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'm looking for a branchless bitwise operation that can determine with a given mask :

Mask : 0xFF0000 Value : 0xAA0000 return : true

Mask : 0xFF0000 Value : 0xAA00AA return : false

Mask : 0xFF00FF Value : 0xBB00AA return : true

Mask : 0xFF00FF Value : 0x0000AA return : false

Mask : 0xFF00FF Value : 0xAA0000 return : false

Mask : 0xFF00FF Value : 0x0A00AA return : true

That's is : it must returns true if :

  • the mask has a byte set to 0, the value must have the same byte to 0.
  • the mask has a byte set to > 0, the value must have the same byte different of 0.

Edit :

0xFFFF00 and 0x00AA00 should not match. If the mask has a byte > 0, the value must have the same byte > 0.

That's is : If the mask has this pattern [XX][00][XX], the value must have the same. Where XX can be from 01 to FF in the value.

Thanks!

share|improve this question
    
Just those 4 combos? –  leppie Mar 1 '13 at 15:15
    
@leppie I edited my question. –  Anthony Catel Mar 1 '13 at 19:40

1 Answer 1

up vote 1 down vote accepted

I'm assuming that we're only dealing with the low-order three bytes, as per the question.

A simple solution (17 operations):

((mask & 0x0000FF) == 0) == ((value & 0x0000FF) == 0) &&
((mask & 0x00FF00) == 0) == ((value & 0x00FF00) == 0) &&
((mask & 0xFF0000) == 0) == ((value & 0xFF0000) == 0)

A better solution (9 operations):

(((mask & 0x7F7F7F) + 0x7F7F7F | mask) & 0x808080) ==
(((value & 0x7F7F7F) + 0x7F7F7F | value) & 0x808080)

A third solution (9 operations):

!((((mask & 0x7F7F7F) + 0x7F7F7F | mask) ^
((value & 0x7F7F7F) + 0x7F7F7F | value)) & 0x808080)

The third solution can be reduced to 8 operations by dropping the ! surrounding the entire expression if your code is prepared to handle zero as pass and non-zero as fail.

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.