1218 lines
37 KiB
Org Mode
1218 lines
37 KiB
Org Mode
#+TITLE: LIZFCM Software Manual (v0.4)
|
|
#+AUTHOR: Elizabeth Hunt
|
|
#+LATEX_HEADER: \notindent \notag \usepackage{amsmath} \usepackage[a4paper,margin=1in,portrait]{geometry}
|
|
#+LATEX: \setlength\parindent{0pt}
|
|
#+STARTUP: entitiespretty fold inlineimages
|
|
|
|
* Design
|
|
The LIZFCM static library (at [[https://github.com/Simponic/math-4610]]) is a successor to my
|
|
attempt at writing codes for the Fundamentals of Computational Mathematics course in Common
|
|
Lisp, but the effort required to meet the requirement of creating a static library became
|
|
too difficult to integrate outside of the ~ASDF~ solution that Common Lisp already brings
|
|
to the table.
|
|
|
|
All of the work established in ~deprecated-cl~ has been painstakingly translated into
|
|
the C programming language. I have a couple tenets for its design:
|
|
+ Implementations of routines should all be done immutably in respect to arguments.
|
|
+ Functional programming is good (it's... rough in C though).
|
|
+ Routines are separated into "modules" that follow a form of separation of concerns
|
|
in files, and not individual files per function.
|
|
|
|
* Compilation
|
|
A provided ~Makefile~ is added for convencience. It has been tested on an ~arm~-based M1 machine running
|
|
MacOS as well as ~x86~ Arch Linux.
|
|
|
|
1. ~cd~ into the root of the repo
|
|
2. ~make~
|
|
|
|
Then, as of homework 5, the testing routines are provided in ~test~ and utilize the
|
|
~utest~ "micro"library. They compile to a binary in ~./dist/lizfcm.test~.
|
|
|
|
Execution of the Makefile will perform compilation of individual routines.
|
|
|
|
But, in the requirement of manual intervention (should the little alien workers
|
|
inside the computer fail to do their job), one can use the following command to
|
|
produce an object file:
|
|
|
|
\begin{verbatim}
|
|
gcc -Iinc/ -lm -Wall -c src/<the_routine>.c -o build/<the_routine>.o
|
|
\end{verbatim}
|
|
|
|
Which is then bundled into a static library in ~lib/lizfcm.a~ and can be linked
|
|
in the standard method.
|
|
|
|
* The LIZFCM API
|
|
** Simple Routines
|
|
*** ~smaceps~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~smaceps~
|
|
+ Location: ~src/maceps.c~
|
|
+ Input: none
|
|
+ Output: a ~float~ returning the specific "Machine Epsilon" of a machine on a
|
|
single precision floating point number at which it becomes "indistinguishable".
|
|
|
|
#+BEGIN_SRC c
|
|
float smaceps() {
|
|
float one = 1.0;
|
|
float machine_epsilon = 1.0;
|
|
float one_approx = one + machine_epsilon;
|
|
|
|
while (fabsf(one_approx - one) > 0) {
|
|
machine_epsilon /= 2;
|
|
one_approx = one + machine_epsilon;
|
|
}
|
|
|
|
return machine_epsilon;
|
|
}
|
|
#+END_SRC
|
|
|
|
*** ~dmaceps~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~dmaceps~
|
|
+ Location: ~src/maceps.c~
|
|
+ Input: none
|
|
+ Output: a ~double~ returning the specific "Machine Epsilon" of a machine on a
|
|
double precision floating point number at which it becomes "indistinguishable".
|
|
|
|
#+BEGIN_SRC c
|
|
double dmaceps() {
|
|
double one = 1.0;
|
|
double machine_epsilon = 1.0;
|
|
double one_approx = one + machine_epsilon;
|
|
|
|
while (fabs(one_approx - one) > 0) {
|
|
machine_epsilon /= 2;
|
|
one_approx = one + machine_epsilon;
|
|
}
|
|
|
|
return machine_epsilon;
|
|
}
|
|
#+END_SRC
|
|
|
|
** Derivative Routines
|
|
*** ~central_derivative_at~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~central_derivative_at~
|
|
+ Location: ~src/approx_derivative.c~
|
|
+ Input:
|
|
- ~f~ is a pointer to a one-ary function that takes a double as input and produces
|
|
a double as output
|
|
- ~a~ is the domain value at which we approximate ~f'~
|
|
- ~h~ is the step size
|
|
+ Output: a ~double~ of the approximate value of ~f'(a)~ via the central difference
|
|
method.
|
|
|
|
#+BEGIN_SRC c
|
|
double central_derivative_at(double (*f)(double), double a, double h) {
|
|
assert(h > 0);
|
|
|
|
double x2 = a + h;
|
|
double x1 = a - h;
|
|
|
|
double y2 = f(x2);
|
|
double y1 = f(x1);
|
|
|
|
return (y2 - y1) / (x2 - x1);
|
|
}
|
|
#+END_SRC
|
|
|
|
*** ~forward_derivative_at~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~forward_derivative_at~
|
|
+ Location: ~src/approx_derivative.c~
|
|
+ Input:
|
|
- ~f~ is a pointer to a one-ary function that takes a double as input and produces
|
|
a double as output
|
|
- ~a~ is the domain value at which we approximate ~f'~
|
|
- ~h~ is the step size
|
|
+ Output: a ~double~ of the approximate value of ~f'(a)~ via the forward difference
|
|
method.
|
|
|
|
#+BEGIN_SRC c
|
|
double forward_derivative_at(double (*f)(double), double a, double h) {
|
|
assert(h > 0);
|
|
|
|
double x2 = a + h;
|
|
double x1 = a;
|
|
|
|
double y2 = f(x2);
|
|
double y1 = f(x1);
|
|
|
|
return (y2 - y1) / (x2 - x1);
|
|
}
|
|
#+END_SRC
|
|
|
|
*** ~backward_derivative_at~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~backward_derivative_at~
|
|
+ Location: ~src/approx_derivative.c~
|
|
+ Input:
|
|
- ~f~ is a pointer to a one-ary function that takes a double as input and produces
|
|
a double as output
|
|
- ~a~ is the domain value at which we approximate ~f'~
|
|
- ~h~ is the step size
|
|
+ Output: a ~double~ of the approximate value of ~f'(a)~ via the backward difference
|
|
method.
|
|
|
|
#+BEGIN_SRC c
|
|
double backward_derivative_at(double (*f)(double), double a, double h) {
|
|
assert(h > 0);
|
|
|
|
double x2 = a;
|
|
double x1 = a - h;
|
|
|
|
double y2 = f(x2);
|
|
double y1 = f(x1);
|
|
|
|
return (y2 - y1) / (x2 - x1);
|
|
}
|
|
#+END_SRC
|
|
|
|
** Vector Routines
|
|
*** Vector Arithmetic: ~add_v, minus_v~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name(s): ~add_v~, ~minus_v~
|
|
+ Location: ~src/vector.c~
|
|
+ Input: two pointers to locations in memory wherein ~Array_double~'s lie
|
|
+ Output: a pointer to a new ~Array_double~ as the result of addition or subtraction
|
|
of the two input ~Array_double~'s
|
|
|
|
#+BEGIN_SRC c
|
|
Array_double *add_v(Array_double *v1, Array_double *v2) {
|
|
assert(v1->size == v2->size);
|
|
|
|
Array_double *sum = copy_vector(v1);
|
|
for (size_t i = 0; i < v1->size; i++)
|
|
sum->data[i] += v2->data[i];
|
|
return sum;
|
|
}
|
|
|
|
Array_double *minus_v(Array_double *v1, Array_double *v2) {
|
|
assert(v1->size == v2->size);
|
|
|
|
Array_double *sub = InitArrayWithSize(double, v1->size, 0);
|
|
for (size_t i = 0; i < v1->size; i++)
|
|
sub->data[i] = v1->data[i] - v2->data[i];
|
|
return sub;
|
|
}
|
|
#+END_SRC
|
|
|
|
*** Norms: ~l1_norm~, ~l2_norm~, ~linf_norm~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name(s): ~l1_norm~, ~l2_norm~, ~linf_norm~
|
|
+ Location: ~src/vector.c~
|
|
+ Input: a pointer to a location in memory wherein an ~Array_double~ lies
|
|
+ Output: a ~double~ representing the value of the norm the function applies
|
|
|
|
#+BEGIN_SRC c
|
|
double l1_norm(Array_double *v) {
|
|
double sum = 0;
|
|
for (size_t i = 0; i < v->size; ++i)
|
|
sum += fabs(v->data[i]);
|
|
return sum;
|
|
}
|
|
|
|
double l2_norm(Array_double *v) {
|
|
double norm = 0;
|
|
for (size_t i = 0; i < v->size; ++i)
|
|
norm += v->data[i] * v->data[i];
|
|
return sqrt(norm);
|
|
}
|
|
|
|
double linf_norm(Array_double *v) {
|
|
assert(v->size > 0);
|
|
double max = v->data[0];
|
|
for (size_t i = 0; i < v->size; ++i)
|
|
max = c_max(v->data[i], max);
|
|
return max;
|
|
}
|
|
#+END_SRC
|
|
|
|
*** ~vector_distance~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~vector_distance~
|
|
+ Location: ~src/vector.c~
|
|
+ Input: two pointers to locations in memory wherein ~Array_double~'s lie, and a pointer to a
|
|
one-ary function ~norm~ taking as input a pointer to an ~Array_double~ and returning a double
|
|
representing the norm of that ~Array_double~
|
|
|
|
#+BEGIN_SRC c
|
|
double vector_distance(Array_double *v1, Array_double *v2,
|
|
double (*norm)(Array_double *)) {
|
|
Array_double *minus = minus_v(v1, v2);
|
|
double dist = (*norm)(minus);
|
|
free(minus);
|
|
return dist;
|
|
}
|
|
#+END_SRC
|
|
|
|
*** Distances: ~l1_distance~, ~l2_distance~, ~linf_distance~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name(s): ~l1_distance~, ~l2_distance~, ~linf_distance~
|
|
+ Location: ~src/vector.c~
|
|
+ Input: two pointers to locations in memory wherein ~Array_double~'s lie, and the distance
|
|
via the corresponding ~l1~, ~l2~, or ~linf~ norms
|
|
+ Output: A ~double~ representing the distance between the two ~Array_doubles~'s by the given
|
|
norm.
|
|
|
|
#+BEGIN_SRC c
|
|
double l1_distance(Array_double *v1, Array_double *v2) {
|
|
return vector_distance(v1, v2, &l1_norm);
|
|
}
|
|
|
|
double l2_distance(Array_double *v1, Array_double *v2) {
|
|
return vector_distance(v1, v2, &l2_norm);
|
|
}
|
|
|
|
double linf_distance(Array_double *v1, Array_double *v2) {
|
|
return vector_distance(v1, v2, &linf_norm);
|
|
}
|
|
#+END_SRC
|
|
|
|
*** ~sum_v~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~sum_v~
|
|
+ Location: ~src/vector.c~
|
|
+ Input: a pointer to an ~Array_double~
|
|
+ Output: a ~double~ representing the sum of all the elements of an ~Array_double~
|
|
|
|
#+BEGIN_SRC c
|
|
double sum_v(Array_double *v) {
|
|
double sum = 0;
|
|
for (size_t i = 0; i < v->size; i++)
|
|
sum += v->data[i];
|
|
return sum;
|
|
}
|
|
#+END_SRC
|
|
|
|
*** ~scale_v~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~scale_v~
|
|
+ Location: ~src/vector.c~
|
|
+ Input: a pointer to an ~Array_double~ and a scalar ~double~ to scale the vector
|
|
+ Output: a pointer to a new ~Array_double~ of the scaled input ~Array_double~
|
|
|
|
#+BEGIN_SRC c
|
|
Array_double *scale_v(Array_double *v, double m) {
|
|
Array_double *copy = copy_vector(v);
|
|
for (size_t i = 0; i < v->size; i++)
|
|
copy->data[i] *= m;
|
|
return copy;
|
|
}
|
|
#+END_SRC
|
|
|
|
*** ~free_vector~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~free_vector~
|
|
+ Location: ~src/vector.c~
|
|
+ Input: a pointer to an ~Array_double~
|
|
+ Output: nothing.
|
|
+ Side effect: free the memory of the reserved ~Array_double~ on the heap
|
|
|
|
#+BEGIN_SRC c
|
|
void free_vector(Array_double *v) {
|
|
free(v->data);
|
|
free(v);
|
|
}
|
|
#+END_SRC
|
|
|
|
*** ~add_element~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~add_element~
|
|
+ Location: ~src/vector.c~
|
|
+ Input: a pointer to an ~Array_double~
|
|
+ Output: a new ~Array_double~ with element ~x~ appended.
|
|
|
|
#+BEGIN_SRC c
|
|
Array_double *add_element(Array_double *v, double x) {
|
|
Array_double *pushed = InitArrayWithSize(double, v->size + 1, 0.0);
|
|
for (size_t i = 0; i < v->size; ++i)
|
|
pushed->data[i] = v->data[i];
|
|
pushed->data[v->size] = x;
|
|
return pushed;
|
|
}
|
|
#+END_SRC
|
|
|
|
*** ~slice_element~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~slice_element~
|
|
+ Location: ~src/vector.c~
|
|
+ Input: a pointer to an ~Array_double~
|
|
+ Output: a new ~Array_double~ with element ~x~ sliced.
|
|
|
|
#+BEGIN_SRC c
|
|
Array_double *slice_element(Array_double *v, size_t x) {
|
|
Array_double *sliced = InitArrayWithSize(double, v->size - 1, 0.0);
|
|
for (size_t i = 0; i < v->size - 1; ++i)
|
|
sliced->data[i] = i >= x ? v->data[i + 1] : v->data[i];
|
|
return sliced;
|
|
}
|
|
#+END_SRC
|
|
|
|
*** ~copy_vector~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~copy_vector~
|
|
+ Location: ~src/vector.c~
|
|
+ Input: a pointer to an ~Array_double~
|
|
+ Output: a pointer to a new ~Array_double~ whose ~data~ and ~size~ are copied from the input ~Array_double~
|
|
|
|
#+BEGIN_SRC c
|
|
Array_double *copy_vector(Array_double *v) {
|
|
Array_double *copy = InitArrayWithSize(double, v->size, 0.0);
|
|
for (size_t i = 0; i < copy->size; ++i)
|
|
copy->data[i] = v->data[i];
|
|
return copy;
|
|
}
|
|
#+END_SRC
|
|
|
|
*** ~format_vector_into~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~format_vector_into~
|
|
+ Location: ~src/vector.c~
|
|
+ Input: a pointer to an ~Array_double~ and a pointer to a c-string ~s~ to "print" the vector out
|
|
into
|
|
+ Output: nothing.
|
|
+ Side effect: overwritten memory into ~s~
|
|
|
|
#+BEGIN_SRC c
|
|
void format_vector_into(Array_double *v, char *s) {
|
|
if (v->size == 0) {
|
|
strcat(s, "empty");
|
|
return;
|
|
}
|
|
|
|
for (size_t i = 0; i < v->size; ++i) {
|
|
char num[64];
|
|
strcpy(num, "");
|
|
|
|
sprintf(num, "%f,", v->data[i]);
|
|
strcat(s, num);
|
|
}
|
|
strcat(s, "\n");
|
|
}
|
|
#+END_SRC
|
|
|
|
** Matrix Routines
|
|
*** ~lu_decomp~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~lu_decomp~
|
|
+ Location: ~src/matrix.c~
|
|
+ Input: a pointer to a ~Matrix_double~ $m$ to decompose into a lower triangular and upper triangular
|
|
matrix $L$, $U$, respectively such that $LU = m$.
|
|
+ Output: a pointer to the location in memory in which two ~Matrix_double~'s reside: the first
|
|
representing $L$, the second, $U$.
|
|
+ Errors: Fails assertions when encountering a matrix that cannot be
|
|
decomposed
|
|
|
|
#+BEGIN_SRC c
|
|
Matrix_double **lu_decomp(Matrix_double *m) {
|
|
assert(m->cols == m->rows);
|
|
|
|
Matrix_double *u = copy_matrix(m);
|
|
Matrix_double *l_empt = InitMatrixWithSize(double, m->rows, m->cols, 0.0);
|
|
Matrix_double *l = put_identity_diagonal(l_empt);
|
|
free_matrix(l_empt);
|
|
|
|
Matrix_double **u_l = malloc(sizeof(Matrix_double *) * 2);
|
|
|
|
for (size_t y = 0; y < m->rows; y++) {
|
|
if (u->data[y]->data[y] == 0) {
|
|
printf("ERROR: a pivot is zero in given matrix\n");
|
|
assert(false);
|
|
}
|
|
}
|
|
|
|
if (u && l) {
|
|
for (size_t x = 0; x < m->cols; x++) {
|
|
for (size_t y = x + 1; y < m->rows; y++) {
|
|
double denom = u->data[x]->data[x];
|
|
|
|
if (denom == 0) {
|
|
printf("ERROR: non-factorable matrix\n");
|
|
assert(false);
|
|
}
|
|
|
|
double factor = -(u->data[y]->data[x] / denom);
|
|
|
|
Array_double *scaled = scale_v(u->data[x], factor);
|
|
Array_double *added = add_v(scaled, u->data[y]);
|
|
free_vector(scaled);
|
|
free_vector(u->data[y]);
|
|
|
|
u->data[y] = added;
|
|
l->data[y]->data[x] = -factor;
|
|
}
|
|
}
|
|
}
|
|
|
|
u_l[0] = u;
|
|
u_l[1] = l;
|
|
return u_l;
|
|
}
|
|
#+END_SRC
|
|
*** ~bsubst~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~bsubst~
|
|
+ Location: ~src/matrix.c~
|
|
+ Input: a pointer to an upper-triangular ~Matrix_double~ $u$ and a ~Array_double~
|
|
$b$
|
|
+ Output: a pointer to a new ~Array_double~ whose entries are given by performing
|
|
back substitution
|
|
|
|
#+BEGIN_SRC c
|
|
Array_double *bsubst(Matrix_double *u, Array_double *b) {
|
|
assert(u->rows == b->size && u->cols == u->rows);
|
|
|
|
Array_double *x = copy_vector(b);
|
|
for (int64_t row = b->size - 1; row >= 0; row--) {
|
|
for (size_t col = b->size - 1; col > row; col--)
|
|
x->data[row] -= x->data[col] * u->data[row]->data[col];
|
|
x->data[row] /= u->data[row]->data[row];
|
|
}
|
|
return x;
|
|
}
|
|
#+END_SRC
|
|
*** ~fsubst~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~fsubst~
|
|
+ Location: ~src/matrix.c~
|
|
+ Input: a pointer to a lower-triangular ~Matrix_double~ $l$ and a ~Array_double~
|
|
$b$
|
|
+ Output: a pointer to a new ~Array_double~ whose entries are given by performing
|
|
forward substitution
|
|
|
|
#+BEGIN_SRC c
|
|
Array_double *fsubst(Matrix_double *l, Array_double *b) {
|
|
assert(l->rows == b->size && l->cols == l->rows);
|
|
|
|
Array_double *x = copy_vector(b);
|
|
|
|
for (size_t row = 0; row < b->size; row++) {
|
|
for (size_t col = 0; col < row; col++)
|
|
x->data[row] -= x->data[col] * l->data[row]->data[col];
|
|
x->data[row] /= l->data[row]->data[row];
|
|
}
|
|
|
|
return x;
|
|
}
|
|
#+END_SRC
|
|
|
|
*** ~solve_matrix_lu_bsubst~
|
|
+ Author: Elizabeth Hunt
|
|
+ Location: ~src/matrix.c~
|
|
+ Input: a pointer to a ~Matrix_double~ $m$ and a pointer to an ~Array_double~ $b$
|
|
+ Output: $x$ such that $mx = b$ if such a solution exists (else it's non LU-factorable as discussed
|
|
above)
|
|
|
|
Here we make use of forward substitution to first solve $Ly = b$ given $L$ as the $L$ factor in
|
|
~lu_decomp~. Then we use back substitution to solve $Ux = y$ for $x$ similarly given $U$.
|
|
|
|
Then, $LUx = b$, thus $x$ is a solution.
|
|
|
|
#+BEGIN_SRC c
|
|
Array_double *solve_matrix_lu_bsubst(Matrix_double *m, Array_double *b) {
|
|
assert(b->size == m->rows);
|
|
assert(m->rows == m->cols);
|
|
|
|
Array_double *x = copy_vector(b);
|
|
Matrix_double **u_l = lu_decomp(m);
|
|
Matrix_double *u = u_l[0];
|
|
Matrix_double *l = u_l[1];
|
|
|
|
Array_double *b_fsub = fsubst(l, b);
|
|
x = bsubst(u, b_fsub);
|
|
free_vector(b_fsub);
|
|
|
|
free_matrix(u);
|
|
free_matrix(l);
|
|
free(u_l);
|
|
|
|
return x;
|
|
}
|
|
#+END_SRC
|
|
|
|
*** ~gaussian_elimination~
|
|
+ Author: Elizabeth Hunt
|
|
+ Location: ~src/matrix.c~
|
|
+ Input: a pointer to a ~Matrix_double~ $m$
|
|
+ Output: a pointer to a copy of $m$ in reduced echelon form
|
|
|
|
This works by finding the row with a maximum value in the column $k$. Then, it uses that as a pivot, and
|
|
applying reduction to all other rows. The general idea is available at [[https://en.wikipedia.org/wiki/Gaussian_elimination]].
|
|
|
|
#+BEGIN_SRC c
|
|
Matrix_double *gaussian_elimination(Matrix_double *m) {
|
|
uint64_t h = 0;
|
|
uint64_t k = 0;
|
|
|
|
Matrix_double *m_cp = copy_matrix(m);
|
|
|
|
while (h < m_cp->rows && k < m_cp->cols) {
|
|
uint64_t max_row = 0;
|
|
double total_max = 0.0;
|
|
|
|
for (uint64_t row = h; row < m_cp->rows; row++) {
|
|
double this_max = c_max(fabs(m_cp->data[row]->data[k]), total_max);
|
|
if (c_max(this_max, total_max) == this_max) {
|
|
max_row = row;
|
|
}
|
|
}
|
|
|
|
if (max_row == 0) {
|
|
k++;
|
|
continue;
|
|
}
|
|
|
|
Array_double *swp = m_cp->data[max_row];
|
|
m_cp->data[max_row] = m_cp->data[h];
|
|
m_cp->data[h] = swp;
|
|
|
|
for (uint64_t row = h + 1; row < m_cp->rows; row++) {
|
|
double factor = m_cp->data[row]->data[k] / m_cp->data[h]->data[k];
|
|
m_cp->data[row]->data[k] = 0.0;
|
|
|
|
for (uint64_t col = k + 1; col < m_cp->cols; col++) {
|
|
m_cp->data[row]->data[col] -= m_cp->data[h]->data[col] * factor;
|
|
}
|
|
}
|
|
|
|
h++;
|
|
k++;
|
|
}
|
|
|
|
return m_cp;
|
|
}
|
|
#+END_SRC
|
|
|
|
*** ~solve_matrix_gaussian~
|
|
+ Author: Elizabeth Hunt
|
|
+ Location: ~src/matrix.c~
|
|
+ Input: a pointer to a ~Matrix_double~ $m$ and a target ~Array_double~ $b$
|
|
+ Output: a pointer to a vector $x$ being the solution to the equation $mx = b$
|
|
|
|
We first perform ~gaussian_elimination~ after augmenting $m$ and $b$. Then, as $m$ is in reduced echelon form, it's an upper
|
|
triangular matrix, so we can perform back substitution to compute $x$.
|
|
|
|
#+BEGIN_SRC c
|
|
Array_double *solve_matrix_gaussian(Matrix_double *m, Array_double *b) {
|
|
assert(b->size == m->rows);
|
|
assert(m->rows == m->cols);
|
|
|
|
Matrix_double *m_augment_b = add_column(m, b);
|
|
Matrix_double *eliminated = gaussian_elimination(m_augment_b);
|
|
|
|
Array_double *b_gauss = col_v(eliminated, m->cols);
|
|
Matrix_double *u = slice_column(eliminated, m->rows);
|
|
|
|
Array_double *solution = bsubst(u, b_gauss);
|
|
|
|
free_matrix(m_augment_b);
|
|
free_matrix(eliminated);
|
|
free_matrix(u);
|
|
free_vector(b_gauss);
|
|
|
|
return solution;
|
|
}
|
|
#+END_SRC
|
|
|
|
|
|
*** ~m_dot_v~
|
|
+ Author: Elizabeth Hunt
|
|
+ Location: ~src/matrix.c~
|
|
+ Input: a pointer to a ~Matrix_double~ $m$ and ~Array_double~ $v$
|
|
+ Output: the dot product $mv$ as an ~Array_double~
|
|
|
|
#+BEGIN_SRC c
|
|
Array_double *m_dot_v(Matrix_double *m, Array_double *v) {
|
|
assert(v->size == m->cols);
|
|
|
|
Array_double *product = copy_vector(v);
|
|
|
|
for (size_t row = 0; row < v->size; ++row)
|
|
product->data[row] = v_dot_v(m->data[row], v);
|
|
|
|
return product;
|
|
}
|
|
#+END_SRC
|
|
|
|
*** ~put_identity_diagonal~
|
|
+ Author: Elizabeth Hunt
|
|
+ Location: ~src/matrix.c~
|
|
+ Input: a pointer to a ~Matrix_double~
|
|
+ Output: a pointer to a copy to ~Matrix_double~ whose diagonal is full of 1's
|
|
|
|
#+BEGIN_SRC c
|
|
Matrix_double *put_identity_diagonal(Matrix_double *m) {
|
|
assert(m->rows == m->cols);
|
|
Matrix_double *copy = copy_matrix(m);
|
|
for (size_t y = 0; y < m->rows; ++y)
|
|
copy->data[y]->data[y] = 1.0;
|
|
return copy;
|
|
}
|
|
#+END_SRC
|
|
|
|
*** ~slice_column~
|
|
+ Author: Elizabeth Hunt
|
|
+ Location: ~src/matrix.c~
|
|
+ Input: a pointer to a ~Matrix_double~
|
|
+ Output: a pointer to a copy of the given ~Matrix_double~ with column at ~x~ sliced
|
|
|
|
#+BEGIN_SRC c
|
|
Matrix_double *slice_column(Matrix_double *m, size_t x) {
|
|
Matrix_double *sliced = copy_matrix(m);
|
|
|
|
for (size_t row = 0; row < m->rows; row++) {
|
|
Array_double *old_row = sliced->data[row];
|
|
sliced->data[row] = slice_element(old_row, x);
|
|
free_vector(old_row);
|
|
}
|
|
sliced->cols--;
|
|
|
|
return sliced;
|
|
}
|
|
#+END_SRC
|
|
|
|
*** ~add_column~
|
|
+ Author: Elizabet Hunt
|
|
+ Location: ~src/matrix.c~
|
|
+ Input: a pointer to a ~Matrix_double~ and a new vector representing the appended column ~x~
|
|
+ Output: a pointer to a copy of the given ~Matrix_double~ with a new column ~x~
|
|
|
|
#+BEGIN_SRC c
|
|
Matrix_double *add_column(Matrix_double *m, Array_double *v) {
|
|
Matrix_double *pushed = copy_matrix(m);
|
|
|
|
for (size_t row = 0; row < m->rows; row++) {
|
|
Array_double *old_row = pushed->data[row];
|
|
pushed->data[row] = add_element(old_row, v->data[row]);
|
|
free_vector(old_row);
|
|
}
|
|
|
|
pushed->cols++;
|
|
return pushed;
|
|
}
|
|
#+END_SRC
|
|
|
|
*** ~copy_matrix~
|
|
+ Author: Elizabeth Hunt
|
|
+ Location: ~src/matrix.c~
|
|
+ Input: a pointer to a ~Matrix_double~
|
|
+ Output: a pointer to a copy of the given ~Matrix_double~
|
|
|
|
#+BEGIN_SRC c
|
|
Matrix_double *copy_matrix(Matrix_double *m) {
|
|
Matrix_double *copy = InitMatrixWithSize(double, m->rows, m->cols, 0.0);
|
|
for (size_t y = 0; y < copy->rows; y++) {
|
|
free_vector(copy->data[y]);
|
|
copy->data[y] = copy_vector(m->data[y]);
|
|
}
|
|
return copy;
|
|
}
|
|
#+END_SRC
|
|
|
|
*** ~free_matrix~
|
|
+ Author: Elizabeth Hunt
|
|
+ Location: ~src/matrix.c~
|
|
+ Input: a pointer to a ~Matrix_double~
|
|
+ Output: none.
|
|
+ Side Effects: frees memory reserved by a given ~Matrix_double~ and its member ~Array_double~ vectors describing its rows.
|
|
|
|
#+BEGIN_SRC c
|
|
void free_matrix(Matrix_double *m) {
|
|
for (size_t y = 0; y < m->rows; ++y)
|
|
free_vector(m->data[y]);
|
|
free(m);
|
|
}
|
|
#+END_SRC
|
|
|
|
*** ~format_matrix_into~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~format_matrix_into~
|
|
+ Location: ~src/matrix.c~
|
|
+ Input: a pointer to a ~Matrix_double~ and a pointer to a c-string ~s~ to "print" the vector out
|
|
into
|
|
+ Output: nothing.
|
|
+ Side effect: overwritten memory into ~s~
|
|
|
|
#+BEGIN_SRC c
|
|
void format_matrix_into(Matrix_double *m, char *s) {
|
|
if (m->rows == 0)
|
|
strcpy(s, "empty");
|
|
|
|
for (size_t y = 0; y < m->rows; ++y) {
|
|
char row_s[256];
|
|
strcpy(row_s, "");
|
|
|
|
format_vector_into(m->data[y], row_s);
|
|
strcat(s, row_s);
|
|
}
|
|
strcat(s, "\n");
|
|
}
|
|
#+END_SRC
|
|
** Root Finding Methods
|
|
*** ~find_ivt_range~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~find_ivt_range~
|
|
+ Location: ~src/roots.c~
|
|
+ Input: a pointer to a oneary function taking a double and producing a double, the beginning point
|
|
in $R$ to search for a range, a ~delta~ step that is taken, and a ~max_steps~ number of maximum
|
|
iterations to perform.
|
|
+ Output: a pair of ~double~'s in an ~Array_double~ representing a closed closed interval ~[beginning, end]~
|
|
|
|
#+BEGIN_SRC c
|
|
// f is well defined at start_x + delta*n for all n on the integer range [0,
|
|
// max_iterations]
|
|
Array_double *find_ivt_range(double (*f)(double), double start_x, double delta,
|
|
size_t max_iterations) {
|
|
double a = start_x;
|
|
|
|
while (f(a) * f(a + delta) >= 0 && max_iterations > 0) {
|
|
max_iterations--;
|
|
a += delta;
|
|
}
|
|
|
|
double end = a + delta;
|
|
double begin = a - delta;
|
|
|
|
if (max_iterations == 0 && f(begin) * f(end) >= 0)
|
|
return NULL;
|
|
return InitArray(double, {begin, end});
|
|
}
|
|
#+END_SRC
|
|
*** ~bisect_find_root~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name(s): ~bisect_find_root~
|
|
+ Input: a one-ary function taking a double and producing a double, a closed interval represented
|
|
by ~a~ and ~b~: ~[a, b]~, a ~tolerance~ at which we return the estimated root once $b-a < \text{tolerance}$, and a
|
|
~max_iterations~ to break us out of a loop if we can never reach the ~tolerance~.
|
|
+ Output: a vector of size of 3, ~double~'s representing first the range ~[a,b]~ and then the midpoint, ~c~ of the range.
|
|
+ Description: recursively uses binary search to split the interval until we reach ~tolerance~. We
|
|
also assume the function ~f~ is continuous on ~[a, b]~.
|
|
|
|
#+BEGIN_SRC c
|
|
// f is continuous on [a, b]
|
|
Array_double *bisect_find_root(double (*f)(double), double a, double b,
|
|
double tolerance, size_t max_iterations) {
|
|
assert(a <= b);
|
|
// guarantee there's a root somewhere between a and b by IVT
|
|
assert(f(a) * f(b) < 0);
|
|
|
|
double c = (1.0 / 2) * (a + b);
|
|
if (b - a < tolerance || max_iterations == 0)
|
|
return InitArray(double, {a, b, c});
|
|
|
|
if (f(a) * f(c) < 0)
|
|
return bisect_find_root(f, a, c, tolerance, max_iterations - 1);
|
|
return bisect_find_root(f, c, b, tolerance, max_iterations - 1);
|
|
}
|
|
#+END_SRC
|
|
*** ~bisect_find_root_with_error_assumption~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~bisect_find_root_with_error_assumption~
|
|
+ Input: a one-ary function taking a double and producing a double, a closed interval represented
|
|
by ~a~ and ~b~: ~[a, b]~, and a ~tolerance~ equivalent to the above definition in ~bisect_find_root~
|
|
+ Output: a ~double~ representing the estimated root
|
|
+ Description: using the bisection method we know that $e_k \le (\frac{1}{2})^k (b_0 - a_0)$. So we can
|
|
calculate $k$ at the worst possible case (that the error is exactly the tolerance) to be
|
|
$\frac{log(tolerance) - log(b_0 - a_0)}{log(\frac{1}{2})}$. We pass this value into the ~max_iterations~
|
|
of ~bisect_find_root~ as above.
|
|
#+BEGIN_SRC c
|
|
double bisect_find_root_with_error_assumption(double (*f)(double), double a,
|
|
double b, double tolerance) {
|
|
assert(a <= b);
|
|
|
|
uint64_t max_iterations =
|
|
(uint64_t)ceil((log(tolerance) - log(b - a)) / log(1 / 2.0));
|
|
|
|
Array_double *a_b_root = bisect_find_root(f, a, b, tolerance, max_iterations);
|
|
double root = a_b_root->data[2];
|
|
free_vector(a_b_root);
|
|
|
|
return root;
|
|
}
|
|
#+END_SRC
|
|
|
|
*** ~fixed_point_iteration_method~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~fixed_point_iteration_method~
|
|
+ Location: ~src/roots.c~
|
|
+ Input: a pointer to a oneary function $f$ taking a double and producing a double of which we are
|
|
trying to find a root, a guess $x_0$, and a function $g$ of the same signature of $f$ at which we
|
|
"step" our guesses according to the fixed point iteration method: $x_k = g(x_{k-1})$. Additionally, a ~max_iterations~ representing the maximum number of "steps" to take before arriving at our
|
|
approximation and a ~tolerance~ to return our root if it becomes within [0 - tolerance, 0 + tolerance].
|
|
+ Assumptions: $g(x)$ must be a function such that at the point $x^*$ (the found root) the derivative
|
|
$|g'(x^*)| \lt 1$
|
|
+ Output: a double representing the found approximate root $\approx x^*$.
|
|
|
|
#+BEGIN_SRC c
|
|
double fixed_point_iteration_method(double (*f)(double), double (*g)(double),
|
|
double x_0, double tolerance,
|
|
size_t max_iterations) {
|
|
if (max_iterations <= 0)
|
|
return x_0;
|
|
|
|
double root = g(x_0);
|
|
if (tolerance >= fabs(f(root)))
|
|
return root;
|
|
|
|
return fixed_point_iteration_method(f, g, root, tolerance,
|
|
max_iterations - 1);
|
|
}
|
|
#+END_SRC
|
|
|
|
*** ~fixed_point_newton_method~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~fixed_point_newton_method~
|
|
+ Location: ~src/roots.c~
|
|
+ Input: a pointer to a oneary function $f$ taking a double and producing a double of which we are
|
|
trying to find a root and another pointer to a function fprime of the same signature, a guess $x_0$,
|
|
and a ~max_iterations~ and ~tolerance~ as defined in the above method are required inputs.
|
|
+ Description: continually computes elements in the sequence $x_n = x_{n-1} - \frac{f(x_{n-1})}{f'p(x_{n-1})}$
|
|
+ Output: a double representing the found approximate root $\approx x^*$ recursively applied to the sequence
|
|
given
|
|
#+BEGIN_SRC c
|
|
double fixed_point_newton_method(double (*f)(double), double (*fprime)(double),
|
|
double x_0, double tolerance,
|
|
size_t max_iterations) {
|
|
if (max_iterations <= 0)
|
|
return x_0;
|
|
|
|
double root = x_0 - f(x_0) / fprime(x_0);
|
|
if (tolerance >= fabs(f(root)))
|
|
return root;
|
|
|
|
return fixed_point_newton_method(f, fprime, root, tolerance,
|
|
max_iterations - 1);
|
|
}
|
|
#+END_SRC
|
|
|
|
*** ~fixed_point_secant_method~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~fixed_point_secant_method~
|
|
+ Location: ~src/roots.c~
|
|
+ Input: a pointer to a oneary function $f$ taking a double and producing a double of which we are
|
|
trying to find a root, a guess $x_0$ and $x_1$ in which a root lies between $[x_0, x_1]$; applying the
|
|
sequence $x_n = x_{n-1} - f(x_{n-1}) \frac{x_{n-1} - x_{n-2}}{f(x_{n-1}) - f(x_{n-2})}$.
|
|
Additionally, a ~max_iterations~ and ~tolerance~ as defined in the above method are required
|
|
inputs.
|
|
+ Output: a double representing the found approximate root $\approx x^*$ recursively applied to the sequence.
|
|
#+BEGIN_SRC c
|
|
double fixed_point_secant_method(double (*f)(double), double x_0, double x_1,
|
|
double tolerance, size_t max_iterations) {
|
|
if (max_iterations == 0)
|
|
return x_1;
|
|
|
|
double root = x_1 - f(x_1) * ((x_1 - x_0) / (f(x_1) - f(x_0)));
|
|
|
|
if (tolerance >= fabs(f(root)))
|
|
return root;
|
|
|
|
return fixed_point_secant_method(f, x_1, root, tolerance, max_iterations - 1);
|
|
}
|
|
#+END_SRC
|
|
*** ~fixed_point_secant_bisection_method~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~fixed_point_secant_method~
|
|
+ Location: ~src/roots.c~
|
|
+ Input: a pointer to a oneary function $f$ taking a double and producing a double of which we are
|
|
trying to find a root, a guess $x_0$, and a $x_1$ of which we define our first interval $[x_0, x_1]$.
|
|
Then, we perform a single iteration of the ~fixed_point_secant_method~ on this interval; if it
|
|
produces a root outside, we refresh the interval and root respectively with the given ~bisect_find_root~ method. Additionally, a ~max_iterations~ and ~tolerance~ as defined in the above method are required
|
|
inputs.
|
|
+ Output: a double representing the found approximate root $\approx x^*$ continually applied with the
|
|
constraints defined.
|
|
|
|
#+BEGIN_SRC c
|
|
double fixed_point_secant_bisection_method(double (*f)(double), double x_0,
|
|
double x_1, double tolerance,
|
|
size_t max_iterations) {
|
|
double begin = x_0;
|
|
double end = x_1;
|
|
double root = x_0;
|
|
|
|
while (tolerance < fabs(f(root)) && max_iterations > 0) {
|
|
max_iterations--;
|
|
|
|
double secant_root = fixed_point_secant_method(f, begin, end, tolerance, 1);
|
|
|
|
if (secant_root < begin || secant_root > end) {
|
|
Array_double *range_root = bisect_find_root(f, begin, end, tolerance, 1);
|
|
|
|
begin = range_root->data[0];
|
|
end = range_root->data[1];
|
|
root = range_root->data[2];
|
|
|
|
free_vector(range_root);
|
|
continue;
|
|
}
|
|
|
|
root = secant_root;
|
|
|
|
if (f(root) * f(begin) < 0)
|
|
end = secant_root; // the root exists in [begin, secant_root]
|
|
else
|
|
begin = secant_root;
|
|
}
|
|
|
|
return root;
|
|
}
|
|
#+END_SRC
|
|
|
|
** Linear Routines
|
|
*** ~least_squares_lin_reg~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~least_squares_lin_reg~
|
|
+ Location: ~src/lin.c~
|
|
+ Input: two pointers to ~Array_double~'s whose entries correspond two ordered
|
|
pairs in R^2
|
|
+ Output: a linear model best representing the ordered pairs via least squares
|
|
regression
|
|
|
|
#+BEGIN_SRC c
|
|
Line *least_squares_lin_reg(Array_double *x, Array_double *y) {
|
|
assert(x->size == y->size);
|
|
|
|
uint64_t n = x->size;
|
|
double sum_x = sum_v(x);
|
|
double sum_y = sum_v(y);
|
|
double sum_xy = v_dot_v(x, y);
|
|
double sum_xx = v_dot_v(x, x);
|
|
double denom = ((n * sum_xx) - (sum_x * sum_x));
|
|
|
|
Line *line = malloc(sizeof(Line));
|
|
line->m = ((sum_xy * n) - (sum_x * sum_y)) / denom;
|
|
line->a = ((sum_y * sum_xx) - (sum_x * sum_xy)) / denom;
|
|
|
|
return line;
|
|
}
|
|
#+END_SRC
|
|
|
|
** Eigen-Adjacent
|
|
*** ~dominant_eigenvalue~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~dominant_eigenvalue~
|
|
+ Location: ~src/eigen.c~
|
|
+ Input: a pointer to an invertible matrix ~m~, an initial eigenvector guess ~v~ (that is non
|
|
zero or orthogonal to an eigenvector with the dominant eigenvalue), a ~tolerance~ and ~max_iterations~ that act as stop conditions
|
|
+ Output: the dominant eigenvalue with the highest magnitude, approximated with the Power
|
|
Iteration Method
|
|
|
|
#+BEGIN_SRC c
|
|
double dominant_eigenvalue(Matrix_double *m, Array_double *v, double tolerance,
|
|
size_t max_iterations) {
|
|
assert(m->rows == m->cols);
|
|
assert(m->rows == v->size);
|
|
|
|
double error = tolerance;
|
|
size_t iter = max_iterations;
|
|
double lambda = 0.0;
|
|
Array_double *eigenvector_1 = copy_vector(v);
|
|
|
|
while (error >= tolerance && (--iter) > 0) {
|
|
Array_double *eigenvector_2 = m_dot_v(m, eigenvector_1);
|
|
Array_double *normalized_eigenvector_2 =
|
|
scale_v(eigenvector_2, 1.0 / linf_norm(eigenvector_2));
|
|
free_vector(eigenvector_2);
|
|
eigenvector_2 = normalized_eigenvector_2;
|
|
|
|
Array_double *mx = m_dot_v(m, eigenvector_2);
|
|
double new_lambda =
|
|
v_dot_v(mx, eigenvector_2) / v_dot_v(eigenvector_2, eigenvector_2);
|
|
|
|
error = fabs(new_lambda - lambda);
|
|
lambda = new_lambda;
|
|
free_vector(eigenvector_1);
|
|
eigenvector_1 = eigenvector_2;
|
|
}
|
|
|
|
return lambda;
|
|
}
|
|
#+END_SRC
|
|
*** ~least_dominant_eigenvalue~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~least_dominant_eigenvalue~
|
|
+ Location: ~src/eigen.c~
|
|
+ Input: a pointer to an invertible matrix ~m~, an initial eigenvector guess ~v~ (that is non
|
|
zero or orthogonal to an eigenvector with the dominant eigenvalue), a ~tolerance~ and ~max_iterations~ that act as stop conditions
|
|
+ Output: the least dominant eigenvalue with the lowest magnitude, approximated with the Inverse
|
|
Power Iteration Method
|
|
#+BEGIN_SRC c
|
|
double least_dominant_eigenvalue(Matrix_double *m, Array_double *v,
|
|
double tolerance, size_t max_iterations) {
|
|
assert(m->rows == m->cols);
|
|
assert(m->rows == v->size);
|
|
|
|
double shift = 0.0;
|
|
Matrix_double *m_c = copy_matrix(m);
|
|
for (size_t y = 0; y < m_c->rows; ++y)
|
|
m_c->data[y]->data[y] = m_c->data[y]->data[y] - shift;
|
|
|
|
double error = tolerance;
|
|
size_t iter = max_iterations;
|
|
double lambda = shift;
|
|
Array_double *eigenvector_1 = copy_vector(v);
|
|
|
|
while (error >= tolerance && (--iter) > 0) {
|
|
Array_double *eigenvector_2 = solve_matrix_lu_bsubst(m_c, eigenvector_1);
|
|
Array_double *normalized_eigenvector_2 =
|
|
scale_v(eigenvector_2, 1.0 / linf_norm(eigenvector_2));
|
|
free_vector(eigenvector_2);
|
|
eigenvector_2 = normalized_eigenvector_2;
|
|
|
|
Array_double *mx = m_dot_v(m, eigenvector_2);
|
|
double new_lambda =
|
|
v_dot_v(mx, eigenvector_2) / v_dot_v(eigenvector_2, eigenvector_2);
|
|
|
|
error = fabs(new_lambda - lambda);
|
|
lambda = new_lambda;
|
|
free_vector(eigenvector_1);
|
|
eigenvector_1 = eigenvector_2;
|
|
}
|
|
|
|
return lambda;
|
|
}
|
|
#+END_SRC
|
|
|
|
*** ~leslie_matrix~
|
|
+ Author: Elizabeth Hunt
|
|
+ Name: ~leslie_matrix~
|
|
+ Location: ~src/eigen.c~
|
|
+ Input: two pointers to ~Array_double~'s representing the ratio of individuals in an age class
|
|
$x$ getting to the next age class $x+1$ and the number of offspring that individuals in an age
|
|
class create in age class 0.
|
|
+ Output: the leslie matrix generated from the input vectors.
|
|
|
|
#+BEGIN_SRC c
|
|
Matrix_double *leslie_matrix(Array_double *age_class_surivor_ratio,
|
|
Array_double *age_class_offspring) {
|
|
assert(age_class_surivor_ratio->size + 1 == age_class_offspring->size);
|
|
|
|
Matrix_double *leslie = InitMatrixWithSize(double, age_class_offspring->size,
|
|
age_class_offspring->size, 0.0);
|
|
|
|
free_vector(leslie->data[0]);
|
|
leslie->data[0] = age_class_offspring;
|
|
|
|
for (size_t i = 0; i < age_class_surivor_ratio->size; i++)
|
|
leslie->data[i + 1]->data[i] = age_class_surivor_ratio->data[i];
|
|
return leslie;
|
|
}
|
|
#+END_SRC
|
|
|
|
** Appendix / Miscellaneous
|
|
*** Data Types
|
|
**** ~Line~
|
|
+ Author: Elizabeth Hunt
|
|
+ Location: ~inc/types.h~
|
|
|
|
#+BEGIN_SRC c
|
|
typedef struct Line {
|
|
double m;
|
|
double a;
|
|
} Line;
|
|
#+END_SRC
|
|
**** The ~Array_<type>~ and ~Matrix_<type>~
|
|
+ Author: Elizabeth Hunt
|
|
+ Location: ~inc/types.h~
|
|
|
|
We define two Pre processor Macros ~DEFINE_ARRAY~ and ~DEFINE_MATRIX~ that take
|
|
as input a type, and construct a struct definition for the given type for
|
|
convenient access to the vector or matrices dimensions.
|
|
|
|
Such that ~DEFINE_ARRAY(int)~ would expand to:
|
|
|
|
#+BEGIN_SRC c
|
|
typedef struct {
|
|
int* data;
|
|
size_t size;
|
|
} Array_int
|
|
#+END_SRC
|
|
|
|
And ~DEFINE_MATRIX(int)~ would expand a to ~Matrix_int~; containing a pointer to
|
|
a collection of pointers of ~Array_int~'s and its dimensions.
|
|
|
|
#+BEGIN_SRC c
|
|
typedef struct {
|
|
Array_int **data;
|
|
size_t cols;
|
|
size_t rows;
|
|
} Matrix_int
|
|
#+END_SRC
|
|
|
|
*** Macros
|
|
**** ~c_max~ and ~c_min~
|
|
+ Author: Elizabeth Hunt
|
|
+ Location: ~inc/macros.h~
|
|
+ Input: two structures that define an order measure
|
|
+ Output: either the larger or smaller of the two depending on the measure
|
|
|
|
#+BEGIN_SRC c
|
|
#define c_max(x, y) (((x) >= (y)) ? (x) : (y))
|
|
#define c_min(x, y) (((x) <= (y)) ? (x) : (y))
|
|
#+END_SRC
|
|
|
|
**** ~InitArray~
|
|
+ Author: Elizabeth Hunt
|
|
+ Location: ~inc/macros.h~
|
|
+ Input: a type and array of values to initialze an array with such type
|
|
+ Output: a new ~Array_type~ with the size of the given array and its data
|
|
|
|
#+BEGIN_SRC c
|
|
#define InitArray(TYPE, ...) \
|
|
({ \
|
|
TYPE temp[] = __VA_ARGS__; \
|
|
Array_##TYPE *arr = malloc(sizeof(Array_##TYPE)); \
|
|
arr->size = sizeof(temp) / sizeof(temp[0]); \
|
|
arr->data = malloc(arr->size * sizeof(TYPE)); \
|
|
memcpy(arr->data, temp, arr->size * sizeof(TYPE)); \
|
|
arr; \
|
|
})
|
|
#+END_SRC
|
|
|
|
**** ~InitArrayWithSize~
|
|
+ Author: Elizabeth Hunt
|
|
+ Location: ~inc/macros.h~
|
|
+ Input: a type, a size, and initial value
|
|
+ Output: a new ~Array_type~ with the given size filled with the initial value
|
|
|
|
#+BEGIN_SRC c
|
|
#define InitArrayWithSize(TYPE, SIZE, INIT_VALUE) \
|
|
({ \
|
|
Array_##TYPE *arr = malloc(sizeof(Array_##TYPE)); \
|
|
arr->size = SIZE; \
|
|
arr->data = malloc(arr->size * sizeof(TYPE)); \
|
|
for (size_t i = 0; i < arr->size; i++) \
|
|
arr->data[i] = INIT_VALUE; \
|
|
arr; \
|
|
})
|
|
#+END_SRC
|
|
|
|
**** ~InitMatrixWithSize~
|
|
+ Author: Elizabeth Hunt
|
|
+ Location: ~inc/macros.h~
|
|
+ Input: a type, number of rows, columns, and initial value
|
|
+ Output: a new ~Matrix_type~ of size ~rows x columns~ filled with the initial
|
|
value
|
|
|
|
#+BEGIN_SRC c
|
|
#define InitMatrixWithSize(TYPE, ROWS, COLS, INIT_VALUE) \
|
|
({ \
|
|
Matrix_##TYPE *matrix = malloc(sizeof(Matrix_##TYPE)); \
|
|
matrix->rows = ROWS; \
|
|
matrix->cols = COLS; \
|
|
matrix->data = malloc(matrix->rows * sizeof(Array_##TYPE *)); \
|
|
for (size_t y = 0; y < matrix->rows; y++) \
|
|
matrix->data[y] = InitArrayWithSize(TYPE, COLS, INIT_VALUE); \
|
|
matrix; \
|
|
})
|
|
#+END_SRc
|
|
|