328 lines
4.5 KiB
C++
328 lines
4.5 KiB
C++
/* Symbolic addition
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Terms in a sum are combined if they are identical modulo rational
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coefficients.
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For example, A + 2A becomes 3A.
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However, the sum A + sqrt(2) A is not modified.
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Combining terms can lead to second-order effects.
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For example, consider the case of
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1/sqrt(2) A + 3/sqrt(2) A + sqrt(2) A
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The first two terms are combined to yield 2 sqrt(2) A.
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This result can now be combined with the third term to yield
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3 sqrt(2) A
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*/
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#include "stdafx.h"
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#include "defs.h"
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static int flag;
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void
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eval_add(void)
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{
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int h = tos;
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p1 = cdr(p1);
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while (iscons(p1)) {
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push(car(p1));
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eval();
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p2 = pop();
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push_terms(p2);
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p1 = cdr(p1);
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}
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add_terms(tos - h);
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}
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/* Add n terms, returns one expression on the stack. */
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void
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add_terms(int n)
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{
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int i, h;
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U **s;
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h = tos - n;
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s = stack + h;
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/* ensure no infinite loop, use "for" */
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for (i = 0; i < 10; i++) {
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if (n < 2)
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break;
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flag = 0;
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qsort(s, n, sizeof (U *), cmp_terms);
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if (flag == 0)
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break;
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n = combine_terms(s, n);
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}
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tos = h + n;
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switch (n) {
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case 0:
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push_integer(0);
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break;
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case 1:
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break;
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default:
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list(n);
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p1 = pop();
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push_symbol(ADD);
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push(p1);
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cons();
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break;
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}
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}
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/* Compare terms for order, clobbers p1 and p2. */
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int
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cmp_terms(const void *q1, const void *q2)
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{
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int i, t;
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p1 = *((U **) q1);
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p2 = *((U **) q2);
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/* numbers can be combined */
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if (isnum(p1) && isnum(p2)) {
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flag = 1;
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return 0;
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}
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/* congruent tensors can be combined */
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if (istensor(p1) && istensor(p2)) {
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if (p1->u.tensor->ndim < p2->u.tensor->ndim)
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return -1;
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if (p1->u.tensor->ndim > p2->u.tensor->ndim)
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return 1;
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for (i = 0; i < p1->u.tensor->ndim; i++) {
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if (p1->u.tensor->dim[i] < p2->u.tensor->dim[i])
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return -1;
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if (p1->u.tensor->dim[i] > p2->u.tensor->dim[i])
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return 1;
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}
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flag = 1;
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return 0;
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}
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if (car(p1) == symbol(MULTIPLY)) {
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p1 = cdr(p1);
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if (isnum(car(p1))) {
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p1 = cdr(p1);
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if (cdr(p1) == symbol(NIL))
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p1 = car(p1);
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}
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}
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if (car(p2) == symbol(MULTIPLY)) {
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p2 = cdr(p2);
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if (isnum(car(p2))) {
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p2 = cdr(p2);
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if (cdr(p2) == symbol(NIL))
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p2 = car(p2);
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}
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}
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t = cmp_expr(p1, p2);
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if (t == 0)
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flag = 1;
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return t;
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}
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/* Compare adjacent terms in s[] and combine if possible.
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Returns the number of terms remaining in s[].
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n number of terms in s[] initially
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*/
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int
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combine_terms(U **s, int n)
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{
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int i, j, t;
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for (i = 0; i < n - 1; i++) {
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check_esc_flag();
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p3 = s[i];
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p4 = s[i + 1];
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if (istensor(p3) && istensor(p4)) {
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push(p3);
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push(p4);
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tensor_plus_tensor();
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p1 = pop();
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if (p1 != symbol(NIL)) {
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s[i] = p1;
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for (j = i + 1; j < n - 1; j++)
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s[j] = s[j + 1];
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n--;
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i--;
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}
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continue;
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}
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if (istensor(p3) || istensor(p4))
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continue;
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if (isnum(p3) && isnum(p4)) {
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push(p3);
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push(p4);
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add_numbers();
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p1 = pop();
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if (iszero(p1)) {
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for (j = i; j < n - 2; j++)
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s[j] = s[j + 2];
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n -= 2;
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} else {
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s[i] = p1;
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for (j = i + 1; j < n - 1; j++)
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s[j] = s[j + 1];
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n--;
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}
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i--;
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continue;
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}
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if (isnum(p3) || isnum(p4))
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continue;
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p1 = one;
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p2 = one;
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t = 0;
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if (car(p3) == symbol(MULTIPLY)) {
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p3 = cdr(p3);
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t = 1; /* p3 is now denormal */
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if (isnum(car(p3))) {
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p1 = car(p3);
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p3 = cdr(p3);
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if (cdr(p3) == symbol(NIL)) {
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p3 = car(p3);
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t = 0;
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}
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}
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}
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if (car(p4) == symbol(MULTIPLY)) {
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p4 = cdr(p4);
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if (isnum(car(p4))) {
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p2 = car(p4);
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p4 = cdr(p4);
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if (cdr(p4) == symbol(NIL))
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p4 = car(p4);
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}
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}
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if (!equal(p3, p4))
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continue;
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push(p1);
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push(p2);
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add_numbers();
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p1 = pop();
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if (iszero(p1)) {
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for (j = i; j < n - 2; j++)
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s[j] = s[j + 2];
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n -= 2;
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i--;
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continue;
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}
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push(p1);
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if (t) {
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push(symbol(MULTIPLY));
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push(p3);
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cons();
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} else
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push(p3);
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multiply();
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s[i] = pop();
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for (j = i + 1; j < n - 1; j++)
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s[j] = s[j + 1];
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n--;
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i--;
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}
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return n;
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}
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void
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push_terms(U *p)
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{
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if (car(p) == symbol(ADD)) {
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p = cdr(p);
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while (iscons(p)) {
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push(car(p));
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p = cdr(p);
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}
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} else if (!iszero(p))
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push(p);
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}
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/* add two expressions */
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void
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add()
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{
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int h;
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save();
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p2 = pop();
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p1 = pop();
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h = tos;
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push_terms(p1);
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push_terms(p2);
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add_terms(tos - h);
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restore();
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}
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void
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add_all(int k)
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{
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int h, i;
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U **s;
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save();
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s = stack + tos - k;
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h = tos;
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for (i = 0; i < k; i++)
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push_terms(s[i]);
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add_terms(tos - h);
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p1 = pop();
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tos -= k;
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push(p1);
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restore();
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}
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void
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subtract(void)
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{
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negate();
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add();
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}
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