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aesdata.c
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aesdata.c
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#include <assert.h>
#include <stdlib.h>
#include <stdio.h>
#include <string.h>
#if 1
# define BYTE_FORMAT "0x%02x"
# define BYTE_COLUMNS 8
#else
# define BYTE_FORMAT "%3d"
# define BYTE_COLUMNS 0x10
#endif
#define WORD_FORMAT "0x%08lx"
#define WORD_COLUMNS 4
unsigned char sbox[0x100];
unsigned char isbox[0x100];
unsigned char gf2_log[0x100];
unsigned char gf2_exp[0x100];
unsigned long dtable[4][0x100];
unsigned long itable[4][0x100];
unsigned long mtable[4][0x100];
static unsigned
xtime(unsigned x)
{
assert (x < 0x100);
x <<= 1;
if (x & 0x100)
x ^= 0x11b;
assert (x < 0x100);
return x;
}
/* Computes the exponentiatiom and logarithm tables for GF_2, to the
* base x+1 (0x03). The unit element is 1 (0x01).*/
static void
compute_log(void)
{
unsigned i = 0;
unsigned x = 1;
memset(gf2_log, 0, 0x100);
for (i = 0; i < 0x100; i++, x = x ^ xtime(x))
{
gf2_exp[i] = x;
gf2_log[x] = i;
}
/* Invalid. */
gf2_log[0] = 0;
/* The loop above sets gf2_log[1] = 0xff, which is correct,
* but gf2_log[1] = 0 is nicer. */
gf2_log[1] = 0;
}
static unsigned
mult(unsigned a, unsigned b)
{
return (a && b) ? gf2_exp[ (gf2_log[a] + gf2_log[b]) % 255] : 0;
}
static unsigned
invert(unsigned x)
{
return x ? gf2_exp[0xff - gf2_log[x]] : 0;
}
static unsigned
affine(unsigned x)
{
return 0xff &
(0x63^x^(x>>4)^(x<<4)^(x>>5)^(x<<3)^(x>>6)^(x<<2)^(x>>7)^(x<<1));
}
static void
compute_sbox(void)
{
unsigned i;
for (i = 0; i<0x100; i++)
{
sbox[i] = affine(invert(i));
isbox[sbox[i]] = i;
}
}
/* Generate little endian tables, i.e. the first row of the AES state
* arrays occupies the least significant byte of the words.
*
* The sbox values are multiplied with the column of GF2 coefficients
* of the polynomial 03 x^3 + x^2 + x + 02. */
static void
compute_dtable(void)
{
unsigned i;
for (i = 0; i<0x100; i++)
{
unsigned s = sbox[i];
unsigned j;
unsigned long t =( ( (s ^ xtime(s)) << 24)
| (s << 16) | (s << 8)
| xtime(s) );
for (j = 0; j<4; j++, t = (t << 8) | (t >> 24))
dtable[j][i] = t;
}
}
/* The inverse sbox values are multiplied with the column of GF2 coefficients
* of the polynomial inverse 0b x^3 + 0d x^2 + 09 x + 0e. */
static void
compute_itable(void)
{
unsigned i;
for (i = 0; i<0x100; i++)
{
unsigned s = isbox[i];
unsigned j;
unsigned long t = ( (mult(s, 0xb) << 24)
| (mult(s, 0xd) << 16)
| (mult(s, 0x9) << 8)
| (mult(s, 0xe) ));
for (j = 0; j<4; j++, t = (t << 8) | (t >> 24))
itable[j][i] = t;
}
}
/* Used for key inversion, inverse mix column. No sbox. */
static void
compute_mtable(void)
{
unsigned i;
for (i = 0; i<0x100; i++)
{
unsigned j;
unsigned long t = ( (mult(i, 0xb) << 24)
| (mult(i, 0xd) << 16)
| (mult(i, 0x9) << 8)
| (mult(i, 0xe) ));
for (j = 0; j<4; j++, t = (t << 8) | (t >> 24))
mtable[j][i] = t;
}
}
static void
display_byte_table(const char *name, unsigned char *table)
{
unsigned i, j;
printf("uint8_t %s[0x100] =\n{", name);
for (i = 0; i<0x100; i+= BYTE_COLUMNS)
{
printf("\n ");
for (j = 0; j<BYTE_COLUMNS; j++)
printf(BYTE_FORMAT ",", table[i + j]);
}
printf("\n};\n\n");
}
static void
display_table(const char *name, unsigned long table[][0x100])
{
unsigned i, j, k;
printf("uint32_t %s[4][0x100] =\n{\n ", name);
for (k = 0; k<4; k++)
{
printf("{ ");
for (i = 0; i<0x100; i+= WORD_COLUMNS)
{
printf("\n ");
for (j = 0; j<WORD_COLUMNS; j++)
printf(WORD_FORMAT ",", table[k][i + j]);
}
printf("\n },");
}
printf("\n};\n\n");
}
static void
display_polynomial(const unsigned *p)
{
printf("(%x x^3 + %x x^2 + %x x + %x)",
p[3], p[2], p[1], p[0]);
}
int
main(int argc, char **argv)
{
compute_log();
if (argc == 1)
{
display_byte_table("gf2_log", gf2_log);
display_byte_table("gf2_exp", gf2_exp);
compute_sbox();
display_byte_table("sbox", sbox);
display_byte_table("isbox", isbox);
compute_dtable();
display_table("dtable", dtable);
compute_itable();
display_table("itable", itable);
compute_mtable();
display_table("mtable", mtable);
return 0;
}
else if (argc == 2)
{
unsigned a;
for (a = 1; a<0x100; a++)
{
unsigned a1 = invert(a);
unsigned b;
unsigned u;
if (a1 == 0)
printf("invert(%x) = 0 !\n", a);
u = mult(a, a1);
if (u != 1)
printf("invert(%x) = %x; product = %x\n",
a, a1, u);
for (b = 1; b<0x100; b++)
{
unsigned b1 = invert(b);
unsigned c = mult(a, b);
if (c == 0)
printf("%x x %x = 0\n", a, b);
u = mult(c, a1);
if (u != b)
printf("%x x %x = %x, invert(%x) = %x, %x x %x = %x\n",
a, b, c, a, a1, c, a1, u);
u = mult(c, b1);
if (u != a)
printf("%x x %x = %x, invert(%x) = %x, %x x %x = %x\n",
a, b, c, b, b1, c, b1, u);
}
}
return 0;
}
else if (argc == 4)
{
unsigned a, b, c;
int op = argv[2][0];
a = strtoul(argv[1], NULL, 16);
b = strtoul(argv[3], NULL, 16);
switch (op)
{
case '+':
c = a ^ b;
break;
case '*':
case 'x':
c = mult(a,b);
break;
case '/':
c = mult(a, invert(b));
break;
default:
return 1;
}
printf("%x %c %x = %x\n", a, op, b, c);
return 0;
}
#if 0
else if (argc == 5)
{
/* Compute gcd(a, x^4+1) */
unsigned d[4];
unsigned u[4];
for (i = 0; i<4; i++)
a[i] = strtoul(argv[1+i], NULL, 16);
}
#endif
else if (argc == 9)
{
unsigned a[4];
unsigned b[4];
unsigned c[4];
unsigned i;
for (i = 0; i<4; i++)
{
a[i] = strtoul(argv[1+i], NULL, 16);
b[i] = strtoul(argv[5+i], NULL, 16);
}
c[0] = mult(a[0],b[0])^mult(a[3],b[1])^mult(a[2],b[2])^mult(a[1],b[3]);
c[1] = mult(a[1],b[0])^mult(a[0],b[1])^mult(a[3],b[2])^mult(a[2],b[3]);
c[2] = mult(a[2],b[0])^mult(a[1],b[1])^mult(a[0],b[2])^mult(a[3],b[3]);
c[3] = mult(a[3],b[0])^mult(a[2],b[1])^mult(a[1],b[2])^mult(a[0],b[3]);
display_polynomial(a); printf(" * "); display_polynomial(b);
printf(" = "); display_polynomial(c); printf("\n");
}
return 1;
}