Editing Huffman coding (section)

=== ''n''-ary Huffman coding ===
The '''''n''-ary Huffman''' algorithm uses an alphabet of size ''n'', typically {0, 1, ..., n-1}, to encode messages and build an ''n''-ary tree. This approach was considered by Huffman in his original paper. The same algorithm applies as for binary (<math alt="''n'' equals 2">n = 2</math>) codes, but instead of combining the two least likely symbols, the ''n'' least likely symbols are grouped together. 

Note that for ''n'' > 2, not all sets of source words can properly form a complete ''n''-ary tree for Huffman coding. In these cases, additional placeholder symbols with 0 probability may need to be added. This is because the structure of the tree needs to repeatedly join ''n'' branches into one - also known as an "''n'' to 1" combination. For binary coding, this is a "2 to 1" combination, which works with any number of symbols. For ''n''-ary coding, a complete tree is only possible when the total number of symbols (real + placeholders) leaves a remainder of 1 when divided by (n-1). <ref name=":0" />