先搞定AES算法,基本变换包含SubBytes(字节替代)、ShiftRows(行移位)、MixColumns(列混淆)、AddRoundKey(轮密钥加)
其算法一般描写叙述为
明文及密钥的组织排列方式
ByteSubstitution(字节替代)
非线性的字节替代,单独处理每一个字节:
求该字节在有限域GF(28)上的乘法逆,"0"被映射为自身,即对于α∈GF(28),求β∈GF(28),
使得α·β=β·α=1mod(x8+x4+x2+x+1)。
对上一步求得的乘法逆作仿射变换
yi=xi + x(i+4)mod8 + x(i+6)mod8 + x(i+7)mod8 + ci
(当中ci是6310即011000112的第i位),用矩阵表示为
本来打算把求乘法逆和仿射变换算法敲上去,最后还是放弃了...直接打置换表
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unsigned
char
sBox[] =
{
/* 0 1 2 3 4 5 6 7 8 9 a b c d e f */
0x63,0x7c,0x77,0x7b,0xf2,0x6b,0x6f,0xc5,0x30,0x01,0x67,0x2b,0xfe,0xd7,0xab,0x76,
/*0*/
0xca,0x82,0xc9,0x7d,0xfa,0x59,0x47,0xf0,0xad,0xd4,0xa2,0xaf,0x9c,0xa4,0x72,0xc0,
/*1*/
0xb7,0xfd,0x93,0x26,0x36,0x3f,0xf7,0xcc,0x34,0xa5,0xe5,0xf1,0x71,0xd8,0x31,0x15,
/*2*/
0x04,0xc7,0x23,0xc3,0x18,0x96,0x05,0x9a,0x07,0x12,0x80,0xe2,0xeb,0x27,0xb2,0x75,
/*3*/
0x09,0x83,0x2c,0x1a,0x1b,0x6e,0x5a,0xa0,0x52,0x3b,0xd6,0xb3,0x29,0xe3,0x2f,0x84,
/*4*/
0x53,0xd1,0x00,0xed,0x20,0xfc,0xb1,0x5b,0x6a,0xcb,0xbe,0x39,0x4a,0x4c,0x58,0xcf,
/*5*/
0xd0,0xef,0xaa,0xfb,0x43,0x4d,0x33,0x85,0x45,0xf9,0x02,0x7f,0x50,0x3c,0x9f,0xa8,
/*6*/
0x51,0xa3,0x40,0x8f,0x92,0x9d,0x38,0xf5,0xbc,0xb6,0xda,0x21,0x10,0xff,0xf3,0xd2,
/*7*/
0xcd,0x0c,0x13,0xec,0x5f,0x97,0x44,0x17,0xc4,0xa7,0x7e,0x3d,0x64,0x5d,0x19,0x73,
/*8*/
0x60,0x81,0x4f,0xdc,0x22,0x2a,0x90,0x88,0x46,0xee,0xb8,0x14,0xde,0x5e,0x0b,0xdb,
/*9*/
0xe0,0x32,0x3a,0x0a,0x49,0x06,0x24,0x5c,0xc2,0xd3,0xac,0x62,0x91,0x95,0xe4,0x79,
/*a*/
0xe7,0xc8,0x37,0x6d,0x8d,0xd5,0x4e,0xa9,0x6c,0x56,0xf4,0xea,0x65,0x7a,0xae,0x08,
/*b*/
0xba,0x78,0x25,0x2e,0x1c,0xa6,0xb4,0xc6,0xe8,0xdd,0x74,0x1f,0x4b,0xbd,0x8b,0x8a,
/*c*/
0x70,0x3e,0xb5,0x66,0x48,0x03,0xf6,0x0e,0x61,0x35,0x57,0xb9,0x86,0xc1,0x1d,0x9e,
/*d*/
0xe1,0xf8,0x98,0x11,0x69,0xd9,0x8e,0x94,0x9b,0x1e,0x87,0xe9,0xce,0x55,0x28,0xdf,
/*e*/
0x8c,0xa1,0x89,0x0d,0xbf,0xe6,0x42,0x68,0x41,0x99,0x2d,0x0f,0xb0,0x54,0xbb,0x16
/*f*/
};
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以下是逆置换表,解密时使用
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unsigned
char
invsBox[256] =
{
/* 0 1 2 3 4 5 6 7 8 9 a b c d e f */
0x52,0x09,0x6a,0xd5,0x30,0x36,0xa5,0x38,0xbf,0x40,0xa3,0x9e,0x81,0xf3,0xd7,0xfb,
/*0*/
0x7c,0xe3,0x39,0x82,0x9b,0x2f,0xff,0x87,0x34,0x8e,0x43,0x44,0xc4,0xde,0xe9,0xcb,
/*1*/
0x54,0x7b,0x94,0x32,0xa6,0xc2,0x23,0x3d,0xee,0x4c,0x95,0x0b,0x42,0xfa,0xc3,0x4e,
/*2*/
0x08,0x2e,0xa1,0x66,0x28,0xd9,0x24,0xb2,0x76,0x5b,0xa2,0x49,0x6d,0x8b,0xd1,0x25,
/*3*/
0x72,0xf8,0xf6,0x64,0x86,0x68,0x98,0x16,0xd4,0xa4,0x5c,0xcc,0x5d,0x65,0xb6,0x92,
/*4*/
0x6c,0x70,0x48,0x50,0xfd,0xed,0xb9,0xda,0x5e,0x15,0x46,0x57,0xa7,0x8d,0x9d,0x84,
/*5*/
0x90,0xd8,0xab,0x00,0x8c,0xbc,0xd3,0x0a,0xf7,0xe4,0x58,0x05,0xb8,0xb3,0x45,0x06,
/*6*/
0xd0,0x2c,0x1e,0x8f,0xca,0x3f,0x0f,0x02,0xc1,0xaf,0xbd,0x03,0x01,0x13,0x8a,0x6b,
/*7*/
0x3a,0x91,0x11,0x41,0x4f,0x67,0xdc,0xea,0x97,0xf2,0xcf,0xce,0xf0,0xb4,0xe6,0x73,
/*8*/
0x96,0xac,0x74,0x22,0xe7,0xad,0x35,0x85,0xe2,0xf9,0x37,0xe8,0x1c,0x75,0xdf,0x6e,
/*9*/
0x47,0xf1,0x1a,0x71,0x1d,0x29,0xc5,0x89,0x6f,0xb7,0x62,0x0e,0xaa,0x18,0xbe,0x1b,
/*a*/
0xfc,0x56,0x3e,0x4b,0xc6,0xd2,0x79,0x20,0x9a,0xdb,0xc0,0xfe,0x78,0xcd,0x5a,0xf4,
/*b*/
0x1f,0xdd,0xa8,0x33,0x88,0x07,0xc7,0x31,0xb1,0x12,0x10,0x59,0x27,0x80,0xec,0x5f,
/*c*/
0x60,0x51,0x7f,0xa9,0x19,0xb5,0x4a,0x0d,0x2d,0xe5,0x7a,0x9f,0x93,0xc9,0x9c,0xef,
/*d*/
0xa0,0xe0,0x3b,0x4d,0xae,0x2a,0xf5,0xb0,0xc8,0xeb,0xbb,0x3c,0x83,0x53,0x99,0x61,
/*e*/
0x17,0x2b,0x04,0x7e,0xba,0x77,0xd6,0x26,0xe1,0x69,0x14,0x63,0x55,0x21,0x0c,0x7d
/*f*/
};
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这里遇到问题了,本来用纯c初始化数组非常正常,封装成类以后发现不能初始化,无论是声明、构造函数都无法初始化,百歌谷度了一通后没有不论什么答案,无奈仅仅能在构造函数中声明一个局部变量数组并初始化,然后用memcpy,(成员变量名为Sbox/InvSbox,局部变量名sBox/invsBox)
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void
AES::SubBytes(unsigned
char
state[][4])
{
int
r,c;
for
(r=0; r<4; r++)
{
for
(c=0; c<4; c++)
{
state[r][c] = Sbox[state[r][c]];
}
}
}
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ShiftRows(行移位变换)
行移位变换完毕基于行的循环位移操作,变换方法:
即行移位变换作用于行上,第0行不变,第1行循环左移1个字节,第2行循环左移2个字节,第3行循环左移3个字节。
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void
AES::ShiftRows(unsigned
char
state[][4])
{
unsigned
char
t[4];
int
r,c;
for
(r=1; r<4; r++)
{
for
(c=0; c<4; c++)
{
t[c] = state[r][(c+r)%4];
}
for
(c=0; c<4; c++)
{
state[r][c] = t[c];
}
}
}
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MixColumns(列混淆变换)
逐列混合,方法:
b(x) = (03·x3 + 01·x2 + 01·x + 02) · a(x) mod(x4 + 1)
矩阵表示形式:
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void
AES::MixColumns(unsigned
char
state[][4])
{
unsigned
char
t[4];
int
r,c;
for
(c=0; c< 4; c++)
{
for
(r=0; r<4; r++)
{
t[r] = state[r][c];
}
for
(r=0; r<4; r++)
{
state[r][c] = FFmul(0x02, t[r])
^ FFmul(0x03, t[(r+1)%4])
^ FFmul(0x01, t[(r+2)%4])
^ FFmul(0x01, t[(r+3)%4]);
}
}
}
unsigned
char
AES::FFmul(unsigned
char
a, unsigned
char
b)
{
unsigned
char
bw[4];
unsigned
char
res=0;
int
i;
bw[0] = b;
for
(i=1; i<4; i++)
{
bw[i] = bw[i-1]<<1;
if
(bw[i-1]&0x80)
{
bw[i]^=0x1b;
}
}
for
(i=0; i<4; i++)
{
if
((a>>i)&0x01)
{
res ^= bw[i];
}
}
return
res;
}
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当中FFmul为有限域GF(28)上的乘法,标准算法应该是循环8次(b与a的每一位相乘,结果相加),但这里仅仅用到最低2位,解密时用到的逆列混淆也仅仅用了低4位,所以在这里高4位的运算是多余的,仅仅计算低4位。
AddRoundKey(轮密钥加变换)
简单来说就是逐字节相加,有限域GF(28)上的加法是模2加法,即异或
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void
AES::AddRoundKey(unsigned
char
state[][4], unsigned
char
k[][4])
{
int
r,c;
for
(c=0; c<4; c++)
{
for
(r=0; r<4; r++)
{
state[r][c] ^= k[r][c];
}
}
}
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KeyExpansion(密钥扩展)
将输入的密钥扩展为11组128位密钥组,当中第0组为输入密钥本身
其后第n组第i列 为 第n-1组第i列 与 第n组第i-1列之和(模2加法,1<= i <=3)
对于每一组 第一列即i=0,有特殊的处理
将前一列即第n-1组第3列的4个字节循环左移1个字节,
并对每一个字节进行字节替代变换SubBytes
将第一行(即第一个字节)与轮常量rc[n]相加
最后再与前一组该列相加
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void
AES::KeyExpansion(unsigned
char
* key, unsigned
char
w[][4][4])
{
int
i,j,r,c;
unsigned
char
rc[] = {0x01, 0x02, 0x04, 0x08, 0x10, 0x20, 0x40, 0x80, 0x1b, 0x36};
for
(r=0; r<4; r++)
{
for
(c=0; c<4; c++)
{
w[0][r][c] = key[r+c*4];
}
}
for
(i=1; i<=10; i++)
{
for
(j=0; j<4; j++)
{
unsigned
char
t[4];
for
(r=0; r<4; r++)
{
t[r] = j ? w[i][r][j-1] : w[i-1][r][3];
}
if
(j == 0)
{
unsigned
char
temp = t[0];
for
(r=0; r<3; r++)
{
t[r] = Sbox[t[(r+1)%4]];
}
t[3] = Sbox[temp];
t[0] ^= rc[i-1];
}
for
(r=0; r<4; r++)
{
w[i][r][j] = w[i-1][r][j] ^ t[r];
}
}
}
}
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解密的基本运算
AES解密算法与加密不同,基本运算中除了AddRoundKey(轮密钥加)不变外,其余的都须要进行逆变换,即
InvSubBytes(逆字节替代)、InvShiftRows(逆行移位)、InvMixColumns(逆列混淆)
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void
AES::InvSubBytes(unsigned
char
state[][4])
{
int
r,c;
for
(r=0; r<4; r++)
{
for
(c=0; c<4; c++)
{
state[r][c] = InvSbox[state[r][c]];
}
}
}
void
AES::InvShiftRows(unsigned
char
state[][4])
{
unsigned
char
t[4];
int
r,c;
for
(r=1; r<4; r++)
{
for
(c=0; c<4; c++)
{
t[c] = state[r][(c-r+4)%4];
}
for
(c=0; c<4; c++)
{
state[r][c] = t[c];
}
}
}
void
AES::InvMixColumns(unsigned
char
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