CRC算法是在通讯领域广泛采用的校验算法。原理我就不说了,这里说一下简单的程序实现。以下均采用CRC多项式为0x1021即:
g(x) = x16+x12+x5+x0;CRC的基本原理就不说了,那个搜一下就有了。
最基本的算法应该是按位计算了,这个方法可以适用于所有长度的数据校验,最为灵活,但由于是按位计算,其效率并不是最优,只适用于对速度不敏感的场合。基本的算法如下:
unsigned short do_crc_16(unsigned char *message, unsigned int len)
{
int i, j;
unsigned short crc_reg = 0;
unsigned short current;
for (i = 0; i < len; i++)
{
current = message[i] << 8;
for (j = 0; j < 8; j++)
{
if ((short)(crc_reg ^ current) < 0)
crc_reg = (crc_reg << 1) ^ 0x1021;
else
crc_reg <<= 1;
current <<= 1;
}
}
return crc_reg;
}
以是方法可以计算出任意长度数据的校验。但速度慢。下面介绍一种按字节计算的方法:
按字节校验是每次计算8位数据,多是基于查表的算法,首先要准备一个表,一共256项。
unsigned int crc_ta[256]={ /* CRC余式表 */
0x0000, 0x1021, 0x2042, 0x3063, 0x4084, 0x50a5, 0x60c6, 0x70e7,
0x8108, 0x9129, 0xa14a, 0xb16b, 0xc18c, 0xd1ad, 0xe1ce, 0xf1ef,
0x1231, 0x0210, 0x3273, 0x2252, 0x52b5, 0x4294, 0x72f7, 0x62d6,
0x9339, 0x8318, 0xb37b, 0xa35a, 0xd3bd, 0xc39c, 0xf3ff, 0xe3de,
0x2462, 0x3443, 0x0420, 0x1401, 0x64e6, 0x74c7, 0x44a4, 0x5485,
0xa56a, 0xb54b, 0x8528, 0x9509, 0xe5ee, 0xf5cf, 0xc5ac, 0xd58d,
0x3653, 0x2672, 0x1611, 0x0630, 0x76d7, 0x66f6, 0x5695, 0x46b4,
0xb75b, 0xa77a, 0x9719, 0x8738, 0xf7df, 0xe7fe, 0xd79d, 0xc7bc,
0x48c4, 0x58e5, 0x6886, 0x78a7, 0x0840, 0x1861, 0x2802, 0x3823,
0xc9cc, 0xd9ed, 0xe98e, 0xf9af, 0x8948, 0x9969, 0xa90a, 0xb92b,
0x5af5, 0x4ad4, 0x7ab7, 0x6a96, 0x1a71, 0x0a50, 0x3a33, 0x2a12,
0xdbfd, 0xcbdc, 0xfbbf, 0xeb9e, 0x9b79, 0x8b58, 0xbb3b, 0xab1a,
0x6ca6, 0x7c87, 0x4ce4, 0x5cc5, 0x2c22, 0x3c03, 0x0c60, 0x1c41,
0xedae, 0xfd8f, 0xcdec, 0xddcd, 0xad2a, 0xbd0b, 0x8d68, 0x9d49,
0x7e97, 0x6eb6, 0x5ed5, 0x4ef4, 0x3e13, 0x2e32, 0x1e51, 0x0e70,
0xff9f, 0xefbe, 0xdfdd, 0xcffc, 0xbf1b, 0xaf3a, 0x9f59, 0x8f78,
0x9188, 0x81a9, 0xb1ca, 0xa1eb, 0xd10c, 0xc12d, 0xf14e, 0xe16f,
0x1080, 0x00a1, 0x30c2, 0x20e3, 0x5004, 0x4025, 0x7046, 0x6067,
0x83b9, 0x9398, 0xa3fb, 0xb3da, 0xc33d, 0xd31c, 0xe37f, 0xf35e,
0x02b1, 0x1290, 0x22f3, 0x32d2, 0x4235, 0x5214, 0x6277, 0x7256,
0xb5ea, 0xa5cb, 0x95a8, 0x8589, 0xf56e, 0xe54f, 0xd52c, 0xc50d,
0x34e2, 0x24c3, 0x14a0, 0x0481, 0x7466, 0x6447, 0x5424, 0x4405,
0xa7db, 0xb7fa, 0x8799, 0x97b8, 0xe75f, 0xf77e, 0xc71d, 0xd73c,
0x26d3, 0x36f2, 0x0691, 0x16b0, 0x6657, 0x7676, 0x4615, 0x5634,
0xd94c, 0xc96d, 0xf90e, 0xe92f, 0x99c8, 0x89e9, 0xb98a, 0xa9ab,
0x5844, 0x4865, 0x7806, 0x6827, 0x18c0, 0x08e1, 0x3882, 0x28a3,
0xcb7d, 0xdb5c, 0xeb3f, 0xfb1e, 0x8bf9, 0x9bd8, 0xabbb, 0xbb9a,
0x4a75, 0x5a54, 0x6a37, 0x7a16, 0x0af1, 0x1ad0, 0x2ab3, 0x3a92,
0xfd2e, 0xed0f, 0xdd6c, 0xcd4d, 0xbdaa, 0xad8b, 0x9de8, 0x8dc9,
0x7c26, 0x6c07, 0x5c64, 0x4c45, 0x3ca2, 0x2c83, 0x1ce0, 0x0cc1,
0xef1f, 0xff3e, 0xcf5d, 0xdf7c, 0xaf9b, 0xbfba, 0x8fd9, 0x9ff8,
0x6e17, 0x7e36, 0x4e55, 0x5e74, 0x2e93, 0x3eb2, 0x0ed1, 0x1ef0
};
unsigned short do_crc_table(unsigned char *ptr,int len)
{
unsigned short int crc;
unsigned char da;
crc=0;
while(len--!=0)
{
da=(unsigned short)crc>>8; /* 以8位二进制数的形式暂存CRC的高8位 */
crc<<=8; /* 左移8位,相当于CRC的低8位乘以 */
crc^=crc_ta[da^*ptr]; /* 高8位和当前字节相加后再查表求CRC ,再加上以前的CRC */
ptr++;
}
return(crc);
}
以上算法实现了按字节进行计算校验值。在使用的时候,把计算出来的校验值放在最后两个字节里,将其发送出去,接收端对所有的数据进行相同的校验,如校验值为0我们则认为其数据没有出错。这个是按高位到低位的发送顺序时使用的校验方法。
在实际应用中,还有一种按低位到高位的发送方法,这样 ,就要进行反相的校验,但如果把数据反相,显然加大计算量,故可以使用相应的查表算法来进行计算。只是计算方法与表不太一样,其实现算法如下:
unsigned short crc16_ccitt_table[256] =
{
0x0000, 0x1189, 0x2312, 0x329b, 0x4624, 0x57ad, 0x6536, 0x74bf,
0x8c48, 0x9dc1, 0xaf5a, 0xbed3, 0xca6c, 0xdbe5, 0xe97e, 0xf8f7,
0x1081, 0x0108, 0x3393, 0x221a, 0x56a5, 0x472c, 0x75b7, 0x643e,
0x9cc9, 0x8d40, 0xbfdb, 0xae52, 0xdaed, 0xcb64, 0xf9ff, 0xe876,
0x2102, 0x308b, 0x0210, 0x1399, 0x6726, 0x76af, 0x4434, 0x55bd,
0xad4a, 0xbcc3, 0x8e58, 0x9fd1, 0xeb6e, 0xfae7, 0xc87c, 0xd9f5,
0x3183, 0x200a, 0x1291, 0x0318, 0x77a7, 0x662e, 0x54b5, 0x453c,
0xbdcb, 0xac42, 0x9ed9, 0x8f50, 0xfbef, 0xea66, 0xd8fd, 0xc974,
0x4204, 0x538d, 0x6116, 0x709f, 0x0420, 0x15a9, 0x2732, 0x36bb,
0xce4c, 0xdfc5, 0xed5e, 0xfcd7, 0x8868, 0x99e1, 0xab7a, 0xbaf3,
0x5285, 0x430c, 0x7197, 0x601e, 0x14a1, 0x0528, 0x37b3, 0x263a,
0xdecd, 0xcf44, 0xfddf, 0xec56, 0x98e9, 0x8960, 0xbbfb, 0xaa72,
0x6306, 0x728f, 0x4014, 0x519d, 0x2522, 0x34ab, 0x0630, 0x17b9,
0xef4e, 0xfec7, 0xcc5c, 0xddd5, 0xa96a, 0xb8e3, 0x8a78, 0x9bf1,
0x7387, 0x620e, 0x5095, 0x411c, 0x35a3, 0x242a, 0x16b1, 0x0738,
0xffcf, 0xee46, 0xdcdd, 0xcd54, 0xb9eb, 0xa862, 0x9af9, 0x8b70,
0x8408, 0x9581, 0xa71a, 0xb693, 0xc22c, 0xd3a5, 0xe13e, 0xf0b7,
0x0840, 0x19c9, 0x2b52, 0x3adb, 0x4e64, 0x5fed, 0x6d76, 0x7cff,
0x9489, 0x8500, 0xb79b, 0xa612, 0xd2ad, 0xc324, 0xf1bf, 0xe036,
0x18c1, 0x0948, 0x3bd3, 0x2a5a, 0x5ee5, 0x4f6c, 0x7df7, 0x6c7e,
0xa50a, 0xb483, 0x8618, 0x9791, 0xe32e, 0xf2a7, 0xc03c, 0xd1b5,
0x2942, 0x38cb, 0x0a50, 0x1bd9, 0x6f66, 0x7eef, 0x4c74, 0x5dfd,
0xb58b, 0xa402, 0x9699, 0x8710, 0xf3af, 0xe226, 0xd0bd, 0xc134,
0x39c3, 0x284a, 0x1ad1, 0x0b58, 0x7fe7, 0x6e6e, 0x5cf5, 0x4d7c,
0xc60c, 0xd785, 0xe51e, 0xf497, 0x8028, 0x91a1, 0xa33a, 0xb2b3,
0x4a44, 0x5bcd, 0x6956, 0x78df, 0x0c60, 0x1de9, 0x2f72, 0x3efb,
0xd68d, 0xc704, 0xf59f, 0xe416, 0x90a9, 0x8120, 0xb3bb, 0xa232,
0x5ac5, 0x4b4c, 0x79d7, 0x685e, 0x1ce1, 0x0d68, 0x3ff3, 0x2e7a,
0xe70e, 0xf687, 0xc41c, 0xd595, 0xa12a, 0xb0a3, 0x8238, 0x93b1,
0x6b46, 0x7acf, 0x4854, 0x59dd, 0x2d62, 0x3ceb, 0x0e70, 0x1ff9,
0xf78f, 0xe606, 0xd49d, 0xc514, 0xb1ab, 0xa022, 0x92b9, 0x8330,
0x7bc7, 0x6a4e, 0x58d5, 0x495c, 0x3de3, 0x2c6a, 0x1ef1, 0x0f78,
};
unsigned short do_crc_table_1(unsigned char *pData,int nLength)
{
unsigned short fcs = 0xffff; // 初始化
while(nLength>0)
{
fcs = (fcs >> 8) ^ crc16_ccitt_table[(fcs ^ *pData) & 0xff];
nLength--;
pData++;
}
return ~fcs; // 取反
}
检验的时候,只要用以下方法就可以
int IsCrc16Good(unsigned char* pData, int nLength)
{
unsigned short fcs = 0xffff; // 初始化
while(nLength>0)
{
fcs = (fcs >> 8) ^ crc16_ccitt_table[(fcs ^ *pData) & 0xff];
nLength--;
pData++;
}
// return (); // 0xf0b8是CRC-ITU的"Magic Value"
if(fcs == 0xf0b8)
return 1;
else
return -1;
}
返回1则数据无误,否则数据错误。
其表的生成方法也比较简单,对于前一种查表方法,其生成表的算法可以由按位生成算法来计算得到,对0~255的字节进行CRC校验,得到的校验值分别做为表的相应项。
对于后一种查表方法,其码表可以由以下方法计算得到,
void crc16_ccitt()
{
unsigned char index = 0;
unsigned short to_xor;
int i;
printf("unsigned short crc16_ccitt_table[256] =/n{");
while (1)
{
if (!(index % 8))
printf("/n");
to_xor = index;
for (i = 0; i < 8; i++)
{
if (to_xor & 0x0001)
to_xor = (to_xor >>1) ^ 0x8408;
else
to_xor >>= 1;
}
printf("0x%04x", to_xor);
if (index == 255)
{
printf("/n");
break;
}
else
{
printf(", ");
index++;
}
}
printf("};");
//return 0;
}
这样,对CRC算法算是有一个新的认识了,至少是分清了对于同一个多项式,为什么会有不同的计算方法。弄清后,就会明白在什么场合用什么样的算法。
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