| #ifndef _LINUX_HASH_H |
| #define _LINUX_HASH_H |
| /* Fast hashing routine for a long. |
| (C) 2002 William Lee Irwin III, IBM */ |
| |
| /* |
| * Knuth recommends primes in approximately golden ratio to the maximum |
| * integer representable by a machine word for multiplicative hashing. |
| * Chuck Lever verified the effectiveness of this technique: |
| * http://www.citi.umich.edu/techreports/reports/citi-tr-00-1.pdf |
| * |
| * These primes are chosen to be bit-sparse, that is operations on |
| * them can use shifts and additions instead of multiplications for |
| * machines where multiplications are slow. |
| */ |
| #if BITS_PER_LONG == 32 |
| /* 2^31 + 2^29 - 2^25 + 2^22 - 2^19 - 2^16 + 1 */ |
| #define GOLDEN_RATIO_PRIME 0x9e370001UL |
| #elif BITS_PER_LONG == 64 |
| /* 2^63 + 2^61 - 2^57 + 2^54 - 2^51 - 2^18 + 1 */ |
| #define GOLDEN_RATIO_PRIME 0x9e37fffffffc0001UL |
| #else |
| #error Define GOLDEN_RATIO_PRIME for your wordsize. |
| #endif |
| |
| static inline unsigned long hash_long(unsigned long val, unsigned int bits) |
| { |
| unsigned long hash = val; |
| |
| #if BITS_PER_LONG == 64 |
| /* Sigh, gcc can't optimise this alone like it does for 32 bits. */ |
| unsigned long n = hash; |
| n <<= 18; |
| hash -= n; |
| n <<= 33; |
| hash -= n; |
| n <<= 3; |
| hash += n; |
| n <<= 3; |
| hash -= n; |
| n <<= 4; |
| hash += n; |
| n <<= 2; |
| hash += n; |
| #else |
| /* On some cpus multiply is faster, on others gcc will do shifts */ |
| hash *= GOLDEN_RATIO_PRIME; |
| #endif |
| |
| /* High bits are more random, so use them. */ |
| return hash >> (BITS_PER_LONG - bits); |
| } |
| |
| static inline unsigned long hash_ptr(void *ptr, unsigned int bits) |
| { |
| return hash_long((unsigned long)ptr, bits); |
| } |
| #endif /* _LINUX_HASH_H */ |