# Shell-sort algorithm variations in Java

Is there a way to calculate the starting point of a for loop and the adjustments to it. The original loop has these conditions

`for( int gap = a.length / 2; gap > 0; gap /= 2 )`

I adjusted it to set the conditions of the Hibbard's Shell Sort and got this

`for( int gap = (int) Math.pow(2, a.length); gap > 0; gap /= 2 )`

It works slightly better and might even be right, but I want to work with the more advanced shell sorts from here.

http://en.wikipedia.org/wiki/Shellsort#Gap_sequences

How could I turn (3^k - 1)/2 not greater than the ceiling of n/3 into a for loop condition?

• Your question seems simple. Where are you struggling to convert these values? You seem aware of `Math.pow`. You're aware of `Math.ceil()` correct? Have you tried something that isn't quite working right? Commented Dec 11, 2012 at 21:07
• using a ceiling just fixed one of them. My problem is, unless I know where I'm supposed to start, I have no idea what to make of the for loop though for the more advanced onces. Commented Dec 11, 2012 at 21:12
• I don't know what k in that equation is supposed to be actually. Probably why I'm in trouble here. Commented Dec 11, 2012 at 21:16
• (3^k - 1)/2 is the formula to give you the gap sequence for the first gap k = 1 for the second gap k = 2 giving you the values in get concrete gap column. Commented Dec 11, 2012 at 21:33

``````    for (int k = 0; (Math.pow(3, k) - 1) / 2 <= Math.ceil(n / 3); k++) {
``````for( int gap = 1; gap < ((a.length + 2)/3); gap = (((((gap *2)+1)*3)-1)/2))