mm_mul3(matrixA, matrixB, m_result)
hmat3_t *matrixA, *matrixB, *m_result; hmat3_t *mm_sub3(matrixA, matrixB, m_result)
hmat3_t *matrixA, *matrixB, *m_result; hmat3_t *mtmm_mul3(matrixA, matrixB, m_result)
hmat3_t *matrixA, *matrixB, *m_result; hmat3_t *sm_mul3(scalar, matrix, m_result)
double scalar;
hmat3_t *matrix, *m_result; hmat3_t *vvt_mul3(vectorA, vectorB, m_result)
hvec3_t *vectorA, *vectorB;
hmat3_t *m_result; hvec3_t *mv_mul3(matrix, vector, v_result)
hmat3_t *matrix;
*hvec3_t *vector, *v_result; hvec3_t *sv_mul3(scalar, vec, v_result)
double scalar;
hvec3_t *vector, *v_result; hvec3_t *v_homo3(vector, v_result)
hvec3_t *vector, *v_result; hvec3_t *v_norm3(vector, v_result)
hvec3_t *vector, *v_result; hvec3_t *vv_add3(vectorA, vectorB, v_result)
hvec3_t *vectorA, *vectorB, *v_result; hvec3_t *vv_cross3(vectorA, vectorB, v_result)
hvec3_t *vectorA, *vectorB, *v_result; hvec3_t *vv_sub3(vectorA, vectorB, v_result)
hvec3_t *vectorA, *vectorB, *v_result;
/* Elementary transformations */
hmat2_t *miraxis2(axis, m_result)
b_axis axis;
hmat2_t *m_result; hmat2_t *mirorig2(m_result)
hmat2_t *m_result; hmat2_t *rot2( rotation, m_result)
double rotation;
hmat2_t *m_result; hmat2_t *scaorig2(scale, m_result)
double scale;
hmat2_t *m_result; hmat2_t *scaxis2(scale, axis, m_result)
double scale;
b_axis axis;
hmat2_t *m_result; hmat2_t *transl2(translation, m_result)
hvec2_t *translation;
hmat2_t *m_result; hmat3_t *miraxis3(axis, m_result)
b_axis axis;
hmat3_t *m_result; hmat3_t *mirorig3(m_result)
hmat3_t *m_result; hmat3_t *mirplane3(plane, m_result)
b_axis plane;
hmat3_t *m_result; hmat3_t *prjorthaxis(axis, m_result)
b_axis axis;
hmat3_t *m_result; hmat3_t *prjpersaxis(axis, m_result)
b_axis axis;
hmat3_t *m_result; hmat3_t *rot3( rotation, axis, m_result)
double rotation;
b_axis axis;
hmat3_t *m_result; hmat3_t *scaorig3(scale, m_result)
double scale;
hmat3_t *m_result; hmat3_t *scaplane(scale, plane, m_result)
double scale;
b_axis plane;
hmat3_t *m_result; hmat3_t *scaxis3(scale, axis, m_result)
double scale;
b_axis axis;
hmat3_t *m_result; hmat3_t *transl3(translation, m_result)
hvec3_t *translation;
hmat3_t *m_result;
DESCRIPTION¶
Matrix and vector routines associated with 3d graphics in homogeneous coordinates, such as basic linear algebra and elementary transformations.
This library is setup with a multi-level approach.
Level1 : the data level.
Level 2: the data initialisation level.
Level 3: basic linear algebra level.
Level 4: elementary transformation level.
Level 1, the data structures, is realised as follows :
typedef union
{
double a[3];
struct
{
double x, y, w;
} s;
} hvec2_t;
typedef union
{
double a[4];
struct
{
double x, y, z, w;
} s;
} hvec3_t;
typedef struct
{
double m[3][3];
} hmat2_t;
typedef struct
{
double m[4][4];
} hmat3_t;
To access the data elements of a vector or a matrix can be accessed with the macros:
#define v_x( vec ) ((vec).s.x)
#define v_y( vec ) ((vec).s.y)
#define v_z( vec ) ((vec).s.z)
#define v_w( vec ) ((vec).s.w)
#define v_elem( vec, i ) ((vec).a[(i)])
#define m_elem( mat, i, j ) ((mat).m[(i)][(j)])
typedef enum
{
X_AXIS, Y_AXIS, Z_AXIS
} b_axis;
The functions are as follows sorted:
first on the level in which they belong, then on their return value and then
on their name.
NAMES¶
The function names begin with an abbreviation of the type of operand, and in which order the operations will be carried out on that operand. Then the order of and which operation will be carried out, followed by the type of coordinates. (i.e vtmv_mul3(vector, matrix) : first take the transpose of vector, multiply the transpose with matrix, this result is multiplied by the incoming vector, all coordinates are homogeneous 3d coordinates.)
USAGE¶
All the "functions" may have been implemented as macro's, so you can't take the address of a function. It is however guaranteed that arguments of each function/macro will be evaluated only once, except for the result argument, which can be evaluated multiple times.
All operations can be used in place, but overlapping data gives unspecified results.
If the parameter v_result or m_result of a function
or the parameter of an initialisation function equals NULL, space for
the parameter will be dynamically allocated using malloc(), otherwise
the parameter is assumed to hold a pointer to a memory area which can be
used. A pointer to the used area (which may have been new allocated) is
always returned.
If an error occurred like memory could not be allocated, an attempt to divide
by zero occurs, or an attempt to invert a singular matrix a general
error-routine will be called, which has two parameters : gm_errno and
gm_func.
gm_errno is the error type which is one of the following constants :
DIV0, NOMEM or MATSING. gm_func is a pointer to
a string which contains the name of the function where the error
occurred.
A pointer to the error routine is defined as follows :
void (* gm_error)(gm_errno, gm_func);
gm_error_t gm_errno;
char *gm_func;
With gm_error_t is defined as :
typedef enum
{
DIV0, NOMEM, MATSING
} gm_error_t;
The default error handler will abort after printing a diagnostic. You can redirect gm_error to your own error handler. It is not advisable to return from the error handler as error recovery is not expected to take place.
Matrices are of type hmat3_t or hmat2_t for 2d or 3d
coordinates, respectively.
Vectors are of type hvec3_t or hvec2_t.
The elements of a vector can be accessed in two manners, the first one is by name of an element of a structure, the second is like an array.
A plane is described by the normal to that plane, with the assumption made that the origin is an element of the plane.
rotation is assumed to be a radial.
If a function is deallocating memory, it will check if the incoming pointer is a NULL pointer.
/* Level2 : Data initialisation */
m_alloc2(), v_alloc2(), m_alloc3(), v_alloc3() allocate
memory for a data item of type hmat2_t, hvec2_t, hmat3_t and
hvec3_t respectively.
m_free2(), v_free2(), m_free3(), v_free3() reclaim the storage
allocated previously.
m_cpy2(), m_cpy3() copies m_matrix into m_result.
m_unity2(), m_unity3() returns the unity matrix. (2d respectively 3d
homogeneous coordinates)
v_cpy2(), v_cpy3() copies v_source into v_result. (2d
respectively 3d homogeneous coordinates)
v_fill2(), v_fill3() fills v_result according the given values.
v_unity2(), v_unity3() returns the unity vector with w = 1.0,
the incoming basic axis axis = 1.0, and the other element(s) are 0.0;
(2d respectively 3d homogeneous coordinates)
v_zero2(), v_zero3() return a vector with w = 1.0 and the other
elements 0.0;
m_cpy2(), m_cpy3() copies m_source into m_result. (2d
respectively 3d homogeneous coordinates)
/* level3 : Basic Linear Algebra */
m_det2(), m_det3() calculates the determinant of the
incoming matrix. The determinant is calculated in cartesian rather than
homogeneous coordinates.
v_len2(), v_len3() calculates the length of the cathesian part of the
homogeneous vector.
vtmv_mul2(), vtmv_mul3() calculate the result of the transpose of the
incoming vector multiplied by the incoming matrix multiplied by the incoming
vector (2d respectively 3d homogeneous coordinates)
vv_inprod2(), vv_inprod3() calculates the geometrical innerproduct
(vector . vector) of vectorA and vectorB.
m_inv2(), m_inv3() calculates the inverse of matrix. It is an
error if the matrix in singular.
m_tra2(), m_tra3() calculates the transpose matrix. (2d
respectively 3d homogeneous coordinates)
mm_add2(), mm_sub2(), mm_add3(), mm_sub3() calculates the result of
matrixA + respectively - matrixB. This operation is
unspecified in the sense of homogeneous coordinates; the matrices are taken
in their normal, mathematial sense.
mm_mul2(), mm_mul3() calculates the result of matrixA*matrixB
(2d respectively 3d homogeneous coordinates)
mtmm_mul2(), mtmm_mul3() calculates the result of the transpose of the
incoming matrixA multiplied by matrixB multiplied by
matrixA (2d respectively 3d homogeneous coordinates)
sm_mul2(), sm_mul3() calculates the result of scalar*matrix (2d
respectively 3d homogeneous coordinates)
mv_mul2(), mv_mul3() calculates the result of matrix*vector (2d
respectively 3d homogeneous coordinates)
sv_mul2(), sv_mul3() calculates the result of scalar*vector. (2d
respectively 3d homogeneous coordinates)
v_homo2(), v_homo3() homogenize vector so that the w
component becomes 1.0 but the length of the vector in homogeneous
coordinates stays the same. (2d respectively 3d homogeneous coordinates)
v_norm2(), v_norm3() normalises the incoming vector so the length of
the cartesian vector becomes 1.0. The homogeneous length stays the same. (2d
respectively 3d homogeneous coordinates)
vv_add2(), vv_sub2(), vv_add3(), vv_sub3() calculates the result of
vectorA + respectively - vectorB. These operations are done in
the mathematical sense. Be careful with homogeneous coordinates, as not
every possible input makes sense.
vvt_mul2(), vvt_mul3() calculates the result of vectorA
multiplied by the transpose of vectorB (2d respectively 3d
homogeneous coordinates)
vv_cross3() calculates the geometrical crossproduct ( vectorA x
vectorB) of two vectors (3d homogeneous coordinates)
/* level4 : Elementary transformations */
miraxis2(), miraxis3() calculates the mirror matrix with
respect to axis. (2d respectively 3d homogeneous coordinates)
mirorg2(), mirorg3() calculates the mirror matrix relative to the
origin. (2d respectively 3d homogeneous coordinates)
mirplane3() calculates the mirror matrix relative to a plane. (3d
homogeneous coordinates)
rot2() calculates the rotation matrix over rotation relative to
the origin. (2d homogeneous coordinates)
rot3() calculates the rotation matrix over rotation along
axis. (3d homogeneous coordinates)
scaorg2(), scaorg3() calculates the matrix of scaling with scale
relative to the origin. (2d respectively 3d homogeneous coordinates)
scaplane3() calculates the matrix of scaling with scale relative
to a plane of which plane is the normal. (3d homogeneous coordinates)
scaxis2(), scaxis3() calculates the matrix of scaling with scale
relative to the line given by axis. (2d respectively 3d homogeneous
coordinates)
transl2(), transl3() calculates the translation matrix over
translation. (2d respectively 3d homogeneous coordinates)
prjorthaxis() calculates the orthographic projection matrix along
axis. (3d homogeneous coordinates)
prjpersaxis() calculates the perspective projection with along
axis The focus is in the origin. The projection plane is on distance
1.0 before the camera. (3d homogeneous coordinates)
CAVEATS¶
Vector addition and subtraction and matrix addition and subtraction are not defined for homogeneous coordinates. One can add and subtract a point vector and a free vector, but you have to normalise the point vector first. The result of the subtraction of two point vectors is a free vector.
Calculating the determinant of a matrix and the length of a vector is unspecified in the sense of homogeneous coordinates
RETURN VALUES¶
There are six types of return values: void, double, *hvec3_t, *hvec2_t, *hmat3_t and *hmat2_t.
SEE ALSO¶
graphadd(3), graphmat++(3), fmatpinv(3TV), malloc(3V), Graphics and matrix routines.
NOTE¶
Library file is /usr/local/lib/libgraphmat.a
AUTHOR¶
Hans Gringhuis.
Klamer Schutte
15 September 1992 |