Before anything, no this is not my homework, it's a lab given by a book called "Computer Systems A Programmer's Perspective" (Excellent book btw)

I need to perform a logical shift right on signed integers without using any the following:

  • casting
  • if, while, select, for, do-while, ?:
  • pointers of any type

Allowed operators are: ! + ~ | >> << ^

What have I tried so far?

 * logicalShift - shift x to the right by n, using a logical shift
 *   Can assume that 0 <= n <= 31
 *   Examples: logicalShift(0x87654321,4) = 0x08765432
 *   Legal ops: ~ & ^ | + << >>
 *   Max ops: 20
 *   Rating: 3 
int logicalShift(int x, int n) {
    int mask = ~0;
    int shiftAmount = 31 + ((~n)+1);//this evaluates to 31 - n on two's complement machines
    mask = mask << shiftAmount;
    mask = ~mask;//If n equals 0, it means we have negated all bits and hence have mask = 0
    x = x >> n;
    return x & mask; 

This works just fine as long as n doesn't equal 0, when it does this code breaks because the mask will turn to all 0s and the function will return 0.

I'd appreciate any hint in the right direction rather than a complete code.

Again, this is not a homework; the lab-assignments are publicly available here http://csapp.cs.cmu.edu/public/labs.html

P.S Not a duplicate, do not post solutions that involve casting to unsigned and then shifting.

  • The value that results from a right shift of a negative value is implementation defined, which means that pretty much anything goes so long as it's documented. Any solution that involves doing the shift then masking the result is not portable. Granted, most hardware will fill with 1-bits or 0-bits, in which case shift-and-mask will work. But I don't see that assumption stated in the requirements... – Pete Becker Nov 4 '12 at 21:02
  • Agreed, the book mentions this and makes it pretty clear such code is not portable. But this was not the objective of this lab-exercise; the main objective was to make the student understand operations at the bit-level on the most common-architecture available to them for programming; that is x86. – Fingolfin Nov 4 '12 at 21:11
  • unsigned int y = x; return x >> n; seems to meet the conditions (implicit conversions are not casts) – M.M Jul 13 '14 at 22:59

You can make a mask this way:

int mask = 1 << shiftAmount;
mask |= mask - 1;

Which compares to the other approach like this

                    this approach | other approach
can have 0 bits set :     no      |      yes
can have 32 bits set:    yes      |       no
  • Awesome. Can you please direct me to some blog/paper that actually explains this(the whole bit-manipulation in C/C++) if you know any? – Fingolfin Nov 4 '12 at 19:09
  • @AdelQodmani I was about to point to my own blog, but I didn't actually cover this one. So instead I'll direct you to The Art of Computer Programming volume 4, section 7.1.3, Bitwise Tricks and Techniques. Specifically equation 40, smearing the rightmost bit to the right. I just combined that with setting the right bit. – harold Nov 4 '12 at 19:19
  • Thanks, if your own blog contains any general info about bit-wise operations(in general, not necessarily related to this question) I'd also like to take a look at it. – Fingolfin Nov 4 '12 at 19:24
  • @AdelQodmani only a little. It's mostly specifics, not too much general info. There's a short post about some things that you can do with the rightmost bit, but there are better sources elsewhere (such as TAOCP 7.1.3) – harold Nov 4 '12 at 19:28
  • 1 << shiftAmount causes undefined behaviour for shiftAmount == 31 (which is the same case OP was having trouble with) – M.M Jul 13 '14 at 22:57

I know I'm a bit late here, but I think the best method would be to do something like this:

int logicalShift(int x, int n) {
   int mask = ( 1 << sizeof(int) - n ) - 1;
   return x >> n & mask;

The mask sets the uppermost n bits to 0.

Of course this can alternatively be written as:

int logicalShift(int x, int n) {
   return x >> n & ( 1 << sizeof(int) - n ) - 1;

But the compiler will probably understand how to optimize the first one.

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