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191 lines
9.3 KiB
Markdown
191 lines
9.3 KiB
Markdown
Data Structures in the Linux Kernel
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================================================================================
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Radix tree
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--------------------------------------------------------------------------------
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As you already know linux kernel provides many different libraries and functions which implement different data structures and algorithms. In this part we will consider one of these data structures - [Radix tree](http://en.wikipedia.org/wiki/Radix_tree). There are two files which are related to `radix tree` implementation and API in the linux kernel:
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* [include/linux/radix-tree.h](https://github.com/torvalds/linux/blob/master/include/linux/radix-tree.h)
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* [lib/radix-tree.c](https://github.com/torvalds/linux/blob/master/lib/radix-tree.c)
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Lets talk about what a `radix tree` is. Radix tree is a `compressed trie` where a [trie](http://en.wikipedia.org/wiki/Trie) is a data structure which implements an interface of an associative array and allows to store values as `key-value`. The keys are usually strings, but any data type can be used. A trie is different from an `n-tree` because of its nodes. Nodes of a trie do not store keys; instead, a node of a trie stores single character labels. The key which is related to a given node is derived by traversing from the root of the tree to this node. For example:
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```
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+-----------+
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| " " |
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+------+-----------+------+
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+----v------+ +-----v-----+
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| g | | c |
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+-----------+ +-----------+
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+----v------+ +-----v-----+
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| o | | a |
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+-----------+ +-----------+
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+-----v-----+
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| t |
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+-----------+
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```
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So in this example, we can see the `trie` with keys, `go` and `cat`. The compressed trie or `radix tree` differs from `trie` in that all intermediates nodes which have only one child are removed.
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Radix tree in linux kernel is the datastructure which maps values to integer keys. It is represented by the following structures from the file [include/linux/radix-tree.h](https://github.com/torvalds/linux/blob/master/include/linux/radix-tree.h):
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```C
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struct radix_tree_root {
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unsigned int height;
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gfp_t gfp_mask;
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struct radix_tree_node __rcu *rnode;
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};
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```
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This structure presents the root of a radix tree and contains three fields:
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* `height` - height of the tree;
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* `gfp_mask` - tells how memory allocations will be performed;
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* `rnode` - pointer to the child node.
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The first field we will discuss is `gfp_mask`:
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Low-level kernel memory allocation functions take a set of flags as - `gfp_mask`, which describes how that allocation is to be performed. These `GFP_` flags which control the allocation process can have following values: (`GF_NOIO` flag) means sleep and wait for memory, (`__GFP_HIGHMEM` flag) means high memory can be used, (`GFP_ATOMIC` flag) means the allocation process has high-priority and can't sleep etc.
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* `GFP_NOIO` - can sleep and wait for memory;
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* `__GFP_HIGHMEM` - high memory can be used;
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* `GFP_ATOMIC` - allocation process is high-priority and can't sleep;
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etc.
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The next field is `rnode`:
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```C
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struct radix_tree_node {
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unsigned int path;
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unsigned int count;
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union {
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struct {
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struct radix_tree_node *parent;
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void *private_data;
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};
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struct rcu_head rcu_head;
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};
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/* For tree user */
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struct list_head private_list;
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void __rcu *slots[RADIX_TREE_MAP_SIZE];
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unsigned long tags[RADIX_TREE_MAX_TAGS][RADIX_TREE_TAG_LONGS];
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};
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```
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This structure contains information about the offset in a parent and height from the bottom, count of the child nodes and fields for accessing and freeing a node. This fields are described below:
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* `path` - offset in parent & height from the bottom;
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* `count` - count of the child nodes;
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* `parent` - pointer to the parent node;
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* `private_data` - used by the user of a tree;
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* `rcu_head` - used for freeing a node;
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* `private_list` - used by the user of a tree;
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The two last fields of the `radix_tree_node` - `tags` and `slots` are important and interesting. Every node can contains a set of slots which are store pointers to the data. Empty slots in the linux kernel radix tree implementation store `NULL`. Radix trees in the linux kernel also supports tags which are associated with the `tags` fields in the `radix_tree_node` structure. Tags allow individual bits to be set on records which are stored in the radix tree.
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Now that we know about radix tree structure, it is time to look on its API.
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Linux kernel radix tree API
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---------------------------------------------------------------------------------
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We start from the datastructure initialization. There are two ways to initialize a new radix tree. The first is to use `RADIX_TREE` macro:
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```C
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RADIX_TREE(name, gfp_mask);
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````
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As you can see we pass the `name` parameter, so with the `RADIX_TREE` macro we can define and initialize radix tree with the given name. Implementation of the `RADIX_TREE` is easy:
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```C
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#define RADIX_TREE(name, mask) \
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struct radix_tree_root name = RADIX_TREE_INIT(mask)
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#define RADIX_TREE_INIT(mask) { \
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.height = 0, \
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.gfp_mask = (mask), \
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.rnode = NULL, \
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}
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```
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At the beginning of the `RADIX_TREE` macro we define instance of the `radix_tree_root` structure with the given name and call `RADIX_TREE_INIT` macro with the given mask. The `RADIX_TREE_INIT` macro just initializes `radix_tree_root` structure with the default values and the given mask.
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The second way is to define `radix_tree_root` structure by hand and pass it with mask to the `INIT_RADIX_TREE` macro:
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```C
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struct radix_tree_root my_radix_tree;
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INIT_RADIX_TREE(my_tree, gfp_mask_for_my_radix_tree);
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```
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where:
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```C
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#define INIT_RADIX_TREE(root, mask) \
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do { \
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(root)->height = 0; \
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(root)->gfp_mask = (mask); \
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(root)->rnode = NULL; \
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} while (0)
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```
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makes the same initialziation with default values as it does `RADIX_TREE_INIT` macro.
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The next are two functions for inserting and deleting records to/from a radix tree:
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* `radix_tree_insert`;
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* `radix_tree_delete`;
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The first `radix_tree_insert` function takes three parameters:
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* root of a radix tree;
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* index key;
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* data to insert;
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The `radix_tree_delete` function takes the same set of parameters as the `radix_tree_insert`, but without data.
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The search in a radix tree implemented in two ways:
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* `radix_tree_lookup`;
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* `radix_tree_gang_lookup`;
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* `radix_tree_lookup_slot`.
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The first `radix_tree_lookup` function takes two parameters:
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* root of a radix tree;
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* index key;
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This function tries to find the given key in the tree and return the record associated with this key. The second `radix_tree_gang_lookup` function have the following signature
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```C
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unsigned int radix_tree_gang_lookup(struct radix_tree_root *root,
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void **results,
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unsigned long first_index,
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unsigned int max_items);
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```
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and returns number of records, sorted by the keys, starting from the first index. Number of the returned records will not be greater than `max_items` value.
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And the last `radix_tree_lookup_slot` function will return the slot which will contain the data.
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Links
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---------------------------------------------------------------------------------
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* [Radix tree](http://en.wikipedia.org/wiki/Radix_tree)
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* [Trie](http://en.wikipedia.org/wiki/Trie)
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