mirror of
https://github.com/python/cpython.git
synced 2024-11-26 11:24:40 +08:00
246 lines
11 KiB
Plaintext
246 lines
11 KiB
Plaintext
NOTES ON OPTIMIZING DICTIONARIES
|
|
================================
|
|
|
|
|
|
Principal Use Cases for Dictionaries
|
|
------------------------------------
|
|
|
|
Passing keyword arguments
|
|
Typically, one read and one write for 1 to 3 elements.
|
|
Occurs frequently in normal python code.
|
|
|
|
Class method lookup
|
|
Dictionaries vary in size with 8 to 16 elements being common.
|
|
Usually written once with many lookups.
|
|
When base classes are used, there are many failed lookups
|
|
followed by a lookup in a base class.
|
|
|
|
Instance attribute lookup and Global variables
|
|
Dictionaries vary in size. 4 to 10 elements are common.
|
|
Both reads and writes are common.
|
|
|
|
Builtins
|
|
Frequent reads. Almost never written.
|
|
Size 126 interned strings (as of Py2.3b1).
|
|
A few keys are accessed much more frequently than others.
|
|
|
|
Uniquification
|
|
Dictionaries of any size. Bulk of work is in creation.
|
|
Repeated writes to a smaller set of keys.
|
|
Single read of each key.
|
|
Some use cases have two consecutive accesses to the same key.
|
|
|
|
* Removing duplicates from a sequence.
|
|
dict.fromkeys(seqn).keys()
|
|
|
|
* Counting elements in a sequence.
|
|
for e in seqn:
|
|
d[e] = d.get(e,0) + 1
|
|
|
|
* Accumulating references in a dictionary of lists:
|
|
|
|
for pagenumber, page in enumerate(pages):
|
|
for word in page:
|
|
d.setdefault(word, []).append(pagenumber)
|
|
|
|
Note, the second example is a use case characterized by a get and set
|
|
to the same key. There are similar used cases with a __contains__
|
|
followed by a get, set, or del to the same key. Part of the
|
|
justification for d.setdefault is combining the two lookups into one.
|
|
|
|
Membership Testing
|
|
Dictionaries of any size. Created once and then rarely changes.
|
|
Single write to each key.
|
|
Many calls to __contains__() or has_key().
|
|
Similar access patterns occur with replacement dictionaries
|
|
such as with the % formatting operator.
|
|
|
|
Dynamic Mappings
|
|
Characterized by deletions interspersed with adds and replacements.
|
|
Performance benefits greatly from the re-use of dummy entries.
|
|
|
|
|
|
Data Layout (assuming a 32-bit box with 64 bytes per cache line)
|
|
----------------------------------------------------------------
|
|
|
|
Smalldicts (8 entries) are attached to the dictobject structure
|
|
and the whole group nearly fills two consecutive cache lines.
|
|
|
|
Larger dicts use the first half of the dictobject structure (one cache
|
|
line) and a separate, continuous block of entries (at 12 bytes each
|
|
for a total of 5.333 entries per cache line).
|
|
|
|
|
|
Tunable Dictionary Parameters
|
|
-----------------------------
|
|
|
|
* PyDict_MINSIZE. Currently set to 8.
|
|
Must be a power of two. New dicts have to zero-out every cell.
|
|
Each additional 8 consumes 1.5 cache lines. Increasing improves
|
|
the sparseness of small dictionaries but costs time to read in
|
|
the additional cache lines if they are not already in cache.
|
|
That case is common when keyword arguments are passed.
|
|
|
|
* Maximum dictionary load in PyDict_SetItem. Currently set to 2/3.
|
|
Increasing this ratio makes dictionaries more dense resulting
|
|
in more collisions. Decreasing it improves sparseness at the
|
|
expense of spreading entries over more cache lines and at the
|
|
cost of total memory consumed.
|
|
|
|
The load test occurs in highly time sensitive code. Efforts
|
|
to make the test more complex (for example, varying the load
|
|
for different sizes) have degraded performance.
|
|
|
|
* Growth rate upon hitting maximum load. Currently set to *2.
|
|
Raising this to *4 results in half the number of resizes,
|
|
less effort to resize, better sparseness for some (but not
|
|
all dict sizes), and potentially double memory consumption
|
|
depending on the size of the dictionary. Setting to *4
|
|
eliminates every other resize step.
|
|
|
|
Tune-ups should be measured across a broad range of applications and
|
|
use cases. A change to any parameter will help in some situations and
|
|
hurt in others. The key is to find settings that help the most common
|
|
cases and do the least damage to the less common cases. Results will
|
|
vary dramatically depending on the exact number of keys, whether the
|
|
keys are all strings, whether reads or writes dominate, the exact
|
|
hash values of the keys (some sets of values have fewer collisions than
|
|
others). Any one test or benchmark is likely to prove misleading.
|
|
|
|
While making a dictionary more sparse reduces collisions, it impairs
|
|
iteration and key listing. Those methods loop over every potential
|
|
entry. Doubling the size of dictionary results in twice as many
|
|
non-overlapping memory accesses for keys(), items(), values(),
|
|
__iter__(), iterkeys(), iteritems(), itervalues(), and update().
|
|
|
|
|
|
Results of Cache Locality Experiments
|
|
-------------------------------------
|
|
|
|
When an entry is retrieved from memory, 4.333 adjacent entries are also
|
|
retrieved into a cache line. Since accessing items in cache is *much*
|
|
cheaper than a cache miss, an enticing idea is to probe the adjacent
|
|
entries as a first step in collision resolution. Unfortunately, the
|
|
introduction of any regularity into collision searches results in more
|
|
collisions than the current random chaining approach.
|
|
|
|
Exploiting cache locality at the expense of additional collisions fails
|
|
to payoff when the entries are already loaded in cache (the expense
|
|
is paid with no compensating benefit). This occurs in small dictionaries
|
|
where the whole dictionary fits into a pair of cache lines. It also
|
|
occurs frequently in large dictionaries which have a common access pattern
|
|
where some keys are accessed much more frequently than others. The
|
|
more popular entries *and* their collision chains tend to remain in cache.
|
|
|
|
To exploit cache locality, change the collision resolution section
|
|
in lookdict() and lookdict_string(). Set i^=1 at the top of the
|
|
loop and move the i = (i << 2) + i + perturb + 1 to an unrolled
|
|
version of the loop.
|
|
|
|
This optimization strategy can be leveraged in several ways:
|
|
|
|
* If the dictionary is kept sparse (through the tunable parameters),
|
|
then the occurrence of additional collisions is lessened.
|
|
|
|
* If lookdict() and lookdict_string() are specialized for small dicts
|
|
and for largedicts, then the versions for large_dicts can be given
|
|
an alternate search strategy without increasing collisions in small dicts
|
|
which already have the maximum benefit of cache locality.
|
|
|
|
* If the use case for a dictionary is known to have a random key
|
|
access pattern (as opposed to a more common pattern with a Zipf's law
|
|
distribution), then there will be more benefit for large dictionaries
|
|
because any given key is no more likely than another to already be
|
|
in cache.
|
|
|
|
* In use cases with paired accesses to the same key, the second access
|
|
is always in cache and gets no benefit from efforts to further improve
|
|
cache locality.
|
|
|
|
Optimizing the Search of Small Dictionaries
|
|
-------------------------------------------
|
|
|
|
If lookdict() and lookdict_string() are specialized for smaller dictionaries,
|
|
then a custom search approach can be implemented that exploits the small
|
|
search space and cache locality.
|
|
|
|
* The simplest example is a linear search of contiguous entries. This is
|
|
simple to implement, guaranteed to terminate rapidly, never searches
|
|
the same entry twice, and precludes the need to check for dummy entries.
|
|
|
|
* A more advanced example is a self-organizing search so that the most
|
|
frequently accessed entries get probed first. The organization
|
|
adapts if the access pattern changes over time. Treaps are ideally
|
|
suited for self-organization with the most common entries at the
|
|
top of the heap and a rapid binary search pattern. Most probes and
|
|
results are all located at the top of the tree allowing them all to
|
|
be located in one or two cache lines.
|
|
|
|
* Also, small dictionaries may be made more dense, perhaps filling all
|
|
eight cells to take the maximum advantage of two cache lines.
|
|
|
|
|
|
Strategy Pattern
|
|
----------------
|
|
|
|
Consider allowing the user to set the tunable parameters or to select a
|
|
particular search method. Since some dictionary use cases have known
|
|
sizes and access patterns, the user may be able to provide useful hints.
|
|
|
|
1) For example, if membership testing or lookups dominate runtime and memory
|
|
is not at a premium, the user may benefit from setting the maximum load
|
|
ratio at 5% or 10% instead of the usual 66.7%. This will sharply
|
|
curtail the number of collisions but will increase iteration time.
|
|
|
|
2) Dictionary creation time can be shortened in cases where the ultimate
|
|
size of the dictionary is known in advance. The dictionary can be
|
|
pre-sized so that no resize operations are required during creation.
|
|
Not only does this save resizes, but the key insertion will go
|
|
more quickly because the first half of the keys will be inserted into
|
|
a more sparse environment than before. The preconditions for this
|
|
strategy arise whenever a dictionary is created from a key or item
|
|
sequence and the number of unique keys is known.
|
|
|
|
3) If the key space is large and the access pattern is known to be random,
|
|
then search strategies exploiting cache locality can be fruitful.
|
|
The preconditions for this strategy arise in simulations and
|
|
numerical analysis.
|
|
|
|
4) If the keys are fixed and the access pattern strongly favors some of
|
|
the keys, then the entries can be stored contiguously and accessed
|
|
with a linear search or treap. This exploits knowledge of the data,
|
|
cache locality, and a simplified search routine. It also eliminates
|
|
the need to test for dummy entries on each probe. The preconditions
|
|
for this strategy arise in symbol tables and in the builtin dictionary.
|
|
|
|
|
|
Readonly Dictionaries
|
|
---------------------
|
|
Some dictionary use cases pass through a build stage and then move to a
|
|
more heavily exercised lookup stage with no further changes to the
|
|
dictionary.
|
|
|
|
An idea that emerged on python-dev is to be able to convert a dictionary
|
|
to a read-only state. This can help prevent programming errors and also
|
|
provide knowledge that can be exploited for lookup optimization.
|
|
|
|
The dictionary can be immediately rebuilt (eliminating dummy entries),
|
|
resized (to an appropriate level of sparseness), and the keys can be
|
|
jostled (to minimize collisions). The lookdict() routine can then
|
|
eliminate the test for dummy entries (saving about 1/4 of the time
|
|
spend in the collision resolution loop).
|
|
|
|
An additional possibility is to insert links into the empty spaces
|
|
so that dictionary iteration can proceed in len(d) steps instead of
|
|
(mp->mask + 1) steps.
|
|
|
|
|
|
Caching Lookups
|
|
---------------
|
|
The idea is to exploit key access patterns by anticipating future lookups
|
|
based of previous lookups.
|
|
|
|
The simplest incarnation is to save the most recently accessed entry.
|
|
This gives optimal performance for use cases where every get is followed
|
|
by a set or del to the same key.
|