/*********************************************************************** * Software License Agreement (BSD License) * * Copyright 2008-2009 Marius Muja (mariusm@cs.ubc.ca). All rights reserved. * Copyright 2008-2009 David G. Lowe (lowe@cs.ubc.ca). All rights reserved. * * THE BSD LICENSE * * Redistribution and use in source and binary forms, with or without * modification, are permitted provided that the following conditions * are met: * * 1. Redistributions of source code must retain the above copyright * notice, this list of conditions and the following disclaimer. * 2. 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. * * THIS SOFTWARE IS PROVIDED BY THE AUTHOR ``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 AUTHOR 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. *************************************************************************/ #ifndef OPENCV_FLANN_DIST_H_ #define OPENCV_FLANN_DIST_H_ #include #include #include #ifdef _MSC_VER typedef unsigned uint32_t; typedef unsigned __int64 uint64_t; #else #include #endif #include "defines.h" namespace cvflann { template inline T abs(T x) { return (x<0) ? -x : x; } template<> inline int abs(int x) { return ::abs(x); } template<> inline float abs(float x) { return fabsf(x); } template<> inline double abs(double x) { return fabs(x); } template<> inline long double abs(long double x) { return fabsl(x); } template struct Accumulator { typedef T Type; }; template<> struct Accumulator { typedef float Type; }; template<> struct Accumulator { typedef float Type; }; template<> struct Accumulator { typedef float Type; }; template<> struct Accumulator { typedef float Type; }; template<> struct Accumulator { typedef float Type; }; template<> struct Accumulator { typedef float Type; }; class True { }; class False { }; /** * Squared Euclidean distance functor. * * This is the simpler, unrolled version. This is preferable for * very low dimensionality data (eg 3D points) */ template struct L2_Simple { typedef True is_kdtree_distance; typedef True is_vector_space_distance; typedef T ElementType; typedef typename Accumulator::Type ResultType; template ResultType operator()(Iterator1 a, Iterator2 b, size_t size, ResultType /*worst_dist*/ = -1) const { ResultType result = ResultType(); ResultType diff; for(size_t i = 0; i < size; ++i ) { diff = *a++ - *b++; result += diff*diff; } return result; } template inline ResultType accum_dist(const U& a, const V& b, int) const { return (a-b)*(a-b); } }; /** * Squared Euclidean distance functor, optimized version */ template struct L2 { typedef True is_kdtree_distance; typedef True is_vector_space_distance; typedef T ElementType; typedef typename Accumulator::Type ResultType; /** * Compute the squared Euclidean distance between two vectors. * * This is highly optimised, with loop unrolling, as it is one * of the most expensive inner loops. * * The computation of squared root at the end is omitted for * efficiency. */ template ResultType operator()(Iterator1 a, Iterator2 b, size_t size, ResultType worst_dist = -1) const { ResultType result = ResultType(); ResultType diff0, diff1, diff2, diff3; Iterator1 last = a + size; Iterator1 lastgroup = last - 3; /* Process 4 items with each loop for efficiency. */ while (a < lastgroup) { diff0 = (ResultType)(a[0] - b[0]); diff1 = (ResultType)(a[1] - b[1]); diff2 = (ResultType)(a[2] - b[2]); diff3 = (ResultType)(a[3] - b[3]); result += diff0 * diff0 + diff1 * diff1 + diff2 * diff2 + diff3 * diff3; a += 4; b += 4; if ((worst_dist>0)&&(result>worst_dist)) { return result; } } /* Process last 0-3 pixels. Not needed for standard vector lengths. */ while (a < last) { diff0 = (ResultType)(*a++ - *b++); result += diff0 * diff0; } return result; } /** * Partial euclidean distance, using just one dimension. This is used by the * kd-tree when computing partial distances while traversing the tree. * * Squared root is omitted for efficiency. */ template inline ResultType accum_dist(const U& a, const V& b, int) const { return (a-b)*(a-b); } }; /* * Manhattan distance functor, optimized version */ template struct L1 { typedef True is_kdtree_distance; typedef True is_vector_space_distance; typedef T ElementType; typedef typename Accumulator::Type ResultType; /** * Compute the Manhattan (L_1) distance between two vectors. * * This is highly optimised, with loop unrolling, as it is one * of the most expensive inner loops. */ template ResultType operator()(Iterator1 a, Iterator2 b, size_t size, ResultType worst_dist = -1) const { ResultType result = ResultType(); ResultType diff0, diff1, diff2, diff3; Iterator1 last = a + size; Iterator1 lastgroup = last - 3; /* Process 4 items with each loop for efficiency. */ while (a < lastgroup) { diff0 = (ResultType)abs(a[0] - b[0]); diff1 = (ResultType)abs(a[1] - b[1]); diff2 = (ResultType)abs(a[2] - b[2]); diff3 = (ResultType)abs(a[3] - b[3]); result += diff0 + diff1 + diff2 + diff3; a += 4; b += 4; if ((worst_dist>0)&&(result>worst_dist)) { return result; } } /* Process last 0-3 pixels. Not needed for standard vector lengths. */ while (a < last) { diff0 = (ResultType)abs(*a++ - *b++); result += diff0; } return result; } /** * Partial distance, used by the kd-tree. */ template inline ResultType accum_dist(const U& a, const V& b, int) const { return abs(a-b); } }; template struct MinkowskiDistance { typedef True is_kdtree_distance; typedef True is_vector_space_distance; typedef T ElementType; typedef typename Accumulator::Type ResultType; int order; MinkowskiDistance(int order_) : order(order_) {} /** * Compute the Minkowsky (L_p) distance between two vectors. * * This is highly optimised, with loop unrolling, as it is one * of the most expensive inner loops. * * The computation of squared root at the end is omitted for * efficiency. */ template ResultType operator()(Iterator1 a, Iterator2 b, size_t size, ResultType worst_dist = -1) const { ResultType result = ResultType(); ResultType diff0, diff1, diff2, diff3; Iterator1 last = a + size; Iterator1 lastgroup = last - 3; /* Process 4 items with each loop for efficiency. */ while (a < lastgroup) { diff0 = (ResultType)abs(a[0] - b[0]); diff1 = (ResultType)abs(a[1] - b[1]); diff2 = (ResultType)abs(a[2] - b[2]); diff3 = (ResultType)abs(a[3] - b[3]); result += pow(diff0,order) + pow(diff1,order) + pow(diff2,order) + pow(diff3,order); a += 4; b += 4; if ((worst_dist>0)&&(result>worst_dist)) { return result; } } /* Process last 0-3 pixels. Not needed for standard vector lengths. */ while (a < last) { diff0 = (ResultType)abs(*a++ - *b++); result += pow(diff0,order); } return result; } /** * Partial distance, used by the kd-tree. */ template inline ResultType accum_dist(const U& a, const V& b, int) const { return pow(static_cast(abs(a-b)),order); } }; template struct MaxDistance { typedef False is_kdtree_distance; typedef True is_vector_space_distance; typedef T ElementType; typedef typename Accumulator::Type ResultType; /** * Compute the max distance (L_infinity) between two vectors. * * This distance is not a valid kdtree distance, it's not dimensionwise additive. */ template ResultType operator()(Iterator1 a, Iterator2 b, size_t size, ResultType worst_dist = -1) const { ResultType result = ResultType(); ResultType diff0, diff1, diff2, diff3; Iterator1 last = a + size; Iterator1 lastgroup = last - 3; /* Process 4 items with each loop for efficiency. */ while (a < lastgroup) { diff0 = abs(a[0] - b[0]); diff1 = abs(a[1] - b[1]); diff2 = abs(a[2] - b[2]); diff3 = abs(a[3] - b[3]); if (diff0>result) {result = diff0; } if (diff1>result) {result = diff1; } if (diff2>result) {result = diff2; } if (diff3>result) {result = diff3; } a += 4; b += 4; if ((worst_dist>0)&&(result>worst_dist)) { return result; } } /* Process last 0-3 pixels. Not needed for standard vector lengths. */ while (a < last) { diff0 = abs(*a++ - *b++); result = (diff0>result) ? diff0 : result; } return result; } /* This distance functor is not dimension-wise additive, which * makes it an invalid kd-tree distance, not implementing the accum_dist method */ }; //////////////////////////////////////////////////////////////////////////////////////////////////////////////////////// /** * Hamming distance functor - counts the bit differences between two strings - useful for the Brief descriptor * bit count of A exclusive XOR'ed with B */ struct HammingLUT { typedef False is_kdtree_distance; typedef False is_vector_space_distance; typedef unsigned char ElementType; typedef int ResultType; /** this will count the bits in a ^ b */ ResultType operator()(const unsigned char* a, const unsigned char* b, int size) const { ResultType result = 0; for (int i = 0; i < size; i++) { result += byteBitsLookUp(a[i] ^ b[i]); } return result; } /** \brief given a byte, count the bits using a look up table * \param b the byte to count bits. The look up table has an entry for all * values of b, where that entry is the number of bits. * \return the number of bits in byte b */ static unsigned char byteBitsLookUp(unsigned char b) { static const unsigned char table[256] = { /* 0 */ 0, /* 1 */ 1, /* 2 */ 1, /* 3 */ 2, /* 4 */ 1, /* 5 */ 2, /* 6 */ 2, /* 7 */ 3, /* 8 */ 1, /* 9 */ 2, /* a */ 2, /* b */ 3, /* c */ 2, /* d */ 3, /* e */ 3, /* f */ 4, /* 10 */ 1, /* 11 */ 2, /* 12 */ 2, /* 13 */ 3, /* 14 */ 2, /* 15 */ 3, /* 16 */ 3, /* 17 */ 4, /* 18 */ 2, /* 19 */ 3, /* 1a */ 3, /* 1b */ 4, /* 1c */ 3, /* 1d */ 4, /* 1e */ 4, /* 1f */ 5, /* 20 */ 1, /* 21 */ 2, /* 22 */ 2, /* 23 */ 3, /* 24 */ 2, /* 25 */ 3, /* 26 */ 3, /* 27 */ 4, /* 28 */ 2, /* 29 */ 3, /* 2a */ 3, /* 2b */ 4, /* 2c */ 3, /* 2d */ 4, /* 2e */ 4, /* 2f */ 5, /* 30 */ 2, /* 31 */ 3, /* 32 */ 3, /* 33 */ 4, /* 34 */ 3, /* 35 */ 4, /* 36 */ 4, /* 37 */ 5, /* 38 */ 3, /* 39 */ 4, /* 3a */ 4, /* 3b */ 5, /* 3c */ 4, /* 3d */ 5, /* 3e */ 5, /* 3f */ 6, /* 40 */ 1, /* 41 */ 2, /* 42 */ 2, /* 43 */ 3, /* 44 */ 2, /* 45 */ 3, /* 46 */ 3, /* 47 */ 4, /* 48 */ 2, /* 49 */ 3, /* 4a */ 3, /* 4b */ 4, /* 4c */ 3, /* 4d */ 4, /* 4e */ 4, /* 4f */ 5, /* 50 */ 2, /* 51 */ 3, /* 52 */ 3, /* 53 */ 4, /* 54 */ 3, /* 55 */ 4, /* 56 */ 4, /* 57 */ 5, /* 58 */ 3, /* 59 */ 4, /* 5a */ 4, /* 5b */ 5, /* 5c */ 4, /* 5d */ 5, /* 5e */ 5, /* 5f */ 6, /* 60 */ 2, /* 61 */ 3, /* 62 */ 3, /* 63 */ 4, /* 64 */ 3, /* 65 */ 4, /* 66 */ 4, /* 67 */ 5, /* 68 */ 3, /* 69 */ 4, /* 6a */ 4, /* 6b */ 5, /* 6c */ 4, /* 6d */ 5, /* 6e */ 5, /* 6f */ 6, /* 70 */ 3, /* 71 */ 4, /* 72 */ 4, /* 73 */ 5, /* 74 */ 4, /* 75 */ 5, /* 76 */ 5, /* 77 */ 6, /* 78 */ 4, /* 79 */ 5, /* 7a */ 5, /* 7b */ 6, /* 7c */ 5, /* 7d */ 6, /* 7e */ 6, /* 7f */ 7, /* 80 */ 1, /* 81 */ 2, /* 82 */ 2, /* 83 */ 3, /* 84 */ 2, /* 85 */ 3, /* 86 */ 3, /* 87 */ 4, /* 88 */ 2, /* 89 */ 3, /* 8a */ 3, /* 8b */ 4, /* 8c */ 3, /* 8d */ 4, /* 8e */ 4, /* 8f */ 5, /* 90 */ 2, /* 91 */ 3, /* 92 */ 3, /* 93 */ 4, /* 94 */ 3, /* 95 */ 4, /* 96 */ 4, /* 97 */ 5, /* 98 */ 3, /* 99 */ 4, /* 9a */ 4, /* 9b */ 5, /* 9c */ 4, /* 9d */ 5, /* 9e */ 5, /* 9f */ 6, /* a0 */ 2, /* a1 */ 3, /* a2 */ 3, /* a3 */ 4, /* a4 */ 3, /* a5 */ 4, /* a6 */ 4, /* a7 */ 5, /* a8 */ 3, /* a9 */ 4, /* aa */ 4, /* ab */ 5, /* ac */ 4, /* ad */ 5, /* ae */ 5, /* af */ 6, /* b0 */ 3, /* b1 */ 4, /* b2 */ 4, /* b3 */ 5, /* b4 */ 4, /* b5 */ 5, /* b6 */ 5, /* b7 */ 6, /* b8 */ 4, /* b9 */ 5, /* ba */ 5, /* bb */ 6, /* bc */ 5, /* bd */ 6, /* be */ 6, /* bf */ 7, /* c0 */ 2, /* c1 */ 3, /* c2 */ 3, /* c3 */ 4, /* c4 */ 3, /* c5 */ 4, /* c6 */ 4, /* c7 */ 5, /* c8 */ 3, /* c9 */ 4, /* ca */ 4, /* cb */ 5, /* cc */ 4, /* cd */ 5, /* ce */ 5, /* cf */ 6, /* d0 */ 3, /* d1 */ 4, /* d2 */ 4, /* d3 */ 5, /* d4 */ 4, /* d5 */ 5, /* d6 */ 5, /* d7 */ 6, /* d8 */ 4, /* d9 */ 5, /* da */ 5, /* db */ 6, /* dc */ 5, /* dd */ 6, /* de */ 6, /* df */ 7, /* e0 */ 3, /* e1 */ 4, /* e2 */ 4, /* e3 */ 5, /* e4 */ 4, /* e5 */ 5, /* e6 */ 5, /* e7 */ 6, /* e8 */ 4, /* e9 */ 5, /* ea */ 5, /* eb */ 6, /* ec */ 5, /* ed */ 6, /* ee */ 6, /* ef */ 7, /* f0 */ 4, /* f1 */ 5, /* f2 */ 5, /* f3 */ 6, /* f4 */ 5, /* f5 */ 6, /* f6 */ 6, /* f7 */ 7, /* f8 */ 5, /* f9 */ 6, /* fa */ 6, /* fb */ 7, /* fc */ 6, /* fd */ 7, /* fe */ 7, /* ff */ 8 }; return table[b]; } }; /** * Hamming distance functor (pop count between two binary vectors, i.e. xor them and count the number of bits set) * That code was taken from brief.cpp in OpenCV */ template struct Hamming { typedef False is_kdtree_distance; typedef False is_vector_space_distance; typedef T ElementType; typedef int ResultType; template ResultType operator()(Iterator1 a, Iterator2 b, size_t size, ResultType /*worst_dist*/ = -1) const { ResultType result = 0; #if __GNUC__ #if ANDROID && HAVE_NEON static uint64_t features = android_getCpuFeatures(); if ((features& ANDROID_CPU_ARM_FEATURE_NEON)) { for (size_t i = 0; i < size; i += 16) { uint8x16_t A_vec = vld1q_u8 (a + i); uint8x16_t B_vec = vld1q_u8 (b + i); //uint8x16_t veorq_u8 (uint8x16_t, uint8x16_t) uint8x16_t AxorB = veorq_u8 (A_vec, B_vec); uint8x16_t bitsSet += vcntq_u8 (AxorB); //uint16x8_t vpadalq_u8 (uint16x8_t, uint8x16_t) uint16x8_t bitSet8 = vpaddlq_u8 (bitsSet); uint32x4_t bitSet4 = vpaddlq_u16 (bitSet8); uint64x2_t bitSet2 = vpaddlq_u32 (bitSet4); result += vgetq_lane_u64 (bitSet2,0); result += vgetq_lane_u64 (bitSet2,1); } } else #endif //for portability just use unsigned long -- and use the __builtin_popcountll (see docs for __builtin_popcountll) typedef unsigned long long pop_t; const size_t modulo = size % sizeof(pop_t); const pop_t* a2 = reinterpret_cast (a); const pop_t* b2 = reinterpret_cast (b); const pop_t* a2_end = a2 + (size / sizeof(pop_t)); for (; a2 != a2_end; ++a2, ++b2) result += __builtin_popcountll((*a2) ^ (*b2)); if (modulo) { //in the case where size is not dividable by sizeof(size_t) //need to mask off the bits at the end pop_t a_final = 0, b_final = 0; memcpy(&a_final, a2, modulo); memcpy(&b_final, b2, modulo); result += __builtin_popcountll(a_final ^ b_final); } #else HammingLUT lut; result = lut(reinterpret_cast (a), reinterpret_cast (b), size * sizeof(pop_t)); #endif return result; } }; template struct Hamming2 { typedef False is_kdtree_distance; typedef False is_vector_space_distance; typedef T ElementType; typedef int ResultType; /** This is popcount_3() from: * http://en.wikipedia.org/wiki/Hamming_weight */ unsigned int popcnt32(uint32_t n) const { n -= ((n >> 1) & 0x55555555); n = (n & 0x33333333) + ((n >> 2) & 0x33333333); return (((n + (n >> 4))& 0xF0F0F0F)* 0x1010101) >> 24; } #ifdef FLANN_PLATFORM_64_BIT unsigned int popcnt64(uint64_t n) const { n -= ((n >> 1) & 0x5555555555555555); n = (n & 0x3333333333333333) + ((n >> 2) & 0x3333333333333333); return (((n + (n >> 4))& 0x0f0f0f0f0f0f0f0f)* 0x0101010101010101) >> 56; } #endif template ResultType operator()(Iterator1 a, Iterator2 b, size_t size, ResultType /*worst_dist*/ = -1) const { #ifdef FLANN_PLATFORM_64_BIT const uint64_t* pa = reinterpret_cast(a); const uint64_t* pb = reinterpret_cast(b); ResultType result = 0; size /= (sizeof(uint64_t)/sizeof(unsigned char)); for(size_t i = 0; i < size; ++i ) { result += popcnt64(*pa ^ *pb); ++pa; ++pb; } #else const uint32_t* pa = reinterpret_cast(a); const uint32_t* pb = reinterpret_cast(b); ResultType result = 0; size /= (sizeof(uint32_t)/sizeof(unsigned char)); for(size_t i = 0; i < size; ++i ) { result += popcnt32(*pa ^ *pb); ++pa; ++pb; } #endif return result; } }; //////////////////////////////////////////////////////////////////////////////////////////////////////////////////////// template struct HistIntersectionDistance { typedef True is_kdtree_distance; typedef True is_vector_space_distance; typedef T ElementType; typedef typename Accumulator::Type ResultType; /** * Compute the histogram intersection distance */ template ResultType operator()(Iterator1 a, Iterator2 b, size_t size, ResultType worst_dist = -1) const { ResultType result = ResultType(); ResultType min0, min1, min2, min3; Iterator1 last = a + size; Iterator1 lastgroup = last - 3; /* Process 4 items with each loop for efficiency. */ while (a < lastgroup) { min0 = (ResultType)(a[0] < b[0] ? a[0] : b[0]); min1 = (ResultType)(a[1] < b[1] ? a[1] : b[1]); min2 = (ResultType)(a[2] < b[2] ? a[2] : b[2]); min3 = (ResultType)(a[3] < b[3] ? a[3] : b[3]); result += min0 + min1 + min2 + min3; a += 4; b += 4; if ((worst_dist>0)&&(result>worst_dist)) { return result; } } /* Process last 0-3 pixels. Not needed for standard vector lengths. */ while (a < last) { min0 = (ResultType)(*a < *b ? *a : *b); result += min0; } return result; } /** * Partial distance, used by the kd-tree. */ template inline ResultType accum_dist(const U& a, const V& b, int) const { return a struct HellingerDistance { typedef True is_kdtree_distance; typedef True is_vector_space_distance; typedef T ElementType; typedef typename Accumulator::Type ResultType; /** * Compute the histogram intersection distance */ template ResultType operator()(Iterator1 a, Iterator2 b, size_t size, ResultType /*worst_dist*/ = -1) const { ResultType result = ResultType(); ResultType diff0, diff1, diff2, diff3; Iterator1 last = a + size; Iterator1 lastgroup = last - 3; /* Process 4 items with each loop for efficiency. */ while (a < lastgroup) { diff0 = sqrt(static_cast(a[0])) - sqrt(static_cast(b[0])); diff1 = sqrt(static_cast(a[1])) - sqrt(static_cast(b[1])); diff2 = sqrt(static_cast(a[2])) - sqrt(static_cast(b[2])); diff3 = sqrt(static_cast(a[3])) - sqrt(static_cast(b[3])); result += diff0 * diff0 + diff1 * diff1 + diff2 * diff2 + diff3 * diff3; a += 4; b += 4; } while (a < last) { diff0 = sqrt(static_cast(*a++)) - sqrt(static_cast(*b++)); result += diff0 * diff0; } return result; } /** * Partial distance, used by the kd-tree. */ template inline ResultType accum_dist(const U& a, const V& b, int) const { return sqrt(static_cast(a)) - sqrt(static_cast(b)); } }; template struct ChiSquareDistance { typedef True is_kdtree_distance; typedef True is_vector_space_distance; typedef T ElementType; typedef typename Accumulator::Type ResultType; /** * Compute the chi-square distance */ template ResultType operator()(Iterator1 a, Iterator2 b, size_t size, ResultType worst_dist = -1) const { ResultType result = ResultType(); ResultType sum, diff; Iterator1 last = a + size; while (a < last) { sum = (ResultType)(*a + *b); if (sum>0) { diff = (ResultType)(*a - *b); result += diff*diff/sum; } ++a; ++b; if ((worst_dist>0)&&(result>worst_dist)) { return result; } } return result; } /** * Partial distance, used by the kd-tree. */ template inline ResultType accum_dist(const U& a, const V& b, int) const { ResultType result = ResultType(); ResultType sum, diff; sum = (ResultType)(a+b); if (sum>0) { diff = (ResultType)(a-b); result = diff*diff/sum; } return result; } }; template struct KL_Divergence { typedef True is_kdtree_distance; typedef True is_vector_space_distance; typedef T ElementType; typedef typename Accumulator::Type ResultType; /** * Compute the Kullback–Leibler divergence */ template ResultType operator()(Iterator1 a, Iterator2 b, size_t size, ResultType worst_dist = -1) const { ResultType result = ResultType(); Iterator1 last = a + size; while (a < last) { if (* a != 0) { ResultType ratio = (ResultType)(*a / *b); if (ratio>0) { result += *a * log(ratio); } } ++a; ++b; if ((worst_dist>0)&&(result>worst_dist)) { return result; } } return result; } /** * Partial distance, used by the kd-tree. */ template inline ResultType accum_dist(const U& a, const V& b, int) const { ResultType result = ResultType(); ResultType ratio = (ResultType)(a / b); if (ratio>0) { result = a * log(ratio); } return result; } }; /* * This is a "zero iterator". It basically behaves like a zero filled * array to all algorithms that use arrays as iterators (STL style). * It's useful when there's a need to compute the distance between feature * and origin it and allows for better compiler optimisation than using a * zero-filled array. */ template struct ZeroIterator { T operator*() { return 0; } T operator[](int) { return 0; } const ZeroIterator& operator ++() { return *this; } ZeroIterator operator ++(int) { return *this; } ZeroIterator& operator+=(int) { return *this; } }; } #endif //OPENCV_FLANN_DIST_H_