问题
I have some code that manages data received from an array of sensors. The PIC that controls the sensors uses 8 SAR-ADCs in parallel to read 4096 data bytes. It means it reads the most significant bit for the first 8 bytes; then it reads their second bit and so on until the eighth (least significant bit).
Basically, for each 8 bytes it reads, it creates (and sends forth to the computer) 8 bytes as follows:
// rxData[0] = MSB[7] MSB[6] MSB[5] MSB[4] MSB[3] MSB[2] MSB[1] MSB[0]
// rxData[1] = B6[7] B6[6] B6[5] B6[4] B6[3] B6[2] B6[1] B6[0]
// rxData[2] = B5[7] B5[6] B5[5] B5[4] B5[3] B5[2] B5[1] B5[0]
// rxData[3] = B4[7] B4[6] B4[5] B4[4] B4[3] B4[2] B4[1] B4[0]
// rxData[4] = B3[7] B3[6] B3[5] B3[4] B3[3] B3[2] B3[1] B3[0]
// rxData[5] = B2[7] B2[6] B2[5] B2[4] B2[3] B2[2] B2[1] B2[0]
// rxData[6] = B1[7] B1[6] B1[5] B1[4] B1[3] B1[2] B1[1] B1[0]
// rxData[7] = LSB[7] LSB[6] LSB[5] LSB[4] LSB[3] LSB[2] LSB[1] LSB[0]
This pattern is repeated for all the 4096 bytes the system reads and I process.
Imagine that each 8 bytes read are taken separately, we can then see them as an 8-by-8 array of bits. I need to mirror this array around the diagonal going from its bottom-left (LSB[7]) to its top-right (MSB[0]). Once this is done, the resulting 8-by-8 array of bits contains in its rows the correct data bytes read from the sensors. I used to perform this operation on the PIC controller, using left shifts and so on, but that slowed down the system quite a lot. Thus, this operation is now performed on the computer where we process the data, using the following code:
BitArray ba = new BitArray(rxData);
BitArray ba2 = new BitArray(ba.Count);
for (int i = 0; i < ba.Count; i++)
{
ba2[i] = ba[(((int)(i / 64)) + 1) * 64 - 1 - (i % 8) * 8 - (int)(i / 8) + ((int)(i / 64)) * 8];
}
byte[] data = new byte[rxData.Length];
ba2.CopyTo(data, 0);
Note that THIS CODE WORKS.
rxData
is the received byte array.
The formula I use for the index of ba[]
in the loop codes for the mirroring of the arrays I described above. The size of the array is checked elsewhere to make sure it always contains the correct number (4096) of bytes.
So far this was the background for my problem.
In each processing loop of my system I need to perform that mirroring twice, because my data processing is on the difference between two arrays acquired consecutively. Speed is important for my system (possibly the main constraint on the processing), and the mirroring accounts for between 10% and 30% of the execution time of my processing.
I would like to know if there are alternative solutions I might compare to my mirroring code and that might allow me to improve performances. Using the BitArrays is the only way I found to address the different bits in the received bytes.
回答1:
The obvious solution is just extracting the bits and combining them again. You can do it with a loop but since it uses both left and right shift at the same time, otherwise you need a negative shift amount, so I unrolled it for easier understanding and more speed
out[0] = ((rxData[0] & 0x80) ) | ((rxData[1] & 0x80) >> 1) | ((rxData[2] & 0x80) >> 2) | ((rxData[3] & 0x80) >> 3) |
((rxData[4] & 0x80) >> 4) | ((rxData[5] & 0x80) >> 5) | ((rxData[6] & 0x80) >> 6) | ((rxData[7] & 0x80) >> 7);
out[1] = ((rxData[0] & 0x40) << 1) | ((rxData[1] & 0x40) ) | ((rxData[2] & 0x40) >> 1) | ((rxData[3] & 0x40) >> 2) |
((rxData[4] & 0x40) >> 3) | ((rxData[5] & 0x40) >> 4) | ((rxData[6] & 0x40) >> 5) | ((rxData[7] & 0x40) >> 6);
out[2] = ((rxData[0] & 0x20) << 2) | ((rxData[1] & 0x20) << 1) | ((rxData[2] & 0x20) ) | ((rxData[3] & 0x20) >> 1) |
((rxData[4] & 0x20) >> 2) | ((rxData[5] & 0x20) >> 3) | ((rxData[6] & 0x20) >> 4) | ((rxData[7] & 0x20) >> 5);
out[3] = ((rxData[0] & 0x10) << 3) | ((rxData[1] & 0x10) << 2) | ((rxData[2] & 0x10) << 1) | ((rxData[3] & 0x10) ) |
((rxData[4] & 0x10) >> 1) | ((rxData[5] & 0x10) >> 2) | ((rxData[6] & 0x10) >> 3) | ((rxData[7] & 0x10) >> 4);
out[4] = ((rxData[0] & 0x08) << 4) | ((rxData[1] & 0x08) << 3) | ((rxData[2] & 0x08) << 2) | ((rxData[3] & 0x08) << 1) |
((rxData[4] & 0x08) ) | ((rxData[5] & 0x08) >> 1) | ((rxData[6] & 0x08) >> 2) | ((rxData[7] & 0x08) >> 3);
out[5] = ((rxData[0] & 0x04) << 5) | ((rxData[1] & 0x04) << 4) | ((rxData[2] & 0x04) << 3) | ((rxData[3] & 0x04) << 2) |
((rxData[4] & 0x04) << 1) | ((rxData[5] & 0x04) ) | ((rxData[6] & 0x04) >> 1) | ((rxData[7] & 0x04) >> 2);
out[6] = ((rxData[0] & 0x02) << 6) | ((rxData[1] & 0x02) << 5) | ((rxData[2] & 0x02) << 4) | ((rxData[3] & 0x02) << 3) |
((rxData[4] & 0x02) << 2) | ((rxData[5] & 0x02) << 1) | ((rxData[6] & 0x02) ) | ((rxData[7] & 0x02) >> 1);
out[7] = ((rxData[0] & 0x01) << 7) | ((rxData[1] & 0x01) << 6) | ((rxData[2] & 0x01) << 5) | ((rxData[3] & 0x01) << 4) |
((rxData[4] & 0x01) << 3) | ((rxData[5] & 0x01) << 2) | ((rxData[6] & 0x01) << 1) | ((rxData[7] & 0x01) );
回答2:
You will probably find that BitVector performs a good deal better than BitArray.
BitVector32 is more efficient than BitArray for Boolean values and small integers that are used internally. A BitArray can grow indefinitely as needed, but it has the memory and performance overhead that a class instance requires. In contrast, a BitVector32 uses only 32 bits.
http://msdn.microsoft.com/en-us/library/system.collections.specialized.bitvector32.aspx
If you initialize an array of BitVector32 and operate on those, it should be faster than operating on BitArray as you do now.
You may also get a performance boost if you use one thread to perform the mirroring and a second thread to perform the analysis of consecutive reads. The Task Parallel Library Dataflow provides a nice framework for that type of solution. You could have one Source Block to acquire the data buffer, one Transform Block to perform the mirroring, and one Target Block to perform the data processing.
回答3:
This is actually the same as the get column in a bitboard problem so it can be solved even more efficiently by considering the byte array as a 64-bit integer
byte get_byte(ulong matrix, uint col)
{
const ulong column_mask = 0x8080808080808080ull;
const ulong magic = 0x2040810204081ull;
ulong column = ((matrix << col) & column_mask) * magic;
return (byte)(column >> 56);
}
// Actually the below step is not needed. You can read rxData directly into the `ulong`
// variable instead of a bit array. Remember to CHANGE THE ENDIANNESS if necessary
ulong matrix = (rxData[7] << 56) | (rxData[6] << 48) | (rxData[5] << 40) | (rxData[4] << 32)
| (rxData[3] << 24) | (rxData[2] << 16) | (rxData[1] << 8) | rxData[0];
for (int i = 0; i < 8; i++)
data[i] = get_byte(matrix, i);
In newer x86 CPUs you can use the PDEP instruction in the BMI2 instruction set. I'm not sure if there's any corresponding intrinsic in C#. If the intrinsic doesn't exist then you have to use native code like this
data[i] = _pext_u64(matrix, column_mask << col);
来源:https://stackoverflow.com/questions/21745008/performance-improvement-for-mirroring-bit-matrix-around-the-diagonal