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A friend just throw some code similar to following C# code:

int i = ...;
return i < 0 ? 0 : i;

That made me think. There's any "different" way to return zero for negative integers, or current positive value? More specifically I'm looking for bitwise operations, if possible.

BTW, I'm aware of Math.Max(0, i);

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4  
How does this qualify as code golf? –  Ed S. Nov 5 '09 at 19:42
5  
i<0?0:i -- Do you really expect something smaller than 7 characters? –  zildjohn01 Nov 5 '09 at 19:44
9  
Tell your friend not to throw code. It could hit someone in the eye. –  mob Nov 5 '09 at 19:44
    
+1 I won't throw code EVER again !! –  Jhonny D. Cano -Leftware- Nov 5 '09 at 21:15
    
Bit wise, byte foolish. –  dbkk Nov 6 '09 at 4:06
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5 Answers

up vote 14 down vote accepted

What's wrong with Math.Max?

You can do the equivalent without a branch using bitwise operations:

r = x ^ ((x ^ y) & -(x < y)); // == max(x, y)

If you substitute zero, it collapses to:

r = (y & -(0 < y)); // == max(0, y)

(Source: this list of bitwise tricks.)

If branches were extremely expensive on your platform, that might be worthwhile in some inner loop, I suppose, but it's pretty obscure and not the kind of thing I'd like to come across outside of an extremely time-sensitive function.

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Generally (x < y) is going to require a branch to convert it to either 0/1. –  Aaron Nov 5 '09 at 19:54
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That's only true on some platforms. Most have a compare instruction the result of which can be moved or shifted into a general purpose register. –  Tim Sylvester Nov 5 '09 at 19:55
    
@Aaron, Not true x86 is a very rich instruction set. –  Frank Krueger Nov 5 '09 at 19:56
1  
True - I just tried it and msdev used the 'setg' instruction -- so no branch necessary. –  Aaron Nov 5 '09 at 19:58
1  
If MS's JIT is smart enough, Math.Max should already do just that. –  LiraNuna Nov 5 '09 at 20:02
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How about:

int i = ...;

return i & ~(i >> 31);

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Fails for i = int.MinValue. –  Dan Blanchard Nov 5 '09 at 20:36
    
Good point - I modified it - it should now work for all cases. –  Aaron Nov 5 '09 at 21:13
    
Argh same strategy but much cleaner than mine. Didn't know the ~ to be honest –  Rune FS Nov 5 '09 at 21:58
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The below will do the trick and the code reads so well it practically don't need a comment ;)

((((0x80000000 & i) >> 31)^1) * 0xFFFFFFFF) & i

then again

int temp = (0x80000000 & i); //get the most significant bit (1 for negative 0 for positive)
temp = (temp>>31)^1; //more it to the least significant and not it (we now have 0 for negative numbers and one for positive)

temp *= 0xFFFFFFFF; //get a lof of F's if it's positive or a lot of zeros if the number was negative

temp = temp & i; //and the F's/zeros with the original number

and voila zero for all negative number and all positive are left unchanged

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Short answer: No.

Bit operators do something very different, or rather are used for different problems.

If you know the size of your integers, you could test the highest (most significant) bit; if it's 1, the number is negative and you can act on that. But that would be a heck of a lot more work than the simple "<" test.

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And I wouldn't be surprised if the compiler already does this optimization. –  Kai Nov 5 '09 at 19:51
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Not bitwise but different:

return (i + Math.abs(i))/2

EDIT:

return (int)(i/2f + Math.abs(i)/2f)
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3  
Kinky, but my overflow-sense is tickling :) –  cwap Nov 5 '09 at 20:01
    
yep, you're right –  Kai Huppmann Nov 5 '09 at 20:13
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