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Not sure if this is possible, but is there an automatic way, using mod or something similiar, to automatically correct bad input values? For example:

If r>255, then set r=255 and
if r<0, then set r=0

So basically what I'm asking is whats a clever mathematical way to set this rather than using

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For future answerers, I think the asker is trying to do this without conditionals. Which means no MAX or MIN function calls allowed. –  Olhovsky Jan 28 '11 at 2:37
Well I was thinking there would be a cool mathematical approach to it, but I guess any unique shortcut works, even though MIN and MAX are pretty much conditionals.. –  moby Jan 28 '11 at 2:40
Are you just curious or looking for a speed gain or better aesthetics? –  Olhovsky Jan 28 '11 at 2:48
Wrap is something different. This operation is called saturation or clamping. –  ruslik Jan 28 '11 at 3:08

5 Answers 5

up vote 7 down vote accepted

How about:

r = std:max(0, std::min(r, 255));
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The following function will output what you are looking for:

 f(x) = (510*(1 + Sign[-255 + x]) + x*(1 + Sign[255 - x])*(1 + Sign[x]))/4

As shown here:

enter image description here

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So how are you implementing Sign :-) –  stefan Jan 28 '11 at 3:31
+1 for creativity. –  Olhovsky Jan 28 '11 at 3:38
@stefan Many ways to do that, if it's not a primitive. For example Sign[x]=x/Abs[x] (for x != 0) –  belisarius Jan 28 '11 at 3:42
@belisarius i Agree with Kdoto >D But with Mathematica at hands i guess we could sit here all Millenium ;-) –  stefan Jan 28 '11 at 3:43
@stefan Is it that bad ? :D –  belisarius Jan 28 '11 at 3:47

Could you do something like --

R = MIN(r, 255);
R = MAX(R, 0);
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That wouldn't work. R would always be zero or a negative number. –  ClosureCowboy Jan 28 '11 at 2:33
You got MIN and MAX the wrong way around. The result is always 0. –  Crappy Experience Bye Jan 28 '11 at 2:34
Even if this works, it's not really answering the question. MAX and MIN have conditionals, which the asker is trying to avoid. –  Olhovsky Jan 28 '11 at 2:35
@Kdoto: I am not sure the standard specifies how min/max are implemented. The OP asked for a clever mathematical way. min/max are relatively standard mathematical functions. I doubt the question is about speed and more about aesthetics. –  Crappy Experience Bye Jan 28 '11 at 2:38
@Martin York, fair enough, you might be right :) –  Olhovsky Jan 28 '11 at 2:48

Depending on how your hardware and possibly how your interpreter deal with ints, you can do this:

Assuming that an unsigned int is 16 bits (to keep my masks short):

r = r & 0000000011111111;

If an int was 32 bits, you'd need 16 more zeros at the start of the bit mask.

After that bitwise AND, the maximum value r can have is 255. Depending on the hardware, an unsigned int might do something odd given a value below zero. I believe that case is already handled by the bitmask (at least on the hardware that I've used). If not, you can do r = min(r, 0); first.

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You are assuming stuff not meantioned in the question. You dont know how the number is described binary. –  stefan Jan 28 '11 at 2:57
I guess so. This is the only answer I see so far that offers an efficiency gain, rather than just aesthetic gain. So I thought it was worth mentioning. You're right though -- I do assume that r is stored in a finite, maskable form -- which is the case for every question I've ever seen on SO. I did write "Assuming that an unsigned int is 16 bits" in my answer :) –  Olhovsky Jan 28 '11 at 3:01
If it makes you feel better, you can apply this same logic to a number stored with infinitely many digits, as long as you know what structure the number is represented as, and can form a mask against that number. –  Olhovsky Jan 28 '11 at 3:04
The asker also wrote "any unique shortcut works". –  Olhovsky Jan 28 '11 at 3:05
I'm surprised that this was still downvoted :/ –  Olhovsky Jan 28 '11 at 3:26

I had similar problem when dealing with images. For some special values (like these ones, 0 and 255) you can use this nonportable method:

static inline int trim_8bit(unsigned i){
    return 0xff & ((i | -!!(i & ~0xff))) + (i >> 31);
    // where "0xff &" can be omitted if you return unsigned char

In real cases the clamping have to be performed rarely, so that you could write

static inline unsigned char trim_8bit_v2(unsigned i){   
    if (__builtin_expect(i & ~0xFF, 0)) // it's for gcc, use __assume for MSVC
        return (i >> 31) - 1; 
    return i;

And to be sure which is fastest, measure.

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