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I try to write C++ code to do radix sort for integer. After looking at tutorial online, I found that we have to put each integer to the right bucket, start from the least significant figure. My question is, Do I need 10 buckets from 0 to 9 in normal algorithm for radix sort? If I assign those bucket as a linked list ( ex. *list1 ~~~ *list9), will it seems a little bit weird?

Thank you for your time. This is not a homework but just out of curiosity.

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I think it should be in List0 to List9. Also, that could be one to do it. What exactly is your question? –  noMAD Mar 3 '12 at 19:50
My question is, is that necessary to define 10 buckets? –  Hold_My_Anger Mar 3 '12 at 19:55
You could define an array of lists, for instance.. –  qdot Mar 3 '12 at 19:58
possible duplicate of Radix Sort implemented in C++ –  Björn Pollex Mar 3 '12 at 19:58
Well, you could create the nodes just before inserting the digits. That way you would be creating only the necessary nodes. –  noMAD Mar 3 '12 at 19:58

1 Answer 1

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I don't think this is a C++ question (although Radix Sort can clearly be implemented in C++) and it probably has nothing to do with linked lists, at least not in the way you seem to think about it it: The sorting happens on a per digit base where you have efficient access to the buckets for each digit. For this, a list wouldn't work too well but a vector would. Inside each bucket you may use a list.

As with respect to the number of buckets you need, the answer is: it depends! You can use any integral base which is bigger than 1 and you would need a corresponding number of buckets. Since computers are particularly good at computing powers of 2 using a power of 2 is probably more efficient than using other bases like 10 although 10 would also work. Oddly enough, Wikipedia's article on Radix Sort uses base 10 - probably to avoid too much confusion about the free choice of bases.

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