linux/drivers/md/bcache/bset.h

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#ifndef _BCACHE_BSET_H
#define _BCACHE_BSET_H
/*
* BKEYS:
*
* A bkey contains a key, a size field, a variable number of pointers, and some
* ancillary flag bits.
*
* We use two different functions for validating bkeys, bch_ptr_invalid and
* bch_ptr_bad().
*
* bch_ptr_invalid() primarily filters out keys and pointers that would be
* invalid due to some sort of bug, whereas bch_ptr_bad() filters out keys and
* pointer that occur in normal practice but don't point to real data.
*
* The one exception to the rule that ptr_invalid() filters out invalid keys is
* that it also filters out keys of size 0 - these are keys that have been
* completely overwritten. It'd be safe to delete these in memory while leaving
* them on disk, just unnecessary work - so we filter them out when resorting
* instead.
*
* We can't filter out stale keys when we're resorting, because garbage
* collection needs to find them to ensure bucket gens don't wrap around -
* unless we're rewriting the btree node those stale keys still exist on disk.
*
* We also implement functions here for removing some number of sectors from the
* front or the back of a bkey - this is mainly used for fixing overlapping
* extents, by removing the overlapping sectors from the older key.
*
* BSETS:
*
* A bset is an array of bkeys laid out contiguously in memory in sorted order,
* along with a header. A btree node is made up of a number of these, written at
* different times.
*
* There could be many of them on disk, but we never allow there to be more than
* 4 in memory - we lazily resort as needed.
*
* We implement code here for creating and maintaining auxiliary search trees
* (described below) for searching an individial bset, and on top of that we
* implement a btree iterator.
*
* BTREE ITERATOR:
*
* Most of the code in bcache doesn't care about an individual bset - it needs
* to search entire btree nodes and iterate over them in sorted order.
*
* The btree iterator code serves both functions; it iterates through the keys
* in a btree node in sorted order, starting from either keys after a specific
* point (if you pass it a search key) or the start of the btree node.
*
* AUXILIARY SEARCH TREES:
*
* Since keys are variable length, we can't use a binary search on a bset - we
* wouldn't be able to find the start of the next key. But binary searches are
* slow anyways, due to terrible cache behaviour; bcache originally used binary
* searches and that code topped out at under 50k lookups/second.
*
* So we need to construct some sort of lookup table. Since we only insert keys
* into the last (unwritten) set, most of the keys within a given btree node are
* usually in sets that are mostly constant. We use two different types of
* lookup tables to take advantage of this.
*
* Both lookup tables share in common that they don't index every key in the
* set; they index one key every BSET_CACHELINE bytes, and then a linear search
* is used for the rest.
*
* For sets that have been written to disk and are no longer being inserted
* into, we construct a binary search tree in an array - traversing a binary
* search tree in an array gives excellent locality of reference and is very
* fast, since both children of any node are adjacent to each other in memory
* (and their grandchildren, and great grandchildren...) - this means
* prefetching can be used to great effect.
*
* It's quite useful performance wise to keep these nodes small - not just
* because they're more likely to be in L2, but also because we can prefetch
* more nodes on a single cacheline and thus prefetch more iterations in advance
* when traversing this tree.
*
* Nodes in the auxiliary search tree must contain both a key to compare against
* (we don't want to fetch the key from the set, that would defeat the purpose),
* and a pointer to the key. We use a few tricks to compress both of these.
*
* To compress the pointer, we take advantage of the fact that one node in the
* search tree corresponds to precisely BSET_CACHELINE bytes in the set. We have
* a function (to_inorder()) that takes the index of a node in a binary tree and
* returns what its index would be in an inorder traversal, so we only have to
* store the low bits of the offset.
*
* The key is 84 bits (KEY_DEV + key->key, the offset on the device). To
* compress that, we take advantage of the fact that when we're traversing the
* search tree at every iteration we know that both our search key and the key
* we're looking for lie within some range - bounded by our previous
* comparisons. (We special case the start of a search so that this is true even
* at the root of the tree).
*
* So we know the key we're looking for is between a and b, and a and b don't
* differ higher than bit 50, we don't need to check anything higher than bit
* 50.
*
* We don't usually need the rest of the bits, either; we only need enough bits
* to partition the key range we're currently checking. Consider key n - the
* key our auxiliary search tree node corresponds to, and key p, the key
* immediately preceding n. The lowest bit we need to store in the auxiliary
* search tree is the highest bit that differs between n and p.
*
* Note that this could be bit 0 - we might sometimes need all 80 bits to do the
* comparison. But we'd really like our nodes in the auxiliary search tree to be
* of fixed size.
*
* The solution is to make them fixed size, and when we're constructing a node
* check if p and n differed in the bits we needed them to. If they don't we
* flag that node, and when doing lookups we fallback to comparing against the
* real key. As long as this doesn't happen to often (and it seems to reliably
* happen a bit less than 1% of the time), we win - even on failures, that key
* is then more likely to be in cache than if we were doing binary searches all
* the way, since we're touching so much less memory.
*
* The keys in the auxiliary search tree are stored in (software) floating
* point, with an exponent and a mantissa. The exponent needs to be big enough
* to address all the bits in the original key, but the number of bits in the
* mantissa is somewhat arbitrary; more bits just gets us fewer failures.
*
* We need 7 bits for the exponent and 3 bits for the key's offset (since keys
* are 8 byte aligned); using 22 bits for the mantissa means a node is 4 bytes.
* We need one node per 128 bytes in the btree node, which means the auxiliary
* search trees take up 3% as much memory as the btree itself.
*
* Constructing these auxiliary search trees is moderately expensive, and we
* don't want to be constantly rebuilding the search tree for the last set
* whenever we insert another key into it. For the unwritten set, we use a much
* simpler lookup table - it's just a flat array, so index i in the lookup table
* corresponds to the i range of BSET_CACHELINE bytes in the set. Indexing
* within each byte range works the same as with the auxiliary search trees.
*
* These are much easier to keep up to date when we insert a key - we do it
* somewhat lazily; when we shift a key up we usually just increment the pointer
* to it, only when it would overflow do we go to the trouble of finding the
* first key in that range of bytes again.
*/
/* Btree key comparison/iteration */
struct btree_iter {
size_t size, used;
struct btree_iter_set {
struct bkey *k, *end;
} data[MAX_BSETS];
};
struct bset_tree {
/*
* We construct a binary tree in an array as if the array
* started at 1, so that things line up on the same cachelines
* better: see comments in bset.c at cacheline_to_bkey() for
* details
*/
/* size of the binary tree and prev array */
unsigned size;
/* function of size - precalculated for to_inorder() */
unsigned extra;
/* copy of the last key in the set */
struct bkey end;
struct bkey_float *tree;
/*
* The nodes in the bset tree point to specific keys - this
* array holds the sizes of the previous key.
*
* Conceptually it's a member of struct bkey_float, but we want
* to keep bkey_float to 4 bytes and prev isn't used in the fast
* path.
*/
uint8_t *prev;
/* The actual btree node, with pointers to each sorted set */
struct bset *data;
};
static __always_inline int64_t bkey_cmp(const struct bkey *l,
const struct bkey *r)
{
return unlikely(KEY_INODE(l) != KEY_INODE(r))
? (int64_t) KEY_INODE(l) - (int64_t) KEY_INODE(r)
: (int64_t) KEY_OFFSET(l) - (int64_t) KEY_OFFSET(r);
}
static inline size_t bkey_u64s(const struct bkey *k)
{
BUG_ON(KEY_CSUM(k) > 1);
return 2 + KEY_PTRS(k) + (KEY_CSUM(k) ? 1 : 0);
}
static inline size_t bkey_bytes(const struct bkey *k)
{
return bkey_u64s(k) * sizeof(uint64_t);
}
static inline void bkey_copy(struct bkey *dest, const struct bkey *src)
{
memcpy(dest, src, bkey_bytes(src));
}
static inline void bkey_copy_key(struct bkey *dest, const struct bkey *src)
{
if (!src)
src = &KEY(0, 0, 0);
SET_KEY_INODE(dest, KEY_INODE(src));
SET_KEY_OFFSET(dest, KEY_OFFSET(src));
}
static inline struct bkey *bkey_next(const struct bkey *k)
{
uint64_t *d = (void *) k;
return (struct bkey *) (d + bkey_u64s(k));
}
/* Keylists */
struct keylist {
struct bkey *top;
union {
uint64_t *list;
struct bkey *bottom;
};
/* Enough room for btree_split's keys without realloc */
#define KEYLIST_INLINE 16
uint64_t d[KEYLIST_INLINE];
};
static inline void bch_keylist_init(struct keylist *l)
{
l->top = (void *) (l->list = l->d);
}
static inline void bch_keylist_push(struct keylist *l)
{
l->top = bkey_next(l->top);
}
static inline void bch_keylist_add(struct keylist *l, struct bkey *k)
{
bkey_copy(l->top, k);
bch_keylist_push(l);
}
static inline bool bch_keylist_empty(struct keylist *l)
{
return l->top == (void *) l->list;
}
static inline void bch_keylist_free(struct keylist *l)
{
if (l->list != l->d)
kfree(l->list);
}
void bch_keylist_copy(struct keylist *, struct keylist *);
struct bkey *bch_keylist_pop(struct keylist *);
int bch_keylist_realloc(struct keylist *, int, struct cache_set *);
void bch_bkey_copy_single_ptr(struct bkey *, const struct bkey *,
unsigned);
bool __bch_cut_front(const struct bkey *, struct bkey *);
bool __bch_cut_back(const struct bkey *, struct bkey *);
static inline bool bch_cut_front(const struct bkey *where, struct bkey *k)
{
BUG_ON(bkey_cmp(where, k) > 0);
return __bch_cut_front(where, k);
}
static inline bool bch_cut_back(const struct bkey *where, struct bkey *k)
{
BUG_ON(bkey_cmp(where, &START_KEY(k)) < 0);
return __bch_cut_back(where, k);
}
const char *bch_ptr_status(struct cache_set *, const struct bkey *);
bool __bch_ptr_invalid(struct cache_set *, int level, const struct bkey *);
bool bch_ptr_bad(struct btree *, const struct bkey *);
static inline uint8_t gen_after(uint8_t a, uint8_t b)
{
uint8_t r = a - b;
return r > 128U ? 0 : r;
}
static inline uint8_t ptr_stale(struct cache_set *c, const struct bkey *k,
unsigned i)
{
return gen_after(PTR_BUCKET(c, k, i)->gen, PTR_GEN(k, i));
}
static inline bool ptr_available(struct cache_set *c, const struct bkey *k,
unsigned i)
{
return (PTR_DEV(k, i) < MAX_CACHES_PER_SET) && PTR_CACHE(c, k, i);
}
typedef bool (*ptr_filter_fn)(struct btree *, const struct bkey *);
struct bkey *bch_next_recurse_key(struct btree *, struct bkey *);
struct bkey *bch_btree_iter_next(struct btree_iter *);
struct bkey *bch_btree_iter_next_filter(struct btree_iter *,
struct btree *, ptr_filter_fn);
void bch_btree_iter_push(struct btree_iter *, struct bkey *, struct bkey *);
struct bkey *__bch_btree_iter_init(struct btree *, struct btree_iter *,
struct bkey *, struct bset_tree *);
/* 32 bits total: */
#define BKEY_MID_BITS 3
#define BKEY_EXPONENT_BITS 7
#define BKEY_MANTISSA_BITS 22
#define BKEY_MANTISSA_MASK ((1 << BKEY_MANTISSA_BITS) - 1)
struct bkey_float {
unsigned exponent:BKEY_EXPONENT_BITS;
unsigned m:BKEY_MID_BITS;
unsigned mantissa:BKEY_MANTISSA_BITS;
} __packed;
/*
* BSET_CACHELINE was originally intended to match the hardware cacheline size -
* it used to be 64, but I realized the lookup code would touch slightly less
* memory if it was 128.
*
* It definites the number of bytes (in struct bset) per struct bkey_float in
* the auxiliar search tree - when we're done searching the bset_float tree we
* have this many bytes left that we do a linear search over.
*
* Since (after level 5) every level of the bset_tree is on a new cacheline,
* we're touching one fewer cacheline in the bset tree in exchange for one more
* cacheline in the linear search - but the linear search might stop before it
* gets to the second cacheline.
*/
#define BSET_CACHELINE 128
#define bset_tree_space(b) (btree_data_space(b) / BSET_CACHELINE)
#define bset_tree_bytes(b) (bset_tree_space(b) * sizeof(struct bkey_float))
#define bset_prev_bytes(b) (bset_tree_space(b) * sizeof(uint8_t))
void bch_bset_init_next(struct btree *);
void bch_bset_fix_invalidated_key(struct btree *, struct bkey *);
void bch_bset_fix_lookup_table(struct btree *, struct bkey *);
struct bkey *__bch_bset_search(struct btree *, struct bset_tree *,
const struct bkey *);
static inline struct bkey *bch_bset_search(struct btree *b, struct bset_tree *t,
const struct bkey *search)
{
return search ? __bch_bset_search(b, t, search) : t->data->start;
}
bool bch_bkey_try_merge(struct btree *, struct bkey *, struct bkey *);
void bch_btree_sort_lazy(struct btree *);
void bch_btree_sort_into(struct btree *, struct btree *);
void bch_btree_sort_and_fix_extents(struct btree *, struct btree_iter *);
void bch_btree_sort_partial(struct btree *, unsigned);
static inline void bch_btree_sort(struct btree *b)
{
bch_btree_sort_partial(b, 0);
}
int bch_bset_print_stats(struct cache_set *, char *);
#endif