Mercurial > hg
view mercurial/ancestor.py @ 6395:3f0294536b24
fix const annotation warning
author | Benoit Boissinot <benoit.boissinot@ens-lyon.org> |
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date | Fri, 28 Mar 2008 19:47:22 +0100 |
parents | fda369b5779c |
children | 6b704ef9ed06 |
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# ancestor.py - generic DAG ancestor algorithm for mercurial # # Copyright 2006 Matt Mackall <mpm@selenic.com> # # This software may be used and distributed according to the terms # of the GNU General Public License, incorporated herein by reference. import heapq def ancestor(a, b, pfunc): """ return the least common ancestor of nodes a and b or None if there is no such ancestor. pfunc must return a list of parent vertices """ if a == b: return a # find depth from root of all ancestors visit = [a, b] depth = {} while visit: vertex = visit[-1] pl = pfunc(vertex) 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)] seen = {} while h: d, n = heapq.heappop(h) if n not in seen: seen[n] = 1 yield (d, n) for p in pfunc(n): heapq.heappush(h, (depth[p], p)) def generations(vertex): sg, s = None, {} for g, v in ancestors(vertex): if g != sg: if sg: yield sg, s sg, s = g, {v:1} else: s[v] = 1 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 def symmetricdifference(a, b, pfunc): """symmetric difference of the sets of ancestors of a and b I.e. revisions that are ancestors of a or b, but not both. """ # basic idea: # - mark a and b with different colors # - walk the graph in topological order with the help of a heap; # for each revision r: # - if r has only one color, we want to return it # - add colors[r] to its parents # # We keep track of the number of revisions in the heap that # we may be interested in. We stop walking the graph as soon # as this number reaches 0. if a == b: return [a] WHITE = 1 BLACK = 2 ALLCOLORS = WHITE | BLACK colors = {a: WHITE, b: BLACK} visit = [-a, -b] heapq.heapify(visit) n_wanted = len(visit) ret = [] while n_wanted: r = -heapq.heappop(visit) wanted = colors[r] != ALLCOLORS n_wanted -= wanted if wanted: ret.append(r) for p in pfunc(r): if p not in colors: # first time we see p; add it to visit n_wanted += wanted colors[p] = colors[r] heapq.heappush(visit, -p) elif colors[p] != ALLCOLORS and colors[p] != colors[r]: # at first we thought we wanted p, but now # we know we don't really want it n_wanted -= 1 colors[p] |= colors[r] del colors[r] return ret