ancestor.py
86 lines
| 2.4 KiB
| text/x-python
|
PythonLexer
/ mercurial / ancestor.py
Matt Mackall
|
r3135 | # ancestor.py - generic DAG ancestor algorithm for mercurial | ||
# | ||||
# Copyright 2006 Matt Mackall <mpm@selenic.com> | ||||
# | ||||
Martin Geisler
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r8225 | # This software may be used and distributed according to the terms of the | ||
Matt Mackall
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r10263 | # GNU General Public License version 2 or any later version. | ||
Matt Mackall
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r3135 | |||
import heapq | ||||
def ancestor(a, b, pfunc): | ||||
""" | ||||
Sune Foldager
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r9915 | return a minimal-distance ancestor of nodes a and b, or None if there is no | ||
such ancestor. Note that there can be several ancestors with the same | ||||
(minimal) distance, and the one returned is arbitrary. | ||||
Matt Mackall
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r3135 | |||
Sune Foldager
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r9915 | pfunc must return a list of parent vertices for a given vertex | ||
Matt Mackall
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r3135 | """ | ||
if a == b: | ||||
return a | ||||
# find depth from root of all ancestors | ||||
Nicolas Dumazet
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r7882 | parentcache = {} | ||
Matt Mackall
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r3135 | visit = [a, b] | ||
depth = {} | ||||
while visit: | ||||
vertex = visit[-1] | ||||
pl = pfunc(vertex) | ||||
Nicolas Dumazet
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r7882 | parentcache[vertex] = pl | ||
Matt Mackall
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r3135 | if not pl: | ||
depth[vertex] = 0 | ||||
visit.pop() | ||||
else: | ||||
for p in pl: | ||||
if p == a or p == b: # did we find a or b as a parent? | ||||
return p # we're done | ||||
if p not in depth: | ||||
visit.append(p) | ||||
if visit[-1] == vertex: | ||||
depth[vertex] = min([depth[p] for p in pl]) - 1 | ||||
visit.pop() | ||||
# traverse ancestors in order of decreasing distance from root | ||||
def ancestors(vertex): | ||||
h = [(depth[vertex], vertex)] | ||||
Benoit Boissinot
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r8465 | seen = set() | ||
Matt Mackall
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r3135 | while h: | ||
d, n = heapq.heappop(h) | ||||
if n not in seen: | ||||
Benoit Boissinot
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r8465 | seen.add(n) | ||
Matt Mackall
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r3135 | yield (d, n) | ||
Nicolas Dumazet
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r7882 | for p in parentcache[n]: | ||
Matt Mackall
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r3135 | heapq.heappush(h, (depth[p], p)) | ||
def generations(vertex): | ||||
Benoit Boissinot
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r8465 | sg, s = None, set() | ||
Thomas Arendsen Hein
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r3673 | for g, v in ancestors(vertex): | ||
Matt Mackall
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r3135 | if g != sg: | ||
if sg: | ||||
yield sg, s | ||||
Benoit Boissinot
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r8465 | sg, s = g, set((v,)) | ||
Matt Mackall
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r3135 | else: | ||
Benoit Boissinot
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r8465 | s.add(v) | ||
Matt Mackall
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r3135 | yield sg, s | ||
x = generations(a) | ||||
y = generations(b) | ||||
gx = x.next() | ||||
gy = y.next() | ||||
# increment each ancestor list until it is closer to root than | ||||
# the other, or they match | ||||
try: | ||||
while 1: | ||||
if gx[0] == gy[0]: | ||||
for v in gx[1]: | ||||
if v in gy[1]: | ||||
return v | ||||
gy = y.next() | ||||
gx = x.next() | ||||
elif gx[0] > gy[0]: | ||||
gy = y.next() | ||||
else: | ||||
gx = x.next() | ||||
except StopIteration: | ||||
return None | ||||