/* hyperloglog.c - Redis HyperLogLog probabilistic cardinality approximation. * This file implements the algorithm and the exported Redis commands. * * Copyright (c) 2014, Salvatore Sanfilippo * All rights reserved. * * Redistribution and use in source and binary forms, with or without * modification, are permitted provided that the following conditions are met: * * * Redistributions of source code must retain the above copyright notice, * this list of conditions and the following disclaimer. * * Redistributions in binary form must reproduce the above copyright * notice, this list of conditions and the following disclaimer in the * documentation and/or other materials provided with the distribution. * * Neither the name of Redis nor the names of its contributors may be used * to endorse or promote products derived from this software without * specific prior written permission. * * THIS SOFTWARE IS PROVIDED BY THE COPYRIGHT HOLDERS AND CONTRIBUTORS "AS IS" * AND ANY EXPRESS OR IMPLIED WARRANTIES, INCLUDING, BUT NOT LIMITED TO, THE * IMPLIED WARRANTIES OF MERCHANTABILITY AND FITNESS FOR A PARTICULAR PURPOSE * ARE DISCLAIMED. IN NO EVENT SHALL THE COPYRIGHT OWNER OR CONTRIBUTORS BE * LIABLE FOR ANY DIRECT, INDIRECT, INCIDENTAL, SPECIAL, EXEMPLARY, OR * CONSEQUENTIAL DAMAGES (INCLUDING, BUT NOT LIMITED TO, PROCUREMENT OF * SUBSTITUTE GOODS OR SERVICES; LOSS OF USE, DATA, OR PROFITS; OR BUSINESS * INTERRUPTION) HOWEVER CAUSED AND ON ANY THEORY OF LIABILITY, WHETHER IN * CONTRACT, STRICT LIABILITY, OR TORT (INCLUDING NEGLIGENCE OR OTHERWISE) * ARISING IN ANY WAY OUT OF THE USE OF THIS SOFTWARE, EVEN IF ADVISED OF THE * POSSIBILITY OF SUCH DAMAGE. */ #include "redis.h" #include #include /* The Redis HyperLogLog implementation is based on the following ideas: * * * The use of a 64 bit hash function as proposed in [1], in order to don't * limited to cardinalities up to 10^9, at the cost of just 1 additional * bit per register. * * The use of 16384 6-bit registers for a great level of accuracy, using * a total of 12k per key. * * The use of the Redis string data type. No new type is introduced. * * No attempt is made to compress the data structure as in [1]. Also the * algorithm used is the original HyperLogLog Algorithm as in [2], with * the only difference that a 64 bit hash function is used, so no correction * is performed for values near 2^32 as in [1]. * * [1] Heule, Nunkesser, Hall: HyperLogLog in Practice: Algorithmic * Engineering of a State of The Art Cardinality Estimation Algorithm. * * [2] P. Flajolet, Éric Fusy, O. Gandouet, and F. Meunier. Hyperloglog: The * analysis of a near-optimal cardinality estimation algorithm. * * Redis uses two representations: * * 1) A "dense" representation where every entry is represented by * a 6-bit integer. * 2) A "sparse" representation using run length compression suitable * for representing HyperLogLogs with many registers set to 0 in * a memory efficient way. * * * HLL header * === * * Both the dense and sparse representation have a 16 byte header as follows: * * +------+---+-----+----------+ * | HYLL | E | N/U | Cardin. | * +------+---+-----+----------+ * * The first 4 bytes are a magic string set to the bytes "HYLL". * "E" is one byte encoding, currently set to HLL_DENSE or * HLL_SPARSE. N/U are three not used bytes. * * The "Cardin." field is a 64 bit integer stored in little endian format * with the latest cardinality computed that can be reused if the data * structure was not modified since the last computation (this is useful * because there are high probabilities that HLLADD operations don't * modify the actual data structure and hence the approximated cardinality). * * When the most significant bit in the most significant byte of the cached * cardinality is set, it means that the data structure was modified and * we can't reuse the cached value that must be recomputed. * * Dense representation * === * * The dense representation used by Redis is the following: * * +--------+--------+--------+------// //--+ * |11000000|22221111|33333322|55444444 .... | * +--------+--------+--------+------// //--+ * * The 6 bits counters are encoded one after the other starting from the * LSB to the MSB, and using the next bytes as needed. * * Sparse representation * === * * The sparse representation encodes registers using a run length * encoding composed of three opcodes, two using one byte, and one using * of two bytes. The opcodes are called ZERO, XZERO and VAL. * * ZERO opcode is represented as 00xxxxxx. The 6-bit integer represented * by the six bits 'xxxxxx', plus 1, means that there are N registers set * to 0. This opcode can represent from 1 to 64 contiguous registers set * to the value of 0. * * XZERO opcode is represented by two bytes 01xxxxxx yyyyyyyy. The 14-bit * integer represented by the bits 'xxxxxx' as most significant bits and * 'yyyyyyyy' as least significant bits, plus 1, means that there are N * registers set to 0. This opcode can represent from 0 to 16384 contiguous * registers set to the value of 0. * * VAL opcode is represented as 1vvvvvxx. It contains a 5-bit integer * representing the value of a register, and a 2-bit integer representing * the number of contiguous registers set to that value 'vvvvv'. * To obtain the value and run length, the integers vvvvv and xx must be * incremented by one. This opcode can represent values from 1 to 32, * repeated from 1 to 4 times. * * The sparse representation can't represent registers with a value greater * than 32, however it is very unlikely that we find such a register in an * HLL with a cardinality where the sparse representation is still more * memory efficient than the dense representation. When this happens the * HLL is converted to the dense representation. * * The sparse representation is purely positional. For example a sparse * representation of an empty HLL is just: XZERO:16384. * * An HLL having only 3 non-zero registers at position 1000, 1020, 1021 * respectively set to 2, 3, 3, is represented by the following three * opcodes: * * XZERO:1000 (Registers 0-999 are set to 0) * VAL:2,1 (1 register set to value 2, that is register 1000) * ZERO:19 (Registers 1001-1019 set to 0) * VAL:3,2 (2 registers set to value 3, that is registers 1020,1021) * XZERO:15362 (Registers 1022-16383 set to 0) * * In the example the sparse representation used just 7 bytes instead * of 12k in order to represent the HLL registers. In general for low * cardinality there is a big win in terms of space efficiency, traded * with CPU time since the sparse representation is slower to access: * * The following table shows average cardinality vs bytes used, 100 * samples per cardinality (when the set was not representable because * of registers with too big value, the dense representation size was used * as a sample). * * 100 267 * 200 485 * 300 678 * 400 859 * 500 1033 * 600 1205 * 700 1375 * 800 1544 * 900 1713 * 1000 1882 * 2000 3480 * 3000 4879 * 4000 6089 * 5000 7138 * 6000 8042 * 7000 8823 * 8000 9500 * 9000 10088 * 10000 10591 * * The dense representation uses 12288 bytes, so there is a big win up to * a cardinality of ~2000-3000. For bigger cardinalities the constant times * involved in updating the sparse representation is not justified by the * memory savings. The exact maximum length of the sparse representation * when this implementation switches to the dense representation is * configured via the define server.hll_sparse_max_bytes. */ struct hllhdr { char magic[4]; /* "HYLL" */ uint8_t encoding; /* HLL_DENSE or HLL_SPARSE. */ uint8_t notused[3]; /* Reserved for future use, must be zero. */ uint8_t card[8]; /* Cached cardinality, little endian. */ uint8_t registers[]; /* Data bytes. */ }; /* The cached cardinality MSB is used to signal validity of the cached value. */ #define HLL_INVALIDATE_CACHE(hdr) (hdr)->card[7] |= (1<<7) #define HLL_VALID_CACHE(hdr) (((hdr)->card[7] & (1<<7)) == 0) #define HLL_P 14 /* The greater is P, the smaller the error. */ #define HLL_REGISTERS (1< 6 * * Right shift b0 of 'fb' bits. * * +--------+ * |11000000| <- Initial value of b0 * |00000011| <- After right shift of 6 pos. * +--------+ * * Left shift b1 of bits 8-fb bits (2 bits) * * +--------+ * |22221111| <- Initial value of b1 * |22111100| <- After left shift of 2 bits. * +--------+ * * OR the two bits, and finally AND with 111111 (63 in decimal) to * clean the higher order bits we are not interested in: * * +--------+ * |00000011| <- b0 right shifted * |22111100| <- b1 left shifted * |22111111| <- b0 OR b1 * | 111111| <- (b0 OR b1) AND 63, our value. * +--------+ * * We can try with a different example, like pos = 0. In this case * the 6-bit counter is actually contained in a single byte. * * b0 = 6 * pos / 8 = 0 * * +--------+ * |11000000| <- Our byte at b0 * +--------+ * * fb = 6 * pos % 8 = 0 * * So we right shift of 0 bits (no shift in practice) and * left shift the next byte of 8 bits, even if we don't use it, * but this has the effect of clearing the bits so the result * will not be affacted after the OR. * * ------------------------------------------------------------------------- * * Setting the register is a bit more complex, let's assume that 'val' * is the value we want to set, already in the right range. * * We need two steps, in one we need to clear the bits, and in the other * we need to bitwise-OR the new bits. * * Let's try with 'pos' = 1, so our first byte at 'b' is 0, * * "fb" is 6 in this case. * * +--------+ * |11000000| <- Our byte at b0 * +--------+ * * To create a AND-mask to clear the bits about this position, we just * initialize the mask with the value 63, left shift it of "fs" bits, * and finally invert the result. * * +--------+ * |00111111| <- "mask" starts at 63 * |11000000| <- "mask" after left shift of "ls" bits. * |00111111| <- "mask" after invert. * +--------+ * * Now we can bitwise-AND the byte at "b" with the mask, and bitwise-OR * it with "val" left-shifted of "ls" bits to set the new bits. * * Now let's focus on the next byte b1: * * +--------+ * |22221111| <- Initial value of b1 * +--------+ * * To build the AND mask we start again with the 63 value, right shift * it by 8-fb bits, and invert it. * * +--------+ * |00111111| <- "mask" set at 2&6-1 * |00001111| <- "mask" after the right shift by 8-fb = 2 bits * |11110000| <- "mask" after bitwise not. * +--------+ * * Now we can mask it with b+1 to clear the old bits, and bitwise-OR * with "val" left-shifted by "rs" bits to set the new value. */ /* Note: if we access the last counter, we will also access the b+1 byte * that is out of the array, but sds strings always have an implicit null * term, so the byte exists, and we can skip the conditional (or the need * to allocate 1 byte more explicitly). */ /* Store the value of the register at position 'regnum' into variable 'target'. * 'p' is an array of unsigned bytes. */ #define HLL_DENSE_GET_REGISTER(target,p,regnum) do { \ uint8_t *_p = (uint8_t*) p; \ unsigned long _byte = regnum*HLL_BITS/8; \ unsigned long _fb = regnum*HLL_BITS&7; \ unsigned long _fb8 = 8 - _fb; \ unsigned long b0 = _p[_byte]; \ unsigned long b1 = _p[_byte+1]; \ target = ((b0 >> _fb) | (b1 << _fb8)) & HLL_REGISTER_MAX; \ } while(0) /* Set the value of the register at position 'regnum' to 'val'. * 'p' is an array of unsigned bytes. */ #define HLL_DENSE_SET_REGISTER(p,regnum,val) do { \ uint8_t *_p = (uint8_t*) p; \ unsigned long _byte = regnum*HLL_BITS/8; \ unsigned long _fb = regnum*HLL_BITS&7; \ unsigned long _fb8 = 8 - _fb; \ unsigned long _v = val; \ _p[_byte] &= ~(HLL_REGISTER_MAX << _fb); \ _p[_byte] |= _v << _fb; \ _p[_byte+1] &= ~(HLL_REGISTER_MAX >> _fb8); \ _p[_byte+1] |= _v >> _fb8; \ } while(0) /* Macros to access the sparse representation. * The macros parameter is expected to be an uint8_t pointer. */ #define HLL_SPARSE_XZERO_BIT 0x40 /* 01xxxxxx */ #define HLL_SPARSE_VAL_BIT 0x80 /* 1vvvvvxx */ #define HLL_SPARSE_IS_ZERO(p) (((*(p)) & 0xc0) == 0) /* 00xxxxxx */ #define HLL_SPARSE_IS_XZERO(p) (((*(p)) & 0xc0) == HLL_SPARSE_XZERO_BIT) #define HLL_SPARSE_IS_VAL(p) ((*(p)) & HLL_SPARSE_VAL_BIT) #define HLL_SPARSE_ZERO_LEN(p) (((*(p)) & 0x3f)+1) #define HLL_SPARSE_XZERO_LEN(p) (((((*(p)) & 0x3f) << 8) | (*((p)+1)))+1) #define HLL_SPARSE_VAL_VALUE(p) ((((*(p)) >> 2) & 0x1f)+1) #define HLL_SPARSE_VAL_LEN(p) (((*(p)) & 0x3)+1) #define HLL_SPARSE_VAL_MAX_VALUE 32 #define HLL_SPARSE_VAL_MAX_LEN 4 #define HLL_SPARSE_ZERO_MAX_LEN 64 #define HLL_SPARSE_XZERO_MAX_LEN 16384 #define HLL_SPARSE_VAL_SET(p,val,len) do { \ *(p) = (((val)-1)<<2|((len)-1))|HLL_SPARSE_VAL_BIT; \ } while(0) #define HLL_SPARSE_ZERO_SET(p,len) do { \ *(p) = (len)-1; \ } while(0) #define HLL_SPARSE_XZERO_SET(p,len) do { \ int _l = (len)-1; \ *(p) = (_l>>8) | HLL_SPARSE_XZERO_BIT; \ *((p)+1) = (_l&0xff); \ } while(0) /* ========================= HyperLogLog algorithm ========================= */ /* Our hash function is MurmurHash2, 64 bit version. * It was modified for Redis in order to provide the same result in * big and little endian archs (endian neutral). */ uint64_t MurmurHash64A (const void * key, int len, unsigned int seed) { const uint64_t m = 0xc6a4a7935bd1e995; const int r = 47; uint64_t h = seed ^ (len * m); const uint8_t *data = (const uint8_t *)key; const uint8_t *end = data + (len-(len&7)); while(data != end) { uint64_t k; #if (BYTE_ORDER == LITTLE_ENDIAN) k = *((uint64_t*)data); #else k = (uint64_t) data[0]; k |= (uint64_t) data[1] << 8; k |= (uint64_t) data[2] << 16; k |= (uint64_t) data[3] << 24; k |= (uint64_t) data[4] << 32; k |= (uint64_t) data[5] << 40; k |= (uint64_t) data[6] << 48; k |= (uint64_t) data[7] << 56; #endif k *= m; k ^= k >> r; k *= m; h ^= k; h *= m; data += 8; } switch(len & 7) { case 7: h ^= (uint64_t)data[6] << 48; case 6: h ^= (uint64_t)data[5] << 40; case 5: h ^= (uint64_t)data[4] << 32; case 4: h ^= (uint64_t)data[3] << 24; case 3: h ^= (uint64_t)data[2] << 16; case 2: h ^= (uint64_t)data[1] << 8; case 1: h ^= (uint64_t)data[0]; h *= m; }; h ^= h >> r; h *= m; h ^= h >> r; return h; } /* Given a string element to add to the HyperLogLog, returns the length * of the pattern 000..1 of the element hash. As a side effect 'regp' is * set to the register index this element hashes to. */ int hllPatLen(unsigned char *ele, size_t elesize, long *regp) { uint64_t hash, bit, index; int count; /* Count the number of zeroes starting from bit HLL_REGISTERS * (that is a power of two corresponding to the first bit we don't use * as index). The max run can be 64-P+1 bits. * * Note that the final "1" ending the sequence of zeroes must be * included in the count, so if we find "001" the count is 3, and * the smallest count possible is no zeroes at all, just a 1 bit * at the first position, that is a count of 1. * * This may sound like inefficient, but actually in the average case * there are high probabilities to find a 1 after a few iterations. */ hash = MurmurHash64A(ele,elesize,0xadc83b19ULL); index = hash & HLL_P_MASK; /* Register index. */ hash |= ((uint64_t)1<<63); /* Make sure the loop terminates. */ bit = HLL_REGISTERS; /* First bit not used to address the register. */ count = 1; /* Initialized to 1 since we count the "00000...1" pattern. */ while((hash & bit) == 0) { count++; bit <<= 1; } *regp = (int) index; return count; } /* ================== Dense representation implementation ================== */ /* "Add" the element in the dense hyperloglog data structure. * Actually nothing is added, but the max 0 pattern counter of the subset * the element belongs to is incremented if needed. * * 'registers' is expected to have room for HLL_REGISTERS plus an * additional byte on the right. This requirement is met by sds strings * automatically since they are implicitly null terminated. * * The function always succeed, however if as a result of the operation * the approximated cardinality changed, 1 is returned. Otherwise 0 * is returned. */ int hllDenseAdd(uint8_t *registers, unsigned char *ele, size_t elesize) { uint8_t oldcount, count; long index; /* Update the register if this element produced a longer run of zeroes. */ count = hllPatLen(ele,elesize,&index); HLL_DENSE_GET_REGISTER(oldcount,registers,index); if (count > oldcount) { HLL_DENSE_SET_REGISTER(registers,index,count); return 1; } else { return 0; } } /* Compute SUM(2^-reg) in the dense representation. * PE is an array with a pre-computer table of values 2^-reg indexed by reg. * As a side effect the integer pointed by 'ezp' is set to the number * of zero registers. */ double hllDenseSum(uint8_t *registers, double *PE, int *ezp) { double E = 0; int j, ez = 0; /* Redis default is to use 16384 registers 6 bits each. The code works * with other values by modifying the defines, but for our target value * we take a faster path with unrolled loops. */ if (HLL_REGISTERS == 16384 && HLL_BITS == 6) { uint8_t *r = registers; unsigned long r0, r1, r2, r3, r4, r5, r6, r7, r8, r9, r10, r11, r12, r13, r14, r15; for (j = 0; j < 1024; j++) { /* Handle 16 registers per iteration. */ r0 = r[0] & 63; if (r0 == 0) ez++; r1 = (r[0] >> 6 | r[1] << 2) & 63; if (r1 == 0) ez++; r2 = (r[1] >> 4 | r[2] << 4) & 63; if (r2 == 0) ez++; r3 = (r[2] >> 2) & 63; if (r3 == 0) ez++; r4 = r[3] & 63; if (r4 == 0) ez++; r5 = (r[3] >> 6 | r[4] << 2) & 63; if (r5 == 0) ez++; r6 = (r[4] >> 4 | r[5] << 4) & 63; if (r6 == 0) ez++; r7 = (r[5] >> 2) & 63; if (r7 == 0) ez++; r8 = r[6] & 63; if (r8 == 0) ez++; r9 = (r[6] >> 6 | r[7] << 2) & 63; if (r9 == 0) ez++; r10 = (r[7] >> 4 | r[8] << 4) & 63; if (r10 == 0) ez++; r11 = (r[8] >> 2) & 63; if (r11 == 0) ez++; r12 = r[9] & 63; if (r12 == 0) ez++; r13 = (r[9] >> 6 | r[10] << 2) & 63; if (r13 == 0) ez++; r14 = (r[10] >> 4 | r[11] << 4) & 63; if (r14 == 0) ez++; r15 = (r[11] >> 2) & 63; if (r15 == 0) ez++; /* Additional parens will allow the compiler to optimize the * code more with a loss of precision that is not very relevant * here (floating point math is not commutative!). */ E += (PE[r0] + PE[r1]) + (PE[r2] + PE[r3]) + (PE[r4] + PE[r5]) + (PE[r6] + PE[r7]) + (PE[r8] + PE[r9]) + (PE[r10] + PE[r11]) + (PE[r12] + PE[r13]) + (PE[r14] + PE[r15]); r += 12; } } else { for (j = 0; j < HLL_REGISTERS; j++) { unsigned long reg; HLL_DENSE_GET_REGISTER(reg,registers,j); if (reg == 0) { ez++; /* Increment E at the end of the loop. */ } else { E += PE[reg]; /* Precomputed 2^(-reg[j]). */ } } E += ez; /* Add 2^0 'ez' times. */ } *ezp = ez; return E; } /* ================== Sparse representation implementation ================= */ /* Convert the HLL with sparse representation given as input in its dense * representation. Both representations are represented by SDS strings, and * the input representation is freed as a side effect. * * The function returns REDIS_OK if the sparse representation was valid, * otherwise REDIS_ERR is returned if the representation was corrupted. */ int hllSparseToDense(robj *o) { sds sparse = o->ptr, dense; struct hllhdr *hdr, *oldhdr = (struct hllhdr*)sparse; int idx = 0, runlen, regval; uint8_t *p = (uint8_t*)sparse, *end = p+sdslen(sparse); /* If the representation is already the right one return ASAP. */ hdr = (struct hllhdr*) sparse; if (hdr->encoding == HLL_DENSE) return REDIS_OK; /* Create a string of the right size filled with zero bytes. * Note that the cached cardinality is set to 0 as a side effect * that is exactly the cardinality of an empty HLL. */ dense = sdsnewlen(NULL,HLL_DENSE_SIZE); hdr = (struct hllhdr*) dense; *hdr = *oldhdr; /* This will copy the magic and cached cardinality. */ hdr->encoding = HLL_DENSE; /* Now read the sparse representation and set non-zero registers * accordingly. */ p += HLL_HDR_SIZE; while(p < end) { if (HLL_SPARSE_IS_ZERO(p)) { runlen = HLL_SPARSE_ZERO_LEN(p); idx += runlen; p++; } else if (HLL_SPARSE_IS_XZERO(p)) { runlen = HLL_SPARSE_XZERO_LEN(p); idx += runlen; p += 2; } else { runlen = HLL_SPARSE_VAL_LEN(p); regval = HLL_SPARSE_VAL_VALUE(p); while(runlen--) { HLL_DENSE_SET_REGISTER(hdr->registers,idx,regval); idx++; } p++; } } /* If the sparse representation was valid, we expect to find idx * set to HLL_REGISTERS. */ if (idx != HLL_REGISTERS) { sdsfree(dense); return REDIS_ERR; } /* Free the old representation and set the new one. */ sdsfree(o->ptr); o->ptr = dense; return REDIS_OK; } /* "Add" the element in the sparse hyperloglog data structure. * Actually nothing is added, but the max 0 pattern counter of the subset * the element belongs to is incremented if needed. * * The object 'o' is the String object holding the HLL. The function requires * a reference to the object in order to be able to enlarge the string if * needed. * * On success, the function returns 1 if the cardinality changed, or 0 * if the register for this element was not updated. * On error (if the representation is invalid) -1 is returned. * * As a side effect the function may promote the HLL representation from * sparse to dense: this happens when a register requires to be set to a value * not representable with the sparse representation, or when the resulting * size would be greater than server.hll_sparse_max_bytes. */ int hllSparseAdd(robj *o, unsigned char *ele, size_t elesize) { struct hllhdr *hdr; uint8_t oldcount, count, *sparse, *end, *p, *prev, *next; long index, first, span; long is_zero = 0, is_xzero = 0, is_val = 0, runlen = 0; /* Update the register if this element produced a longer run of zeroes. */ count = hllPatLen(ele,elesize,&index); /* If the count is too big to be representable by the sparse representation * switch to dense representation. */ if (count > HLL_SPARSE_VAL_MAX_VALUE) goto promote; /* When updating a sparse representation, sometimes we may need to * enlarge the buffer for up to 3 bytes in the worst case (XZERO split * into XZERO-VAL-XZERO). Make sure there is enough space right now * so that the pointers we take during the execution of the function * will be valid all the time. */ o->ptr = sdsMakeRoomFor(o->ptr,3); /* Step 1: we need to locate the opcode we need to modify to check * if a value update is actually needed. */ sparse = p = ((uint8_t*)o->ptr) + HLL_HDR_SIZE; end = p + sdslen(o->ptr) - HLL_HDR_SIZE; first = 0; prev = NULL; /* Points to previos opcode at the end of the loop. */ next = NULL; /* Points to the next opcode at the end of the loop. */ span = 0; while(p < end) { long oplen; /* Set span to the number of registers covered by this opcode. * * This is the most performance critical loop of the sparse * representation. Sorting the conditionals from the most to the * least frequent opcode in many-bytes sparse HLLs is faster. */ oplen = 1; if (HLL_SPARSE_IS_ZERO(p)) { span = HLL_SPARSE_ZERO_LEN(p); } else if (HLL_SPARSE_IS_VAL(p)) { span = HLL_SPARSE_VAL_LEN(p); } else { /* XZERO. */ span = HLL_SPARSE_XZERO_LEN(p); oplen = 2; } /* Break if this opcode covers the register as 'index'. */ if (index <= first+span-1) break; prev = p; p += oplen; first += span; } if (span == 0) return -1; /* Invalid format. */ next = HLL_SPARSE_IS_XZERO(p) ? p+2 : p+1; if (next >= end) next = NULL; /* Cache current opcode type to avoid using the macro again and * again for something that will not change. * Also cache the run-length of the opcode. */ if (HLL_SPARSE_IS_ZERO(p)) { is_zero = 1; runlen = HLL_SPARSE_ZERO_LEN(p); } else if (HLL_SPARSE_IS_XZERO(p)) { is_xzero = 1; runlen = HLL_SPARSE_XZERO_LEN(p); } else { is_val = 1; runlen = HLL_SPARSE_VAL_LEN(p); } /* Step 2: After the loop: * * 'first' stores to the index of the first register covered * by the current opcode, which is pointed by 'p'. * * 'next' ad 'prev' store respectively the next and previous opcode, * or NULL if the opcode at 'p' is respectively the last or first. * * 'span' is set to the number of registers covered by the current * opcode. * * There are different cases in order to update the data structure * in place without generating it from scratch: * * A) If it is a VAL opcode already set to a value >= our 'count' * no update is needed, regardless of the VAL run-length field. * In this case PFADD returns 0 since no changes are performed. * * B) If it is a VAL opcode with len = 1 (representing only our * register) and the value is less than 'count', we just update it * since this is a trivial case. */ if (is_val) { oldcount = HLL_SPARSE_VAL_VALUE(p); /* Case A. */ if (oldcount >= count) return 0; /* Case B. */ if (runlen == 1) { HLL_SPARSE_VAL_SET(p,count,1); goto updated; } } /* C) Another trivial to handle case is a ZERO opcode with a len of 1. * We can just replace it with a VAL opcode with our value and len of 1. */ if (is_zero && runlen == 1) { HLL_SPARSE_VAL_SET(p,count,1); goto updated; } /* D) General case. * * The other cases are more complex: our register requires to be updated * and is either currently represented by a VAL opcode with len > 1, * by a ZERO opcode with len > 1, or by an XZERO opcode. * * In those cases the original opcode must be split into muliple * opcodes. The worst case is an XZERO split in the middle resuling into * XZERO - VAL - XZERO, so the resulting sequence max length is * 5 bytes. * * We perform the split writing the new sequence into the 'new' buffer * with 'newlen' as length. Later the new sequence is inserted in place * of the old one, possibly moving what is on the right a few bytes * if the new sequence is longer than the older one. */ uint8_t seq[5], *n = seq; int last = first+span-1; /* Last register covered by the sequence. */ int len; if (is_zero || is_xzero) { /* Handle splitting of ZERO / XZERO. */ if (index != first) { len = index-first; if (len > HLL_SPARSE_ZERO_MAX_LEN) { HLL_SPARSE_XZERO_SET(n,len); n += 2; } else { HLL_SPARSE_ZERO_SET(n,len); n++; } } HLL_SPARSE_VAL_SET(n,count,1); n++; if (index != last) { len = last-index; if (len > HLL_SPARSE_ZERO_MAX_LEN) { HLL_SPARSE_XZERO_SET(n,len); n += 2; } else { HLL_SPARSE_ZERO_SET(n,len); n++; } } } else { /* Handle splitting of VAL. */ int curval = HLL_SPARSE_VAL_VALUE(p); if (index != first) { len = index-first; HLL_SPARSE_VAL_SET(n,curval,len); n++; } HLL_SPARSE_VAL_SET(n,count,1); n++; if (index != last) { len = last-index; HLL_SPARSE_VAL_SET(n,curval,len); n++; } } /* Step 3: substitute the new sequence with the old one. * * Note that we already allocated space on the sds string * calling sdsMakeRoomFor(). */ int seqlen = n-seq; int oldlen = is_xzero ? 2 : 1; int deltalen = seqlen-oldlen; if (deltalen > 0 && sdslen(o->ptr)+deltalen > server.hll_sparse_max_bytes) goto promote; if (deltalen && next) memmove(next+deltalen,next,end-next); sdsIncrLen(o->ptr,deltalen); memcpy(p,seq,seqlen); end += deltalen; updated: /* Step 4: Merge adjacent values if possible. * * The representation was updated, however the resulting representation * may not be optimal: adjacent VAL opcodes can sometimes be merged into * a single one. */ p = prev ? prev : sparse; int scanlen = 5; /* Scan up to 5 upcodes starting from prev. */ while (p < end && scanlen--) { if (HLL_SPARSE_IS_XZERO(p)) { p += 2; continue; } else if (HLL_SPARSE_IS_ZERO(p)) { p++; continue; } /* We need two adjacent VAL opcodes to try a merge, having * the same value, and a len that fits the VAL opcode max len. */ if (p+1 < end && HLL_SPARSE_IS_VAL(p+1)) { int v1 = HLL_SPARSE_VAL_VALUE(p); int v2 = HLL_SPARSE_VAL_VALUE(p+1); if (v1 == v2) { int len = HLL_SPARSE_VAL_LEN(p)+HLL_SPARSE_VAL_LEN(p+1); if (len <= HLL_SPARSE_VAL_MAX_LEN) { HLL_SPARSE_VAL_SET(p+1,v1,len); memmove(p,p+1,end-p); sdsIncrLen(o->ptr,-1); end--; /* After a merge we reiterate without incrementing 'p' * in order to try to merge the just merged value with * a value on its right. */ continue; } } } p++; } /* Invalidate the cached cardinality. */ hdr = o->ptr; HLL_INVALIDATE_CACHE(hdr); return 1; promote: /* Promote to dense representation. */ if (hllSparseToDense(o) == REDIS_ERR) return -1; /* Corrupted HLL. */ hdr = o->ptr; /* We need to call hllDenseAdd() to perform the operation after the * conversion. However the result must be 1, since if we need to * convert from sparse to dense a register requires to be updated. * * Note that this in turn means that PFADD will make sure the command * is propagated to slaves / AOF, so if there is a sparse -> dense * convertion, it will be performed in all the slaves as well. */ int dense_retval = hllDenseAdd(hdr->registers, ele, elesize); redisAssert(dense_retval == 1); return dense_retval; } /* Compute SUM(2^-reg) in the sparse representation. * PE is an array with a pre-computer table of values 2^-reg indexed by reg. * As a side effect the integer pointed by 'ezp' is set to the number * of zero registers. */ double hllSparseSum(uint8_t *sparse, int sparselen, double *PE, int *ezp, int *invalid) { double E = 0; int ez = 0, idx = 0, runlen, regval; uint8_t *end = sparse+sparselen, *p = sparse; while(p < end) { if (HLL_SPARSE_IS_ZERO(p)) { runlen = HLL_SPARSE_ZERO_LEN(p); idx += runlen; ez += runlen; /* Increment E at the end of the loop. */ p++; } else if (HLL_SPARSE_IS_XZERO(p)) { runlen = HLL_SPARSE_XZERO_LEN(p); idx += runlen; ez += runlen; /* Increment E at the end of the loop. */ p += 2; } else { runlen = HLL_SPARSE_VAL_LEN(p); regval = HLL_SPARSE_VAL_VALUE(p); idx += runlen; E += PE[regval]*runlen; p++; } } if (idx != HLL_REGISTERS && invalid) *invalid = 1; E += ez; /* Add 2^0 'ez' times. */ *ezp = ez; return E; } /* ========================= HyperLogLog Count ============================== * This is the core of the algorithm where the approximated count is computed. * The function uses the lower level hllDenseSum() and hllSparseSum() functions * as helpers to compute the SUM(2^-reg) part of the computation, which is * representation-specific, while all the rest is common. */ /* Implements the SUM operation for uint8_t data type which is only used * internally as speedup for PFCOUNT with multiple keys. */ double hllRawSum(uint8_t *registers, double *PE, int *ezp) { double E = 0; int j, ez = 0; uint64_t *word = (uint64_t*) registers; uint8_t *bytes; for (j = 0; j < HLL_REGISTERS/8; j++) { if (*word == 0) { ez += 8; } else { bytes = (uint8_t*) word; if (bytes[0]) E += PE[bytes[0]]; else ez++; if (bytes[1]) E += PE[bytes[1]]; else ez++; if (bytes[2]) E += PE[bytes[2]]; else ez++; if (bytes[3]) E += PE[bytes[3]]; else ez++; if (bytes[4]) E += PE[bytes[4]]; else ez++; if (bytes[5]) E += PE[bytes[5]]; else ez++; if (bytes[6]) E += PE[bytes[6]]; else ez++; if (bytes[7]) E += PE[bytes[7]]; else ez++; } word++; } E += ez; /* 2^(-reg[j]) is 1 when m is 0, add it 'ez' times for every zero register in the HLL. */ *ezp = ez; return E; } /* Return the approximated cardinality of the set based on the harmonic * mean of the registers values. 'hdr' points to the start of the SDS * representing the String object holding the HLL representation. * * If the sparse representation of the HLL object is not valid, the integer * pointed by 'invalid' is set to non-zero, otherwise it is left untouched. * * hllCount() supports a special internal-only encoding of HLL_RAW, that * is, hdr->registers will point to an uint8_t array of HLL_REGISTERS element. * This is useful in order to speedup PFCOUNT when called against multiple * keys (no need to work with 6-bit integers encoding). */ uint64_t hllCount(struct hllhdr *hdr, int *invalid) { double m = HLL_REGISTERS; double E, alpha = 0.7213/(1+1.079/m); int j, ez; /* Number of registers equal to 0. */ /* We precompute 2^(-reg[j]) in a small table in order to * speedup the computation of SUM(2^-register[0..i]). */ static int initialized = 0; static double PE[64]; if (!initialized) { PE[0] = 1; /* 2^(-reg[j]) is 1 when m is 0. */ for (j = 1; j < 64; j++) { /* 2^(-reg[j]) is the same as 1/2^reg[j]. */ PE[j] = 1.0/(1ULL << j); } initialized = 1; } /* Compute SUM(2^-register[0..i]). */ if (hdr->encoding == HLL_DENSE) { E = hllDenseSum(hdr->registers,PE,&ez); } else if (hdr->encoding == HLL_SPARSE) { E = hllSparseSum(hdr->registers, sdslen((sds)hdr)-HLL_HDR_SIZE,PE,&ez,invalid); } else if (hdr->encoding == HLL_RAW) { E = hllRawSum(hdr->registers,PE,&ez); } else { redisPanic("Unknown HyperLogLog encoding in hllCount()"); } /* Muliply the inverse of E for alpha_m * m^2 to have the raw estimate. */ E = (1/E)*alpha*m*m; /* Use the LINEARCOUNTING algorithm for small cardinalities. * For larger values but up to 72000 HyperLogLog raw approximation is * used since linear counting error starts to increase. However HyperLogLog * shows a strong bias in the range 2.5*16384 - 72000, so we try to * compensate for it. */ if (E < m*2.5 && ez != 0) { E = m*log(m/ez); /* LINEARCOUNTING() */ } else if (m == 16384 && E < 72000) { /* We did polynomial regression of the bias for this range, this * way we can compute the bias for a given cardinality and correct * according to it. Only apply the correction for P=14 that's what * we use and the value the correction was verified with. */ double bias = 5.9119*1.0e-18*(E*E*E*E) -1.4253*1.0e-12*(E*E*E)+ 1.2940*1.0e-7*(E*E) -5.2921*1.0e-3*E+ 83.3216; E -= E*(bias/100); } /* We don't apply the correction for E > 1/30 of 2^32 since we use * a 64 bit function and 6 bit counters. To apply the correction for * 1/30 of 2^64 is not needed since it would require a huge set * to approach such a value. */ return (uint64_t) E; } /* Call hllDenseAdd() or hllSparseAdd() according to the HLL encoding. */ int hllAdd(robj *o, unsigned char *ele, size_t elesize) { struct hllhdr *hdr = o->ptr; switch(hdr->encoding) { case HLL_DENSE: return hllDenseAdd(hdr->registers,ele,elesize); case HLL_SPARSE: return hllSparseAdd(o,ele,elesize); default: return -1; /* Invalid representation. */ } } /* Merge by computing MAX(registers[i],hll[i]) the HyperLogLog 'hll' * with an array of uint8_t HLL_REGISTERS registers pointed by 'max'. * * The hll object must be already validated via isHLLObjectOrReply() * or in some other way. * * If the HyperLogLog is sparse and is found to be invalid, REDIS_ERR * is returned, otherwise the function always succeeds. */ int hllMerge(uint8_t *max, robj *hll) { struct hllhdr *hdr = hll->ptr; int i; if (hdr->encoding == HLL_DENSE) { uint8_t val; for (i = 0; i < HLL_REGISTERS; i++) { HLL_DENSE_GET_REGISTER(val,hdr->registers,i); if (val > max[i]) max[i] = val; } } else { uint8_t *p = hll->ptr, *end = p + sdslen(hll->ptr); long runlen, regval; p += HLL_HDR_SIZE; i = 0; while(p < end) { if (HLL_SPARSE_IS_ZERO(p)) { runlen = HLL_SPARSE_ZERO_LEN(p); i += runlen; p++; } else if (HLL_SPARSE_IS_XZERO(p)) { runlen = HLL_SPARSE_XZERO_LEN(p); i += runlen; p += 2; } else { runlen = HLL_SPARSE_VAL_LEN(p); regval = HLL_SPARSE_VAL_VALUE(p); while(runlen--) { if (regval > max[i]) max[i] = regval; i++; } p++; } } if (i != HLL_REGISTERS) return REDIS_ERR; } return REDIS_OK; } /* ========================== HyperLogLog commands ========================== */ /* Create an HLL object. We always create the HLL using sparse encoding. * This will be upgraded to the dense representation as needed. */ robj *createHLLObject(void) { robj *o; struct hllhdr *hdr; sds s; uint8_t *p; int sparselen = HLL_HDR_SIZE + (((HLL_REGISTERS+(HLL_SPARSE_XZERO_MAX_LEN-1)) / HLL_SPARSE_XZERO_MAX_LEN)*2); int aux; /* Populate the sparse representation with as many XZERO opcodes as * needed to represent all the registers. */ aux = HLL_REGISTERS; s = sdsnewlen(NULL,sparselen); p = (uint8_t*)s + HLL_HDR_SIZE; while(aux) { int xzero = HLL_SPARSE_XZERO_MAX_LEN; if (xzero > aux) xzero = aux; HLL_SPARSE_XZERO_SET(p,xzero); p += 2; aux -= xzero; } redisAssert((p-(uint8_t*)s) == sparselen); /* Create the actual object. */ o = createObject(REDIS_STRING,s); hdr = o->ptr; memcpy(hdr->magic,"HYLL",4); hdr->encoding = HLL_SPARSE; return o; } /* Check if the object is a String with a valid HLL representation. * Return REDIS_OK if this is true, otherwise reply to the client * with an error and return REDIS_ERR. */ int isHLLObjectOrReply(redisClient *c, robj *o) { struct hllhdr *hdr; /* Key exists, check type */ if (checkType(c,o,REDIS_STRING)) return REDIS_ERR; /* Error already sent. */ if (stringObjectLen(o) < sizeof(*hdr)) goto invalid; hdr = o->ptr; /* Magic should be "HYLL". */ if (hdr->magic[0] != 'H' || hdr->magic[1] != 'Y' || hdr->magic[2] != 'L' || hdr->magic[3] != 'L') goto invalid; if (hdr->encoding > HLL_MAX_ENCODING) goto invalid; /* Dense representation string length should match exactly. */ if (hdr->encoding == HLL_DENSE && stringObjectLen(o) != HLL_DENSE_SIZE) goto invalid; /* All tests passed. */ return REDIS_OK; invalid: addReplySds(c, sdsnew("-WRONGTYPE Key is not a valid " "HyperLogLog string value.\r\n")); return REDIS_ERR; } /* PFADD var ele ele ele ... ele => :0 or :1 */ void pfaddCommand(redisClient *c) { robj *o = lookupKeyWrite(c->db,c->argv[1]); struct hllhdr *hdr; int updated = 0, j; if (o == NULL) { /* Create the key with a string value of the exact length to * hold our HLL data structure. sdsnewlen() when NULL is passed * is guaranteed to return bytes initialized to zero. */ o = createHLLObject(); dbAdd(c->db,c->argv[1],o); updated++; } else { if (isHLLObjectOrReply(c,o) != REDIS_OK) return; o = dbUnshareStringValue(c->db,c->argv[1],o); } /* Perform the low level ADD operation for every element. */ for (j = 2; j < c->argc; j++) { int retval = hllAdd(o, (unsigned char*)c->argv[j]->ptr, sdslen(c->argv[j]->ptr)); switch(retval) { case 1: updated++; break; case -1: addReplySds(c,sdsnew(invalid_hll_err)); return; } } hdr = o->ptr; if (updated) { signalModifiedKey(c->db,c->argv[1]); notifyKeyspaceEvent(REDIS_NOTIFY_STRING,"pfadd",c->argv[1],c->db->id); server.dirty++; HLL_INVALIDATE_CACHE(hdr); } addReply(c, updated ? shared.cone : shared.czero); } /* PFCOUNT var -> approximated cardinality of set. */ void pfcountCommand(redisClient *c) { robj *o; struct hllhdr *hdr; uint64_t card; /* Case 1: multi-key keys, cardinality of the union. * * When multiple keys are specified, PFCOUNT actually computes * the cardinality of the merge of the N HLLs specified. */ if (c->argc > 2) { uint8_t max[HLL_HDR_SIZE+HLL_REGISTERS], *registers; int j; /* Compute an HLL with M[i] = MAX(M[i]_j). */ memset(max,0,sizeof(max)); hdr = (struct hllhdr*) max; hdr->encoding = HLL_RAW; /* Special internal-only encoding. */ registers = max + HLL_HDR_SIZE; for (j = 1; j < c->argc; j++) { /* Check type and size. */ robj *o = lookupKeyRead(c->db,c->argv[j]); if (o == NULL) continue; /* Assume empty HLL for non existing var. */ if (isHLLObjectOrReply(c,o) != REDIS_OK) return; /* Merge with this HLL with our 'max' HHL by setting max[i] * to MAX(max[i],hll[i]). */ if (hllMerge(registers,o) == REDIS_ERR) { addReplySds(c,sdsnew(invalid_hll_err)); return; } } /* Compute cardinality of the resulting set. */ addReplyLongLong(c,hllCount(hdr,NULL)); return; } /* Case 2: cardinality of the single HLL. * * The user specified a single key. Either return the cached value * or compute one and update the cache. */ o = lookupKeyRead(c->db,c->argv[1]); if (o == NULL) { /* No key? Cardinality is zero since no element was added, otherwise * we would have a key as HLLADD creates it as a side effect. */ addReply(c,shared.czero); } else { if (isHLLObjectOrReply(c,o) != REDIS_OK) return; o = dbUnshareStringValue(c->db,c->argv[1],o); /* Check if the cached cardinality is valid. */ hdr = o->ptr; if (HLL_VALID_CACHE(hdr)) { /* Just return the cached value. */ card = (uint64_t)hdr->card[0]; card |= (uint64_t)hdr->card[1] << 8; card |= (uint64_t)hdr->card[2] << 16; card |= (uint64_t)hdr->card[3] << 24; card |= (uint64_t)hdr->card[4] << 32; card |= (uint64_t)hdr->card[5] << 40; card |= (uint64_t)hdr->card[6] << 48; card |= (uint64_t)hdr->card[7] << 56; } else { int invalid = 0; /* Recompute it and update the cached value. */ card = hllCount(hdr,&invalid); if (invalid) { addReplySds(c,sdsnew(invalid_hll_err)); return; } hdr->card[0] = card & 0xff; hdr->card[1] = (card >> 8) & 0xff; hdr->card[2] = (card >> 16) & 0xff; hdr->card[3] = (card >> 24) & 0xff; hdr->card[4] = (card >> 32) & 0xff; hdr->card[5] = (card >> 40) & 0xff; hdr->card[6] = (card >> 48) & 0xff; hdr->card[7] = (card >> 56) & 0xff; /* This is not considered a read-only command even if the * data structure is not modified, since the cached value * may be modified and given that the HLL is a Redis string * we need to propagate the change. */ signalModifiedKey(c->db,c->argv[1]); server.dirty++; } addReplyLongLong(c,card); } } /* PFMERGE dest src1 src2 src3 ... srcN => OK */ void pfmergeCommand(redisClient *c) { uint8_t max[HLL_REGISTERS]; struct hllhdr *hdr; int j; /* Compute an HLL with M[i] = MAX(M[i]_j). * We we the maximum into the max array of registers. We'll write * it to the target variable later. */ memset(max,0,sizeof(max)); for (j = 1; j < c->argc; j++) { /* Check type and size. */ robj *o = lookupKeyRead(c->db,c->argv[j]); if (o == NULL) continue; /* Assume empty HLL for non existing var. */ if (isHLLObjectOrReply(c,o) != REDIS_OK) return; /* Merge with this HLL with our 'max' HHL by setting max[i] * to MAX(max[i],hll[i]). */ if (hllMerge(max,o) == REDIS_ERR) { addReplySds(c,sdsnew(invalid_hll_err)); return; } } /* Create / unshare the destination key's value if needed. */ robj *o = lookupKeyWrite(c->db,c->argv[1]); if (o == NULL) { /* Create the key with a string value of the exact length to * hold our HLL data structure. sdsnewlen() when NULL is passed * is guaranteed to return bytes initialized to zero. */ o = createHLLObject(); dbAdd(c->db,c->argv[1],o); } else { /* If key exists we are sure it's of the right type/size * since we checked when merging the different HLLs, so we * don't check again. */ o = dbUnshareStringValue(c->db,c->argv[1],o); } /* Only support dense objects as destination. */ if (hllSparseToDense(o) == REDIS_ERR) { addReplySds(c,sdsnew(invalid_hll_err)); return; } /* Write the resulting HLL to the destination HLL registers and * invalidate the cached value. */ hdr = o->ptr; for (j = 0; j < HLL_REGISTERS; j++) { HLL_DENSE_SET_REGISTER(hdr->registers,j,max[j]); } HLL_INVALIDATE_CACHE(hdr); signalModifiedKey(c->db,c->argv[1]); /* We generate an PFADD event for PFMERGE for semantical simplicity * since in theory this is a mass-add of elements. */ notifyKeyspaceEvent(REDIS_NOTIFY_STRING,"pfadd",c->argv[1],c->db->id); server.dirty++; addReply(c,shared.ok); } /* ========================== Testing / Debugging ========================== */ /* PFSELFTEST * This command performs a self-test of the HLL registers implementation. * Something that is not easy to test from within the outside. */ #define HLL_TEST_CYCLES 1000 void pfselftestCommand(redisClient *c) { unsigned int j, i; sds bitcounters = sdsnewlen(NULL,HLL_DENSE_SIZE); struct hllhdr *hdr = (struct hllhdr*) bitcounters, *hdr2; robj *o = NULL; uint8_t bytecounters[HLL_REGISTERS]; /* Test 1: access registers. * The test is conceived to test that the different counters of our data * structure are accessible and that setting their values both result in * the correct value to be retained and not affect adjacent values. */ for (j = 0; j < HLL_TEST_CYCLES; j++) { /* Set the HLL counters and an array of unsigned byes of the * same size to the same set of random values. */ for (i = 0; i < HLL_REGISTERS; i++) { unsigned int r = rand() & HLL_REGISTER_MAX; bytecounters[i] = r; HLL_DENSE_SET_REGISTER(hdr->registers,i,r); } /* Check that we are able to retrieve the same values. */ for (i = 0; i < HLL_REGISTERS; i++) { unsigned int val; HLL_DENSE_GET_REGISTER(val,hdr->registers,i); if (val != bytecounters[i]) { addReplyErrorFormat(c, "TESTFAILED Register %d should be %d but is %d", i, (int) bytecounters[i], (int) val); goto cleanup; } } } /* Test 2: approximation error. * The test adds unique elements and check that the estimated value * is always reasonable bounds. * * We check that the error is smaller than a few times than the expected * standard error, to make it very unlikely for the test to fail because * of a "bad" run. * * The test is performed with both dense and sparse HLLs at the same * time also verifying that the computed cardinality is the same. */ memset(hdr->registers,0,HLL_DENSE_SIZE-HLL_HDR_SIZE); o = createHLLObject(); double relerr = 1.04/sqrt(HLL_REGISTERS); int64_t checkpoint = 1; uint64_t seed = (uint64_t)rand() | (uint64_t)rand() << 32; uint64_t ele; for (j = 1; j <= 10000000; j++) { ele = j ^ seed; hllDenseAdd(hdr->registers,(unsigned char*)&ele,sizeof(ele)); hllAdd(o,(unsigned char*)&ele,sizeof(ele)); /* Make sure that for small cardinalities we use sparse * encoding. */ if (j == checkpoint && j < server.hll_sparse_max_bytes/2) { hdr2 = o->ptr; if (hdr2->encoding != HLL_SPARSE) { addReplyError(c, "TESTFAILED sparse encoding not used"); goto cleanup; } } /* Check that dense and sparse representations agree. */ if (j == checkpoint && hllCount(hdr,NULL) != hllCount(o->ptr,NULL)) { addReplyError(c, "TESTFAILED dense/sparse disagree"); goto cleanup; } /* Check error. */ if (j == checkpoint) { int64_t abserr = checkpoint - (int64_t)hllCount(hdr,NULL); uint64_t maxerr = ceil(relerr*6*checkpoint); /* Adjust the max error we expect for cardinality 10 * since from time to time it is statistically likely to get * much higher error due to collision, resulting into a false * positive. */ if (j == 10) maxerr = 1; if (abserr < 0) abserr = -abserr; if (abserr > (int64_t)maxerr) { addReplyErrorFormat(c, "TESTFAILED Too big error. card:%llu abserr:%llu", (unsigned long long) checkpoint, (unsigned long long) abserr); goto cleanup; } checkpoint *= 10; } } /* Success! */ addReply(c,shared.ok); cleanup: sdsfree(bitcounters); if (o) decrRefCount(o); } /* PFDEBUG ... args ... * Different debugging related operations about the HLL implementation. */ void pfdebugCommand(redisClient *c) { char *cmd = c->argv[1]->ptr; struct hllhdr *hdr; robj *o; int j; o = lookupKeyRead(c->db,c->argv[2]); if (o == NULL) { addReplyError(c,"The specified key does not exist"); return; } if (isHLLObjectOrReply(c,o) != REDIS_OK) return; o = dbUnshareStringValue(c->db,c->argv[2],o); hdr = o->ptr; /* PFDEBUG GETREG */ if (!strcasecmp(cmd,"getreg")) { if (c->argc != 3) goto arityerr; if (hdr->encoding == HLL_SPARSE) { if (hllSparseToDense(o) == REDIS_ERR) { addReplySds(c,sdsnew(invalid_hll_err)); return; } server.dirty++; /* Force propagation on encoding change. */ } hdr = o->ptr; addReplyMultiBulkLen(c,HLL_REGISTERS); for (j = 0; j < HLL_REGISTERS; j++) { uint8_t val; HLL_DENSE_GET_REGISTER(val,hdr->registers,j); addReplyLongLong(c,val); } } /* PFDEBUG DECODE */ else if (!strcasecmp(cmd,"decode")) { if (c->argc != 3) goto arityerr; uint8_t *p = o->ptr, *end = p+sdslen(o->ptr); sds decoded = sdsempty(); if (hdr->encoding != HLL_SPARSE) { addReplyError(c,"HLL encoding is not sparse"); return; } p += HLL_HDR_SIZE; while(p < end) { int runlen, regval; if (HLL_SPARSE_IS_ZERO(p)) { runlen = HLL_SPARSE_ZERO_LEN(p); p++; decoded = sdscatprintf(decoded,"z:%d ",runlen); } else if (HLL_SPARSE_IS_XZERO(p)) { runlen = HLL_SPARSE_XZERO_LEN(p); p += 2; decoded = sdscatprintf(decoded,"Z:%d ",runlen); } else { runlen = HLL_SPARSE_VAL_LEN(p); regval = HLL_SPARSE_VAL_VALUE(p); p++; decoded = sdscatprintf(decoded,"v:%d,%d ",regval,runlen); } } decoded = sdstrim(decoded," "); addReplyBulkCBuffer(c,decoded,sdslen(decoded)); sdsfree(decoded); } /* PFDEBUG ENCODING */ else if (!strcasecmp(cmd,"encoding")) { char *encodingstr[2] = {"dense","sparse"}; if (c->argc != 3) goto arityerr; addReplyStatus(c,encodingstr[hdr->encoding]); } /* PFDEBUG TODENSE */ else if (!strcasecmp(cmd,"todense")) { int conv = 0; if (c->argc != 3) goto arityerr; if (hdr->encoding == HLL_SPARSE) { if (hllSparseToDense(o) == REDIS_ERR) { addReplySds(c,sdsnew(invalid_hll_err)); return; } conv = 1; server.dirty++; /* Force propagation on encoding change. */ } addReply(c,conv ? shared.cone : shared.czero); } else { addReplyErrorFormat(c,"Unknown PFDEBUG subcommand '%s'", cmd); } return; arityerr: addReplyErrorFormat(c, "Wrong number of arguments for the '%s' subcommand",cmd); }