I am new to data structures. So my question is whether Trie Data Structure and Radix Tree are the same thing? If they are same then what is the meaning of Radix trie (aka Patricia trie). Please explain Thanks
A radix tree is a compressed version of a trie. In a trie, on each edge you write a single letter, while in a Patricia tree(or radix tree) you store whole words. So assume you have the words
Or you need 9 nodes. I have placed the letters in the nodes, but in fact they label the edges. In a radix tree, you will have:
Or only 5 nodes. In the picture above nodes are the asterisks and the So overall  a radix tree takes less memory but is harder to implement. Otherwise the use case of both is pretty much the same. 


"Trie" describes a tree data structure suitable for use as an associative array, where branches or edges correspond to parts of a key. The definition of parts is rather wide, here, because different implementations of tries use different bitlengths to correspond to edges. For example, a binary trie has two edges per node that correspond to a 0 or a 1, while a 16way trie has sixteen edges per node that correspond to four bits (or a hexidecimal digit: 0x0 through to 0xf). "Radix trie" seems to describe a form of trie that condenses common prefix parts, as Ivaylo Strandjev described in his answer. Consider that a 256way trie which indexes the keys "hello", "hat" and "have" using the following static assignments:
Each subscript accesses an internal node. That means to retrieve
To retrieve items, each node needs a position. With a search key of "smiles" and a You can see how the term "radix trie" ends up being more specific than the term "trie"; A "radix trie" is a specific type of "trie". Similarly, a "PATRICIA trie" was historically defined as a specific type of "radix trie". The idea is that there should only ever be n nodes in a PATRICIA trie that contains n items. In our crudely demonstrated radix trie pseudocode, there are five nodes in total: root, root['e'], root['e']['d'], root['e']['s'] and root['i']. In a PATRICIA trie there should only be four. Let's take a look at how these prefixes might differ by looking at them in binary, since PATRICIA is a binary algorithm.
Let us consider that the nodes are added in the order they are presented above. smile_item is the root of this tree. The difference, bolded to make it slightly easier to spot, is in the last byte of "smile", at bit 36. Up until this point, all of our nodes have the same prefix. smiled_node belongs at smile_node[0]. The difference between "smiled" and "smiles" occurs at bit 43, where "smiles" has a '1' bit, so smiled_node[1] is smiles_node. I'm going to cut this description short here, in order to reduce the severity of my impending arthritis, but if you want to know more about PATRICIA you can consult books such as "The Art of Computer Programming, Volume 3" by Donald Knuth, or any of the "Algorithms in {yourfavouritelanguage}, parts 14" by Sedgewick. By branching like this, there are a number of benefits: There are no "null links" inside the trie. That includes the root. As a result, the length and complexity of the code becomes a lot shorter and probably a bit faster in reality. At least one branch and at most n branches (where n is the number of bits in the search key) are followed to locate an item. The nodes are tiny, because they store only two branches each, which makes them fairly suitable for cache locality optimisation. These properties make PATRICIA my favourite algorithm so far... 

