Trouble understanding simple algorithm

sorry for such a specific question but upon looking at the following algorithm written in Javascript

function c(a) {
if (a < 2) return 2;
if (a > 4096) return 4096;
var b = a & (a - 1);
while (b > 0) {
a++;
b = a & (a - 1)
}
return a
}

I came accross a statement I wasn't sure about. What exactly does var b = a & (a - 1); actually do? I was under the assumption it assigned A to B and then subtracted 1 from B, however, if that was the case then wouldn't B never reach 0 (or below 0) resulting in an infinite loop? How can this work?

I ask this because I have attempted to adapt the algorithm to PHP but have hit a wall. It works flawlessly in Javascript, so I know for certain that I'm not understanding what is happening. Here is my attempt in PHP:

function c(\$a) {
if (\$a < 2) return 2;
if (\$a > 4096) return 4096;
\$b = \$a
\$b = (\$b - 1);
while (\$b > 0) {
\$a++;
\$b = \$a;
\$b -= 1;
}
return \$b;
}

I can see clearly why it doesn't work but I'm not sure how to change the algorithm to make it work. More or less, I know that I am not adapting the algorithm properly because I don't understand how it works in Javascript.

Either way, please help me! I don't specifically want someone to work out my problem for me but a hint in the right direction would be really great. :(

Thanks alot.

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That line clears the lowest set bit in the value of a and assigns the result to b.

Example:

00010100110101111000

Becomes :

00010100110101110000
^

The reason it works is that subtracting one flips all the bits up to and including the least significant bit that was set. All other bits remain unchanged. Using bitwise-and keeps all the bits that have not changed.

00010100110101111000  a
00010100110101110111  a-1
00010100110101110000  a & (a-1)

This loop repeatedly adds one to a until clearing one bit of a gives zero:

b = a & (a - 1);
while (b > 0) {
a++;
b = a & (a - 1);
}

In other words, it rounds a up to the nearest power of 2 in a very inefficient way!

Related

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This is right, insightful – DThought Jul 11 '12 at 7:43
Thanks a lot. I understand entirely now. :) – anditpainsme Jul 11 '12 at 7:58

It is the same.

function c(\$a) {
if (\$a < 2) return 2;
if (\$a > 4096) return 4096;
\$b = \$a & (\$a - 1);
while (\$b > 0) {
\$a++;
\$b = \$a & (\$a - 1);
}
return \$b;
}
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I think it returns closest next power of 2. For a power of 2 a & (a-1) returns 0.

Edit:

I just checked this in Java. It does return the next power of 2. When a is 6, it returns 8. When a is 9 it returns 16. If a is 2 it returns 2.

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Not sure why I got downvoted but please check stackoverflow.com/questions/600293/… – user1168577 Jul 11 '12 at 7:46
Right answer for the unstated question. :) But yes: the original function is quite ineffective way to get next-higher power of two (clamped by 2 and 4096). – ash108 Jul 11 '12 at 7:52
If you look at your numbers in binary form, you'll notice that they contain two ones. But if you try 15 for example, the expression returns 14. You accidentally picked numbers for which it works. – Otto Allmendinger Jul 11 '12 at 7:58
@Otto Allmendinger Take a look at the accepted answer. – user1168577 Jul 11 '12 at 8:02
Yes, the repeated application of the formula does yield a power of two after a while, but the a & (a-1) alone does not. – Otto Allmendinger Jul 11 '12 at 8:04
a & (a-1)

will do a bitwise and of a and (a-1)

in php

\$b = \$a & (\$a-1)

should work, too.

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a & (a-1);

This statement is doing bit-wise AND operation between a and a-1. This link explain you about Bit-wise operations. In PHP you can use & operator for AND operation. Here is the link related to PHP.

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