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I want to implement a really (really) fast Sobel operator for a ray-tracer a friend of me and I wrote (sources can be found here). What follows is what I figure out so far...

First, let assume the image is a grey-scale picture store line by line in an 8 bits unsigned integers array.

To write a real Sobel filter, I need to compute Gx and Gy for each pixel. Each of these numbers are computed thanks to 6 pixels next to the origin. But SIMD instruction allow me to deal with 16 or even 32 (AVX) pixels. Hopefully, the kernel of the operator has some nice property, so that I can compute Gy by :

  • subtracting each i and i+2 rows and store the result in a i+1 row of some other picture (array)
  • adding the i, twice of the i+1 and the i+2 columns give the i+1 column of the final picture

I would do the same (but transposed) to compute Gx then add the two pictures.

Some notes :

  • I don't care about memory allocation since everything will be allocated at the beginning.
  • I can deal with the overflow and sign problem dividing the values by four (thanks to _mm_srli_epi8) (uint8_t >> 2 - uint8_t >> 2) = int7_t //really store as int8_t
    int7_t + uint8_t << 1 >> 2 + int7_t = uint8_t
    //some precision is lost but I don't care

The real problem I'm facing is to go from the rows to the columns. Since I couldn't load the picture in the SIMD register otherwise. I must flip the image three time at least isn't it ?

Once the original picture. Then I can compute the first step for Gx and Gy and then flip the resulting pictures to compute the second step.

So, here is my questions :

  • Is this kind of implementation a good idea ?
  • Is there a way to transpose an array faster than the dumb algorithm ? (I don't think so)
  • Where will be the bottlenecks ? (any guess ? :P)
share|improve this question
This thread What is the fastest way to transpose a matrix in C++? has some good material in it and you may find it useful, most of it is applicable to C. –  Shafik Yaghmour Aug 13 '13 at 19:27
Thank you. Of course I cannot afford to "change my point of view" since I must load these data into the simd registers. But OpenMP...I will read this futher. –  matovitch Aug 13 '13 at 19:31
I looked into something similar with a Gaussian Filter (also for a ray tracer). I did the transpose three times like you say. I use _MM_TRANSPOSE4_PS along with loop blocking as described in stackoverflow.com/questions/16737298/what-is-the-fastest-way-to-transpose-a-matr‌​ix-in-c. In the end the transpose was still the bottleneck unless the kernel size was large. –  Z boson Aug 14 '13 at 7:32
This may be helpful software.intel.com/en-us/articles/… –  Z boson Aug 14 '13 at 7:33
To answer one of your question. It is possible to do a faster transpose than the dumb algorithm. Try transpose_block_SSE4x4. I did not get any improvement however using AVX. You can see an example using AVX here Fast memory transpose with SSE, AVX, and OpenMP. –  Z boson Aug 14 '13 at 7:56

1 Answer 1

up vote 5 down vote accepted

I think transpose/2-pass is not good for optimizing Sobel Operator code. Sobel Operator is not computational function, so wasting memory access for transpose/2-pass access is not good for this case. I wrote some Sobel Operator test codes to see how fast SSE can get. this code does not handle first and last edge pixels, and use FPUs to calculate sqrt() value.

Sobel operator need 14 multiply, 1 square root, 11 addition, 2 min/max, 12 read access and 1 write access operators. This means you can process a component in 20~30 cycle if you optimize code well.

FloatSobel() function took 2113044 CPU cycles to process 256 * 256 image processing 32.76 cycle/component. I'll convert this sample code to SSE.

void FPUSobel()
    BYTE* image_0 = g_image + g_image_width * 0;
    BYTE* image_1 = g_image + g_image_width * 1;
    BYTE* image_2 = g_image + g_image_width * 2;
    DWORD* screen = g_screen + g_screen_width*1;

    for(int y=1; y<g_image_height-1; ++y)
        for(int x=1; x<g_image_width-1; ++x)
            float gx =  image_0[x-1] * (+1.0f) + 
                        image_0[x+1] * (-1.0f) +
                        image_1[x-1] * (+2.0f) + 
                        image_1[x+1] * (-2.0f) +
                        image_2[x-1] * (+1.0f) + 
                        image_2[x+1] * (-1.0f);

            float gy =  image_0[x-1] * (+1.0f) + 
                        image_0[x+0] * (+2.0f) + 
                        image_0[x+1] * (+1.0f) +
                        image_2[x-1] * (-1.0f) + 
                        image_2[x+0] * (-2.0f) + 
                        image_2[x+1] * (-1.0f);

            int result = (int)min(255.0f, max(0.0f, sqrtf(gx * gx + gy * gy)));

            screen[x] = 0x01010101 * result;
        image_0 += g_image_width;
        image_1 += g_image_width;
        image_2 += g_image_width;
        screen += g_screen_width;

SseSobel() function took 613220 CPU cycle to process same 256*256 image. It took 9.51 cycle/component and 3.4 time faster than FPUSobel(). There are some spaces to optimize but it will not faster than 4 times because it used 4-way SIMD.

This function used SoA approach to process 4 pixels at once. SoA is better than AoS in most array or image datas because you have to transpose/shuffle to use AoS. And SoA is far easier changing common C code to SSE codes.

void SseSobel()
    BYTE* image_0 = g_image + g_image_width * 0;
    BYTE* image_1 = g_image + g_image_width * 1;
    BYTE* image_2 = g_image + g_image_width * 2;
    DWORD* screen = g_screen + g_screen_width*1;

    __m128 const_p_one = _mm_set1_ps(+1.0f);
    __m128 const_p_two = _mm_set1_ps(+2.0f);
    __m128 const_n_one = _mm_set1_ps(-1.0f);
    __m128 const_n_two = _mm_set1_ps(-2.0f);

    for(int y=1; y<g_image_height-1; ++y)
        for(int x=1; x<g_image_width-1; x+=4)
            // load 16 components. (0~6 will be used)
            __m128i current_0 = _mm_unpacklo_epi8(_mm_loadu_si128((__m128i*)(image_0+x-1)), _mm_setzero_si128());
            __m128i current_1 = _mm_unpacklo_epi8(_mm_loadu_si128((__m128i*)(image_1+x-1)), _mm_setzero_si128());
            __m128i current_2 = _mm_unpacklo_epi8(_mm_loadu_si128((__m128i*)(image_2+x-1)), _mm_setzero_si128());

            // image_00 = { image_0[x-1], image_0[x+0], image_0[x+1], image_0[x+2] }
            __m128 image_00 = _mm_cvtepi32_ps(_mm_unpacklo_epi16(current_0, _mm_setzero_si128()));
            // image_01 = { image_0[x+0], image_0[x+1], image_0[x+2], image_0[x+3] }
            __m128 image_01 = _mm_cvtepi32_ps(_mm_unpacklo_epi16(_mm_srli_si128(current_0, 2), _mm_setzero_si128()));
            // image_02 = { image_0[x+1], image_0[x+2], image_0[x+3], image_0[x+4] }
            __m128 image_02 = _mm_cvtepi32_ps(_mm_unpacklo_epi16(_mm_srli_si128(current_0, 4), _mm_setzero_si128()));
            __m128 image_10 = _mm_cvtepi32_ps(_mm_unpacklo_epi16(current_1, _mm_setzero_si128()));
            __m128 image_12 = _mm_cvtepi32_ps(_mm_unpacklo_epi16(_mm_srli_si128(current_1, 4), _mm_setzero_si128()));
            __m128 image_20 = _mm_cvtepi32_ps(_mm_unpacklo_epi16(current_2, _mm_setzero_si128()));
            __m128 image_21 = _mm_cvtepi32_ps(_mm_unpacklo_epi16(_mm_srli_si128(current_2, 2), _mm_setzero_si128()));
            __m128 image_22 = _mm_cvtepi32_ps(_mm_unpacklo_epi16(_mm_srli_si128(current_2, 4), _mm_setzero_si128()));

            __m128 gx = _mm_add_ps( _mm_mul_ps(image_00,const_p_one),
                        _mm_add_ps( _mm_mul_ps(image_02,const_n_one),
                        _mm_add_ps( _mm_mul_ps(image_10,const_p_two),
                        _mm_add_ps( _mm_mul_ps(image_12,const_n_two),
                        _mm_add_ps( _mm_mul_ps(image_20,const_p_one),

            __m128 gy = _mm_add_ps( _mm_mul_ps(image_00,const_p_one), 
                        _mm_add_ps( _mm_mul_ps(image_01,const_p_two), 
                        _mm_add_ps( _mm_mul_ps(image_02,const_p_one),
                        _mm_add_ps( _mm_mul_ps(image_20,const_n_one), 
                        _mm_add_ps( _mm_mul_ps(image_21,const_n_two), 

            __m128 result = _mm_min_ps( _mm_set1_ps(255.0f), 
                            _mm_max_ps( _mm_set1_ps(0.0f), 
                                        _mm_sqrt_ps(_mm_add_ps(_mm_mul_ps(gx, gx), _mm_mul_ps(gy,gy))) ));

            __m128i pack_32 = _mm_cvtps_epi32(result); //R32,G32,B32,A32
            __m128i pack_16 = _mm_packs_epi32(pack_32, pack_32); //R16,G16,B16,A16,R16,G16,B16,A16
            __m128i pack_8 = _mm_packus_epi16(pack_16, pack_16); //RGBA,RGBA,RGBA,RGBA
            __m128i unpack_2 = _mm_unpacklo_epi8(pack_8, pack_8); //RRGG,BBAA,RRGG,BBAA
            __m128i unpack_4 = _mm_unpacklo_epi8(unpack_2, unpack_2); //RRRR,GGGG,BBBB,AAAA

        image_0 += g_image_width;
        image_1 += g_image_width;
        image_2 += g_image_width;
        screen += g_screen_width;
share|improve this answer
Thank you, but in any way I will write my own (and then benchmark it against yours). In fact, I am not looking for a perfect Sobel operator : I think I will compute the length_1 instead of the euclidean norm and process 16 pixels (8 bits pixels) at the same time using two pictures. I plan to reduce RGBA picture using two _mm_avg_epu8 and then apply the 8 bits Sobel filter. –  matovitch Aug 15 '13 at 11:06

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