Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I know that the following is true

int i = 17; //binary 10001
int j = i << 1; //decimal 34, binary 100010

But, if you shift too far, the bits fall off the end. Where this happens is a matter of the size of integer you are working with.

Is there a way to perform a shift so that the bits rotate around to the other side? I'm looking for a single operation, not a for loop.

share|improve this question
    
Where would an operation of this type be used? What is the purpose behind doing a Bit Rotate? I don't need to know, but am just interested in ever expanding knowledge. Keith –  Keith Sirmons Oct 7 '08 at 14:32
    
a very good question. I just checked the generated code and the C# compiler doesn't generate code that uses the rotate instructions of the CPU (not that the x86 architecture has them since the 8086...). This is a shame. C does this optimization. Also rotations are very important for crypto and dsp tasks. –  Nils Pipenbrinck Jun 8 '09 at 1:45

6 Answers 6

up vote 28 down vote accepted

If you know the size of type, you could do something like:

uint i = 17;
uint j = i << 1 | i >> 31;

... which would perform a circular shift of a 32 bit value.

As a generalization to circular shift left n bits, on a b bit variable:

/*some unsigned numeric type*/ input = 17;
var result = input  << n | input  >> (b - n);


@The comment, it appears that C# does treat the high bit of signed values differently. I found some info on this here. I also changed the example to use a uint.

share|improve this answer
    
Since I don't know C#, are the shift operators doing arithmetic or logic shifts? If arithmetic, then this algorithm can't be used for 64-bit signed integers. –  tzot Oct 6 '08 at 15:20
    
So perhaps both the 'int' and 'var' types should be prefixed with an 'unsigned' modifier, of course if C# allows that. –  tzot Oct 6 '08 at 15:21
    
Thanks for catching that. –  Chris Marasti-Georg Oct 6 '08 at 17:26
5  
Well, rotation of bits only makes sense with unsigned integers anyway. –  Lasse V. Karlsen Aug 5 '09 at 12:37
1  
@LasseV.Karlsen: I wouldn't necessarily agree with that. GetHashCode returns a (signed) int, and if you want to evenly distribute hash codes by using the full 32 bits of that (which can involve bit rotation), the sign doesn't really matter - and apparently gets in the way of bit rotation. –  O. R. Mapper Oct 16 '13 at 12:17

One year ago I've to implement MD4 for my undergraduate thesis. Here it is my implementation of circular bit shift using a UInt32.

private UInt32 RotateLeft(UInt32 x, Byte n)
{
      return (UInt32)(((x) << (n)) | ((x) >> (32 - (n))));
}
share|improve this answer

Chris's answer is good, and I won't add to it.

To answer Keith's question, word rotations have a lot of uses, especially in cryptography. Have a look at various message digest algorithms, such as MD5, or the SHA family, for starters.

share|improve this answer

Just as reference on how to do it, this two functions work perfectly for rotating the bits of 1/2word:

static public uint ShiftRight(uint z_value, int z_shift)
{
    return ((z_value >> z_shift) | (z_value << (16 - z_shift))) & 0x0000FFFF;
}

static public uint ShiftLeft(uint z_value, int z_shift)
{
    return ((z_value << z_shift) | (z_value >> (16 - z_shift))) & 0x0000FFFF;
}

It would be easy to extend it for any given size.

share|improve this answer

The most famous application is the solution to the Josephus problem (as discussed in Concrete Mathematics, see http://oeis.org/A006257). This is basically a puzzle with no obvious applications. In this video, I demonstrated connections between the second order Josephus problem and complete balanced trees. It's still not an application, but moving slightly in the right direction.

share|improve this answer

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.