tutorial_tests = """ Let's try a simple generator: >>> def f(): ... yield 1 ... yield 2 >>> for i in f(): ... print i 1 2 >>> g = f() >>> g.next() 1 >>> g.next() 2 "Falling off the end" stops the generator: >>> g.next() Traceback (most recent call last): File "", line 1, in ? File "", line 2, in g StopIteration "return" also stops the generator: >>> def f(): ... yield 1 ... return ... yield 2 # never reached ... >>> g = f() >>> g.next() 1 >>> g.next() Traceback (most recent call last): File "", line 1, in ? File "", line 3, in f StopIteration >>> g.next() # once stopped, can't be resumed Traceback (most recent call last): File "", line 1, in ? StopIteration "raise StopIteration" stops the generator too: >>> def f(): ... yield 1 ... raise StopIteration ... yield 2 # never reached ... >>> g = f() >>> g.next() 1 >>> g.next() Traceback (most recent call last): File "", line 1, in ? StopIteration >>> g.next() Traceback (most recent call last): File "", line 1, in ? StopIteration However, they are not exactly equivalent: >>> def g1(): ... try: ... return ... except: ... yield 1 ... >>> list(g1()) [] >>> def g2(): ... try: ... raise StopIteration ... except: ... yield 42 >>> print list(g2()) [42] This may be surprising at first: >>> def g3(): ... try: ... return ... finally: ... yield 1 ... >>> list(g3()) [1] Let's create an alternate range() function implemented as a generator: >>> def yrange(n): ... for i in range(n): ... yield i ... >>> list(yrange(5)) [0, 1, 2, 3, 4] Generators always return to the most recent caller: >>> def creator(): ... r = yrange(5) ... print "creator", r.next() ... return r ... >>> def caller(): ... r = creator() ... for i in r: ... print "caller", i ... >>> caller() creator 0 caller 1 caller 2 caller 3 caller 4 Generators can call other generators: >>> def zrange(n): ... for i in yrange(n): ... yield i ... >>> list(zrange(5)) [0, 1, 2, 3, 4] """ # The examples from PEP 255. pep_tests = """ Specification: Yield Restriction: A generator cannot be resumed while it is actively running: >>> def g(): ... i = me.next() ... yield i >>> me = g() >>> me.next() Traceback (most recent call last): ... File "", line 2, in g ValueError: generator already executing Specification: Return Note that return isn't always equivalent to raising StopIteration: the difference lies in how enclosing try/except constructs are treated. For example, >>> def f1(): ... try: ... return ... except: ... yield 1 >>> print list(f1()) [] because, as in any function, return simply exits, but >>> def f2(): ... try: ... raise StopIteration ... except: ... yield 42 >>> print list(f2()) [42] because StopIteration is captured by a bare "except", as is any exception. Specification: Generators and Exception Propagation >>> def f(): ... return 1//0 >>> def g(): ... yield f() # the zero division exception propagates ... yield 42 # and we'll never get here >>> k = g() >>> k.next() Traceback (most recent call last): File "", line 1, in ? File "", line 2, in g File "", line 2, in f ZeroDivisionError: integer division or modulo by zero >>> k.next() # and the generator cannot be resumed Traceback (most recent call last): File "", line 1, in ? StopIteration >>> Specification: Try/Except/Finally >>> def f(): ... try: ... yield 1 ... try: ... yield 2 ... 1//0 ... yield 3 # never get here ... except ZeroDivisionError: ... yield 4 ... yield 5 ... raise ... except: ... yield 6 ... yield 7 # the "raise" above stops this ... except: ... yield 8 ... yield 9 ... try: ... x = 12 ... finally: ... yield 10 ... yield 11 >>> print list(f()) [1, 2, 4, 5, 8, 9, 10, 11] >>> Guido's binary tree example. >>> # A binary tree class. >>> class Tree: ... ... def __init__(self, label, left=None, right=None): ... self.label = label ... self.left = left ... self.right = right ... ... def __repr__(self, level=0, indent=" "): ... s = level*indent + repr(self.label) ... if self.left: ... s = s + "\\n" + self.left.__repr__(level+1, indent) ... if self.right: ... s = s + "\\n" + self.right.__repr__(level+1, indent) ... return s ... ... def __iter__(self): ... return inorder(self) >>> # Create a Tree from a list. >>> def tree(list): ... n = len(list) ... if n == 0: ... return [] ... i = n // 2 ... return Tree(list[i], tree(list[:i]), tree(list[i+1:])) >>> # Show it off: create a tree. >>> t = tree("ABCDEFGHIJKLMNOPQRSTUVWXYZ") >>> # A recursive generator that generates Tree labels in in-order. >>> def inorder(t): ... if t: ... for x in inorder(t.left): ... yield x ... yield t.label ... for x in inorder(t.right): ... yield x >>> # Show it off: create a tree. >>> t = tree("ABCDEFGHIJKLMNOPQRSTUVWXYZ") >>> # Print the nodes of the tree in in-order. >>> for x in t: ... print x, A B C D E F G H I J K L M N O P Q R S T U V W X Y Z >>> # A non-recursive generator. >>> def inorder(node): ... stack = [] ... while node: ... while node.left: ... stack.append(node) ... node = node.left ... yield node.label ... while not node.right: ... try: ... node = stack.pop() ... except IndexError: ... return ... yield node.label ... node = node.right >>> # Exercise the non-recursive generator. >>> for x in t: ... print x, A B C D E F G H I J K L M N O P Q R S T U V W X Y Z """ # Examples from Iterator-List and Python-Dev and c.l.py. email_tests = """ The difference between yielding None and returning it. >>> def g(): ... for i in range(3): ... yield None ... yield None ... return >>> list(g()) [None, None, None, None] Ensure that explicitly raising StopIteration acts like any other exception in try/except, not like a return. >>> def g(): ... yield 1 ... try: ... raise StopIteration ... except: ... yield 2 ... yield 3 >>> list(g()) [1, 2, 3] Next one was posted to c.l.py. >>> def gcomb(x, k): ... "Generate all combinations of k elements from list x." ... ... if k > len(x): ... return ... if k == 0: ... yield [] ... else: ... first, rest = x[0], x[1:] ... # A combination does or doesn't contain first. ... # If it does, the remainder is a k-1 comb of rest. ... for c in gcomb(rest, k-1): ... c.insert(0, first) ... yield c ... # If it doesn't contain first, it's a k comb of rest. ... for c in gcomb(rest, k): ... yield c >>> seq = range(1, 5) >>> for k in range(len(seq) + 2): ... print "%d-combs of %s:" % (k, seq) ... for c in gcomb(seq, k): ... print " ", c 0-combs of [1, 2, 3, 4]: [] 1-combs of [1, 2, 3, 4]: [1] [2] [3] [4] 2-combs of [1, 2, 3, 4]: [1, 2] [1, 3] [1, 4] [2, 3] [2, 4] [3, 4] 3-combs of [1, 2, 3, 4]: [1, 2, 3] [1, 2, 4] [1, 3, 4] [2, 3, 4] 4-combs of [1, 2, 3, 4]: [1, 2, 3, 4] 5-combs of [1, 2, 3, 4]: From the Iterators list, about the types of these things. >>> def g(): ... yield 1 ... >>> type(g) >>> i = g() >>> type(i) >>> [s for s in dir(i) if not s.startswith('_')] ['close', 'gi_frame', 'gi_running', 'next', 'send', 'throw'] >>> print i.next.__doc__ x.next() -> the next value, or raise StopIteration >>> iter(i) is i True >>> import types >>> isinstance(i, types.GeneratorType) True And more, added later. >>> i.gi_running 0 >>> type(i.gi_frame) >>> i.gi_running = 42 Traceback (most recent call last): ... TypeError: readonly attribute >>> def g(): ... yield me.gi_running >>> me = g() >>> me.gi_running 0 >>> me.next() 1 >>> me.gi_running 0 A clever union-find implementation from c.l.py, due to David Eppstein. Sent: Friday, June 29, 2001 12:16 PM To: python-list@python.org Subject: Re: PEP 255: Simple Generators >>> class disjointSet: ... def __init__(self, name): ... self.name = name ... self.parent = None ... self.generator = self.generate() ... ... def generate(self): ... while not self.parent: ... yield self ... for x in self.parent.generator: ... yield x ... ... def find(self): ... return self.generator.next() ... ... def union(self, parent): ... if self.parent: ... raise ValueError("Sorry, I'm not a root!") ... self.parent = parent ... ... def __str__(self): ... return self.name >>> names = "ABCDEFGHIJKLM" >>> sets = [disjointSet(name) for name in names] >>> roots = sets[:] >>> import random >>> gen = random.WichmannHill(42) >>> while 1: ... for s in sets: ... print "%s->%s" % (s, s.find()), ... print ... if len(roots) > 1: ... s1 = gen.choice(roots) ... roots.remove(s1) ... s2 = gen.choice(roots) ... s1.union(s2) ... print "merged", s1, "into", s2 ... else: ... break A->A B->B C->C D->D E->E F->F G->G H->H I->I J->J K->K L->L M->M merged D into G A->A B->B C->C D->G E->E F->F G->G H->H I->I J->J K->K L->L M->M merged C into F A->A B->B C->F D->G E->E F->F G->G H->H I->I J->J K->K L->L M->M merged L into A A->A B->B C->F D->G E->E F->F G->G H->H I->I J->J K->K L->A M->M merged H into E A->A B->B C->F D->G E->E F->F G->G H->E I->I J->J K->K L->A M->M merged B into E A->A B->E C->F D->G E->E F->F G->G H->E I->I J->J K->K L->A M->M merged J into G A->A B->E C->F D->G E->E F->F G->G H->E I->I J->G K->K L->A M->M merged E into G A->A B->G C->F D->G E->G F->F G->G H->G I->I J->G K->K L->A M->M merged M into G A->A B->G C->F D->G E->G F->F G->G H->G I->I J->G K->K L->A M->G merged I into K A->A B->G C->F D->G E->G F->F G->G H->G I->K J->G K->K L->A M->G merged K into A A->A B->G C->F D->G E->G F->F G->G H->G I->A J->G K->A L->A M->G merged F into A A->A B->G C->A D->G E->G F->A G->G H->G I->A J->G K->A L->A M->G merged A into G A->G B->G C->G D->G E->G F->G G->G H->G I->G J->G K->G L->G M->G """ # Emacs turd ' # Fun tests (for sufficiently warped notions of "fun"). fun_tests = """ Build up to a recursive Sieve of Eratosthenes generator. >>> def firstn(g, n): ... return [g.next() for i in range(n)] >>> def intsfrom(i): ... while 1: ... yield i ... i += 1 >>> firstn(intsfrom(5), 7) [5, 6, 7, 8, 9, 10, 11] >>> def exclude_multiples(n, ints): ... for i in ints: ... if i % n: ... yield i >>> firstn(exclude_multiples(3, intsfrom(1)), 6) [1, 2, 4, 5, 7, 8] >>> def sieve(ints): ... prime = ints.next() ... yield prime ... not_divisible_by_prime = exclude_multiples(prime, ints) ... for p in sieve(not_divisible_by_prime): ... yield p >>> primes = sieve(intsfrom(2)) >>> firstn(primes, 20) [2, 3, 5, 7, 11, 13, 17, 19, 23, 29, 31, 37, 41, 43, 47, 53, 59, 61, 67, 71] Another famous problem: generate all integers of the form 2**i * 3**j * 5**k in increasing order, where i,j,k >= 0. Trickier than it may look at first! Try writing it without generators, and correctly, and without generating 3 internal results for each result output. >>> def times(n, g): ... for i in g: ... yield n * i >>> firstn(times(10, intsfrom(1)), 10) [10, 20, 30, 40, 50, 60, 70, 80, 90, 100] >>> def merge(g, h): ... ng = g.next() ... nh = h.next() ... while 1: ... if ng < nh: ... yield ng ... ng = g.next() ... elif ng > nh: ... yield nh ... nh = h.next() ... else: ... yield ng ... ng = g.next() ... nh = h.next() The following works, but is doing a whale of a lot of redundant work -- it's not clear how to get the internal uses of m235 to share a single generator. Note that me_times2 (etc) each need to see every element in the result sequence. So this is an example where lazy lists are more natural (you can look at the head of a lazy list any number of times). >>> def m235(): ... yield 1 ... me_times2 = times(2, m235()) ... me_times3 = times(3, m235()) ... me_times5 = times(5, m235()) ... for i in merge(merge(me_times2, ... me_times3), ... me_times5): ... yield i Don't print "too many" of these -- the implementation above is extremely inefficient: each call of m235() leads to 3 recursive calls, and in turn each of those 3 more, and so on, and so on, until we've descended enough levels to satisfy the print stmts. Very odd: when I printed 5 lines of results below, this managed to screw up Win98's malloc in "the usual" way, i.e. the heap grew over 4Mb so Win98 started fragmenting address space, and it *looked* like a very slow leak. >>> result = m235() >>> for i in range(3): ... print firstn(result, 15) [1, 2, 3, 4, 5, 6, 8, 9, 10, 12, 15, 16, 18, 20, 24] [25, 27, 30, 32, 36, 40, 45, 48, 50, 54, 60, 64, 72, 75, 80] [81, 90, 96, 100, 108, 120, 125, 128, 135, 144, 150, 160, 162, 180, 192] Heh. Here's one way to get a shared list, complete with an excruciating namespace renaming trick. The *pretty* part is that the times() and merge() functions can be reused as-is, because they only assume their stream arguments are iterable -- a LazyList is the same as a generator to times(). >>> class LazyList: ... def __init__(self, g): ... self.sofar = [] ... self.fetch = g.next ... ... def __getitem__(self, i): ... sofar, fetch = self.sofar, self.fetch ... while i >= len(sofar): ... sofar.append(fetch()) ... return sofar[i] >>> def m235(): ... yield 1 ... # Gack: m235 below actually refers to a LazyList. ... me_times2 = times(2, m235) ... me_times3 = times(3, m235) ... me_times5 = times(5, m235) ... for i in merge(merge(me_times2, ... me_times3), ... me_times5): ... yield i Print as many of these as you like -- *this* implementation is memory- efficient. >>> m235 = LazyList(m235()) >>> for i in range(5): ... print [m235[j] for j in range(15*i, 15*(i+1))] [1, 2, 3, 4, 5, 6, 8, 9, 10, 12, 15, 16, 18, 20, 24] [25, 27, 30, 32, 36, 40, 45, 48, 50, 54, 60, 64, 72, 75, 80] [81, 90, 96, 100, 108, 120, 125, 128, 135, 144, 150, 160, 162, 180, 192] [200, 216, 225, 240, 243, 250, 256, 270, 288, 300, 320, 324, 360, 375, 384] [400, 405, 432, 450, 480, 486, 500, 512, 540, 576, 600, 625, 640, 648, 675] Ye olde Fibonacci generator, LazyList style. >>> def fibgen(a, b): ... ... def sum(g, h): ... while 1: ... yield g.next() + h.next() ... ... def tail(g): ... g.next() # throw first away ... for x in g: ... yield x ... ... yield a ... yield b ... for s in sum(iter(fib), ... tail(iter(fib))): ... yield s >>> fib = LazyList(fibgen(1, 2)) >>> firstn(iter(fib), 17) [1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, 233, 377, 610, 987, 1597, 2584] Running after your tail with itertools.tee (new in version 2.4) The algorithms "m235" (Hamming) and Fibonacci presented above are both examples of a whole family of FP (functional programming) algorithms where a function produces and returns a list while the production algorithm suppose the list as already produced by recursively calling itself. For these algorithms to work, they must: - produce at least a first element without presupposing the existence of the rest of the list - produce their elements in a lazy manner To work efficiently, the beginning of the list must not be recomputed over and over again. This is ensured in most FP languages as a built-in feature. In python, we have to explicitly maintain a list of already computed results and abandon genuine recursivity. This is what had been attempted above with the LazyList class. One problem with that class is that it keeps a list of all of the generated results and therefore continually grows. This partially defeats the goal of the generator concept, viz. produce the results only as needed instead of producing them all and thereby wasting memory. Thanks to itertools.tee, it is now clear "how to get the internal uses of m235 to share a single generator". >>> from itertools import tee >>> def m235(): ... def _m235(): ... yield 1 ... for n in merge(times(2, m2), ... merge(times(3, m3), ... times(5, m5))): ... yield n ... m1 = _m235() ... m2, m3, m5, mRes = tee(m1, 4) ... return mRes >>> it = m235() >>> for i in range(5): ... print firstn(it, 15) [1, 2, 3, 4, 5, 6, 8, 9, 10, 12, 15, 16, 18, 20, 24] [25, 27, 30, 32, 36, 40, 45, 48, 50, 54, 60, 64, 72, 75, 80] [81, 90, 96, 100, 108, 120, 125, 128, 135, 144, 150, 160, 162, 180, 192] [200, 216, 225, 240, 243, 250, 256, 270, 288, 300, 320, 324, 360, 375, 384] [400, 405, 432, 450, 480, 486, 500, 512, 540, 576, 600, 625, 640, 648, 675] The "tee" function does just what we want. It internally keeps a generated result for as long as it has not been "consumed" from all of the duplicated iterators, whereupon it is deleted. You can therefore print the hamming sequence during hours without increasing memory usage, or very little. The beauty of it is that recursive running-after-their-tail FP algorithms are quite straightforwardly expressed with this Python idiom. Ye olde Fibonacci generator, tee style. >>> def fib(): ... ... def _isum(g, h): ... while 1: ... yield g.next() + h.next() ... ... def _fib(): ... yield 1 ... yield 2 ... fibTail.next() # throw first away ... for res in _isum(fibHead, fibTail): ... yield res ... ... realfib = _fib() ... fibHead, fibTail, fibRes = tee(realfib, 3) ... return fibRes >>> firstn(fib(), 17) [1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, 233, 377, 610, 987, 1597, 2584] """ # syntax_tests mostly provokes SyntaxErrors. Also fiddling with #if 0 # hackery. syntax_tests = """ >>> def f(): #doctest: +IGNORE_EXCEPTION_DETAIL, +NORMALIZE_WHITESPACE ... return 22 ... yield 1 Traceback (most recent call last): .. SyntaxError: 'return' with argument inside generator (, line 3) >>> def f(): #doctest: +IGNORE_EXCEPTION_DETAIL, +NORMALIZE_WHITESPACE ... yield 1 ... return 22 Traceback (most recent call last): .. SyntaxError: 'return' with argument inside generator (, line 3) "return None" is not the same as "return" in a generator: >>> def f(): #doctest: +IGNORE_EXCEPTION_DETAIL, +NORMALIZE_WHITESPACE ... yield 1 ... return None Traceback (most recent call last): .. SyntaxError: 'return' with argument inside generator (, line 3) These are fine: >>> def f(): ... yield 1 ... return >>> def f(): ... try: ... yield 1 ... finally: ... pass >>> def f(): ... try: ... try: ... 1//0 ... except ZeroDivisionError: ... yield 666 ... except: ... pass ... finally: ... pass >>> def f(): ... try: ... try: ... yield 12 ... 1//0 ... except ZeroDivisionError: ... yield 666 ... except: ... try: ... x = 12 ... finally: ... yield 12 ... except: ... return >>> list(f()) [12, 666] >>> def f(): ... yield >>> type(f()) >>> def f(): ... if 0: ... yield >>> type(f()) >>> def f(): ... if 0: ... yield 1 >>> type(f()) >>> def f(): ... if "": ... yield None >>> type(f()) >>> def f(): ... return ... try: ... if x==4: ... pass ... elif 0: ... try: ... 1//0 ... except SyntaxError: ... pass ... else: ... if 0: ... while 12: ... x += 1 ... yield 2 # don't blink ... f(a, b, c, d, e) ... else: ... pass ... except: ... x = 1 ... return >>> type(f()) >>> def f(): ... if 0: ... def g(): ... yield 1 ... >>> type(f()) >>> def f(): ... if 0: ... class C: ... def __init__(self): ... yield 1 ... def f(self): ... yield 2 >>> type(f()) >>> def f(): ... if 0: ... return ... if 0: ... yield 2 >>> type(f()) >>> def f(): #doctest: +IGNORE_EXCEPTION_DETAIL, +NORMALIZE_WHITESPACE ... if 0: ... lambda x: x # shouldn't trigger here ... return # or here ... def f(i): ... return 2*i # or here ... if 0: ... return 3 # but *this* sucks (line 8) ... if 0: ... yield 2 # because it's a generator (line 10) Traceback (most recent call last): SyntaxError: 'return' with argument inside generator (, line 10) This one caused a crash (see SF bug 567538): >>> def f(): ... for i in range(3): ... try: ... continue ... finally: ... yield i ... >>> g = f() >>> print g.next() 0 >>> print g.next() 1 >>> print g.next() 2 >>> print g.next() Traceback (most recent call last): StopIteration """ # conjoin is a simple backtracking generator, named in honor of Icon's # "conjunction" control structure. Pass a list of no-argument functions # that return iterable objects. Easiest to explain by example: assume the # function list [x, y, z] is passed. Then conjoin acts like: # # def g(): # values = [None] * 3 # for values[0] in x(): # for values[1] in y(): # for values[2] in z(): # yield values # # So some 3-lists of values *may* be generated, each time we successfully # get into the innermost loop. If an iterator fails (is exhausted) before # then, it "backtracks" to get the next value from the nearest enclosing # iterator (the one "to the left"), and starts all over again at the next # slot (pumps a fresh iterator). Of course this is most useful when the # iterators have side-effects, so that which values *can* be generated at # each slot depend on the values iterated at previous slots. def conjoin(gs): values = [None] * len(gs) def gen(i, values=values): if i >= len(gs): yield values else: for values[i] in gs[i](): for x in gen(i+1): yield x for x in gen(0): yield x # That works fine, but recursing a level and checking i against len(gs) for # each item produced is inefficient. By doing manual loop unrolling across # generator boundaries, it's possible to eliminate most of that overhead. # This isn't worth the bother *in general* for generators, but conjoin() is # a core building block for some CPU-intensive generator applications. def conjoin(gs): n = len(gs) values = [None] * n # Do one loop nest at time recursively, until the # of loop nests # remaining is divisible by 3. def gen(i, values=values): if i >= n: yield values elif (n-i) % 3: ip1 = i+1 for values[i] in gs[i](): for x in gen(ip1): yield x else: for x in _gen3(i): yield x # Do three loop nests at a time, recursing only if at least three more # remain. Don't call directly: this is an internal optimization for # gen's use. def _gen3(i, values=values): assert i < n and (n-i) % 3 == 0 ip1, ip2, ip3 = i+1, i+2, i+3 g, g1, g2 = gs[i : ip3] if ip3 >= n: # These are the last three, so we can yield values directly. for values[i] in g(): for values[ip1] in g1(): for values[ip2] in g2(): yield values else: # At least 6 loop nests remain; peel off 3 and recurse for the # rest. for values[i] in g(): for values[ip1] in g1(): for values[ip2] in g2(): for x in _gen3(ip3): yield x for x in gen(0): yield x # And one more approach: For backtracking apps like the Knight's Tour # solver below, the number of backtracking levels can be enormous (one # level per square, for the Knight's Tour, so that e.g. a 100x100 board # needs 10,000 levels). In such cases Python is likely to run out of # stack space due to recursion. So here's a recursion-free version of # conjoin too. # NOTE WELL: This allows large problems to be solved with only trivial # demands on stack space. Without explicitly resumable generators, this is # much harder to achieve. OTOH, this is much slower (up to a factor of 2) # than the fancy unrolled recursive conjoin. def flat_conjoin(gs): # rename to conjoin to run tests with this instead n = len(gs) values = [None] * n iters = [None] * n _StopIteration = StopIteration # make local because caught a *lot* i = 0 while 1: # Descend. try: while i < n: it = iters[i] = gs[i]().next values[i] = it() i += 1 except _StopIteration: pass else: assert i == n yield values # Backtrack until an older iterator can be resumed. i -= 1 while i >= 0: try: values[i] = iters[i]() # Success! Start fresh at next level. i += 1 break except _StopIteration: # Continue backtracking. i -= 1 else: assert i < 0 break # A conjoin-based N-Queens solver. class Queens: def __init__(self, n): self.n = n rangen = range(n) # Assign a unique int to each column and diagonal. # columns: n of those, range(n). # NW-SE diagonals: 2n-1 of these, i-j unique and invariant along # each, smallest i-j is 0-(n-1) = 1-n, so add n-1 to shift to 0- # based. # NE-SW diagonals: 2n-1 of these, i+j unique and invariant along # each, smallest i+j is 0, largest is 2n-2. # For each square, compute a bit vector of the columns and # diagonals it covers, and for each row compute a function that # generates the possiblities for the columns in that row. self.rowgenerators = [] for i in rangen: rowuses = [(1L << j) | # column ordinal (1L << (n + i-j + n-1)) | # NW-SE ordinal (1L << (n + 2*n-1 + i+j)) # NE-SW ordinal for j in rangen] def rowgen(rowuses=rowuses): for j in rangen: uses = rowuses[j] if uses & self.used == 0: self.used |= uses yield j self.used &= ~uses self.rowgenerators.append(rowgen) # Generate solutions. def solve(self): self.used = 0 for row2col in conjoin(self.rowgenerators): yield row2col def printsolution(self, row2col): n = self.n assert n == len(row2col) sep = "+" + "-+" * n print sep for i in range(n): squares = [" " for j in range(n)] squares[row2col[i]] = "Q" print "|" + "|".join(squares) + "|" print sep # A conjoin-based Knight's Tour solver. This is pretty sophisticated # (e.g., when used with flat_conjoin above, and passing hard=1 to the # constructor, a 200x200 Knight's Tour was found quickly -- note that we're # creating 10s of thousands of generators then!), and is lengthy. class Knights: def __init__(self, m, n, hard=0): self.m, self.n = m, n # solve() will set up succs[i] to be a list of square #i's # successors. succs = self.succs = [] # Remove i0 from each of its successor's successor lists, i.e. # successors can't go back to i0 again. Return 0 if we can # detect this makes a solution impossible, else return 1. def remove_from_successors(i0, len=len): # If we remove all exits from a free square, we're dead: # even if we move to it next, we can't leave it again. # If we create a square with one exit, we must visit it next; # else somebody else will have to visit it, and since there's # only one adjacent, there won't be a way to leave it again. # Finelly, if we create more than one free square with a # single exit, we can only move to one of them next, leaving # the other one a dead end. ne0 = ne1 = 0 for i in succs[i0]: s = succs[i] s.remove(i0) e = len(s) if e == 0: ne0 += 1 elif e == 1: ne1 += 1 return ne0 == 0 and ne1 < 2 # Put i0 back in each of its successor's successor lists. def add_to_successors(i0): for i in succs[i0]: succs[i].append(i0) # Generate the first move. def first(): if m < 1 or n < 1: return # Since we're looking for a cycle, it doesn't matter where we # start. Starting in a corner makes the 2nd move easy. corner = self.coords2index(0, 0) remove_from_successors(corner) self.lastij = corner yield corner add_to_successors(corner) # Generate the second moves. def second(): corner = self.coords2index(0, 0) assert self.lastij == corner # i.e., we started in the corner if m < 3 or n < 3: return assert len(succs[corner]) == 2 assert self.coords2index(1, 2) in succs[corner] assert self.coords2index(2, 1) in succs[corner] # Only two choices. Whichever we pick, the other must be the # square picked on move m*n, as it's the only way to get back # to (0, 0). Save its index in self.final so that moves before # the last know it must be kept free. for i, j in (1, 2), (2, 1): this = self.coords2index(i, j) final = self.coords2index(3-i, 3-j) self.final = final remove_from_successors(this) succs[final].append(corner) self.lastij = this yield this succs[final].remove(corner) add_to_successors(this) # Generate moves 3 thru m*n-1. def advance(len=len): # If some successor has only one exit, must take it. # Else favor successors with fewer exits. candidates = [] for i in succs[self.lastij]: e = len(succs[i]) assert e > 0, "else remove_from_successors() pruning flawed" if e == 1: candidates = [(e, i)] break candidates.append((e, i)) else: candidates.sort() for e, i in candidates: if i != self.final: if remove_from_successors(i): self.lastij = i yield i add_to_successors(i) # Generate moves 3 thru m*n-1. Alternative version using a # stronger (but more expensive) heuristic to order successors. # Since the # of backtracking levels is m*n, a poor move early on # can take eons to undo. Smallest square board for which this # matters a lot is 52x52. def advance_hard(vmid=(m-1)/2.0, hmid=(n-1)/2.0, len=len): # If some successor has only one exit, must take it. # Else favor successors with fewer exits. # Break ties via max distance from board centerpoint (favor # corners and edges whenever possible). candidates = [] for i in succs[self.lastij]: e = len(succs[i]) assert e > 0, "else remove_from_successors() pruning flawed" if e == 1: candidates = [(e, 0, i)] break i1, j1 = self.index2coords(i) d = (i1 - vmid)**2 + (j1 - hmid)**2 candidates.append((e, -d, i)) else: candidates.sort() for e, d, i in candidates: if i != self.final: if remove_from_successors(i): self.lastij = i yield i add_to_successors(i) # Generate the last move. def last(): assert self.final in succs[self.lastij] yield self.final if m*n < 4: self.squaregenerators = [first] else: self.squaregenerators = [first, second] + \ [hard and advance_hard or advance] * (m*n - 3) + \ [last] def coords2index(self, i, j): assert 0 <= i < self.m assert 0 <= j < self.n return i * self.n + j def index2coords(self, index): assert 0 <= index < self.m * self.n return divmod(index, self.n) def _init_board(self): succs = self.succs del succs[:] m, n = self.m, self.n c2i = self.coords2index offsets = [( 1, 2), ( 2, 1), ( 2, -1), ( 1, -2), (-1, -2), (-2, -1), (-2, 1), (-1, 2)] rangen = range(n) for i in range(m): for j in rangen: s = [c2i(i+io, j+jo) for io, jo in offsets if 0 <= i+io < m and 0 <= j+jo < n] succs.append(s) # Generate solutions. def solve(self): self._init_board() for x in conjoin(self.squaregenerators): yield x def printsolution(self, x): m, n = self.m, self.n assert len(x) == m*n w = len(str(m*n)) format = "%" + str(w) + "d" squares = [[None] * n for i in range(m)] k = 1 for i in x: i1, j1 = self.index2coords(i) squares[i1][j1] = format % k k += 1 sep = "+" + ("-" * w + "+") * n print sep for i in range(m): row = squares[i] print "|" + "|".join(row) + "|" print sep conjoin_tests = """ Generate the 3-bit binary numbers in order. This illustrates dumbest- possible use of conjoin, just to generate the full cross-product. >>> for c in conjoin([lambda: iter((0, 1))] * 3): ... print c [0, 0, 0] [0, 0, 1] [0, 1, 0] [0, 1, 1] [1, 0, 0] [1, 0, 1] [1, 1, 0] [1, 1, 1] For efficiency in typical backtracking apps, conjoin() yields the same list object each time. So if you want to save away a full account of its generated sequence, you need to copy its results. >>> def gencopy(iterator): ... for x in iterator: ... yield x[:] >>> for n in range(10): ... all = list(gencopy(conjoin([lambda: iter((0, 1))] * n))) ... print n, len(all), all[0] == [0] * n, all[-1] == [1] * n 0 1 True True 1 2 True True 2 4 True True 3 8 True True 4 16 True True 5 32 True True 6 64 True True 7 128 True True 8 256 True True 9 512 True True And run an 8-queens solver. >>> q = Queens(8) >>> LIMIT = 2 >>> count = 0 >>> for row2col in q.solve(): ... count += 1 ... if count <= LIMIT: ... print "Solution", count ... q.printsolution(row2col) Solution 1 +-+-+-+-+-+-+-+-+ |Q| | | | | | | | +-+-+-+-+-+-+-+-+ | | | | |Q| | | | +-+-+-+-+-+-+-+-+ | | | | | | | |Q| +-+-+-+-+-+-+-+-+ | | | | | |Q| | | +-+-+-+-+-+-+-+-+ | | |Q| | | | | | +-+-+-+-+-+-+-+-+ | | | | | | |Q| | +-+-+-+-+-+-+-+-+ | |Q| | | | | | | +-+-+-+-+-+-+-+-+ | | | |Q| | | | | +-+-+-+-+-+-+-+-+ Solution 2 +-+-+-+-+-+-+-+-+ |Q| | | | | | | | +-+-+-+-+-+-+-+-+ | | | | | |Q| | | +-+-+-+-+-+-+-+-+ | | | | | | | |Q| +-+-+-+-+-+-+-+-+ | | |Q| | | | | | +-+-+-+-+-+-+-+-+ | | | | | | |Q| | +-+-+-+-+-+-+-+-+ | | | |Q| | | | | +-+-+-+-+-+-+-+-+ | |Q| | | | | | | +-+-+-+-+-+-+-+-+ | | | | |Q| | | | +-+-+-+-+-+-+-+-+ >>> print count, "solutions in all." 92 solutions in all. And run a Knight's Tour on a 10x10 board. Note that there are about 20,000 solutions even on a 6x6 board, so don't dare run this to exhaustion. >>> k = Knights(10, 10) >>> LIMIT = 2 >>> count = 0 >>> for x in k.solve(): ... count += 1 ... if count <= LIMIT: ... print "Solution", count ... k.printsolution(x) ... else: ... break Solution 1 +---+---+---+---+---+---+---+---+---+---+ | 1| 58| 27| 34| 3| 40| 29| 10| 5| 8| +---+---+---+---+---+---+---+---+---+---+ | 26| 35| 2| 57| 28| 33| 4| 7| 30| 11| +---+---+---+---+---+---+---+---+---+---+ | 59|100| 73| 36| 41| 56| 39| 32| 9| 6| +---+---+---+---+---+---+---+---+---+---+ | 74| 25| 60| 55| 72| 37| 42| 49| 12| 31| +---+---+---+---+---+---+---+---+---+---+ | 61| 86| 99| 76| 63| 52| 47| 38| 43| 50| +---+---+---+---+---+---+---+---+---+---+ | 24| 75| 62| 85| 54| 71| 64| 51| 48| 13| +---+---+---+---+---+---+---+---+---+---+ | 87| 98| 91| 80| 77| 84| 53| 46| 65| 44| +---+---+---+---+---+---+---+---+---+---+ | 90| 23| 88| 95| 70| 79| 68| 83| 14| 17| +---+---+---+---+---+---+---+---+---+---+ | 97| 92| 21| 78| 81| 94| 19| 16| 45| 66| +---+---+---+---+---+---+---+---+---+---+ | 22| 89| 96| 93| 20| 69| 82| 67| 18| 15| +---+---+---+---+---+---+---+---+---+---+ Solution 2 +---+---+---+---+---+---+---+---+---+---+ | 1| 58| 27| 34| 3| 40| 29| 10| 5| 8| +---+---+---+---+---+---+---+---+---+---+ | 26| 35| 2| 57| 28| 33| 4| 7| 30| 11| +---+---+---+---+---+---+---+---+---+---+ | 59|100| 73| 36| 41| 56| 39| 32| 9| 6| +---+---+---+---+---+---+---+---+---+---+ | 74| 25| 60| 55| 72| 37| 42| 49| 12| 31| +---+---+---+---+---+---+---+---+---+---+ | 61| 86| 99| 76| 63| 52| 47| 38| 43| 50| +---+---+---+---+---+---+---+---+---+---+ | 24| 75| 62| 85| 54| 71| 64| 51| 48| 13| +---+---+---+---+---+---+---+---+---+---+ | 87| 98| 89| 80| 77| 84| 53| 46| 65| 44| +---+---+---+---+---+---+---+---+---+---+ | 90| 23| 92| 95| 70| 79| 68| 83| 14| 17| +---+---+---+---+---+---+---+---+---+---+ | 97| 88| 21| 78| 81| 94| 19| 16| 45| 66| +---+---+---+---+---+---+---+---+---+---+ | 22| 91| 96| 93| 20| 69| 82| 67| 18| 15| +---+---+---+---+---+---+---+---+---+---+ """ weakref_tests = """\ Generators are weakly referencable: >>> import weakref >>> def gen(): ... yield 'foo!' ... >>> wr = weakref.ref(gen) >>> wr() is gen True >>> p = weakref.proxy(gen) Generator-iterators are weakly referencable as well: >>> gi = gen() >>> wr = weakref.ref(gi) >>> wr() is gi True >>> p = weakref.proxy(gi) >>> list(p) ['foo!'] """ coroutine_tests = """\ Sending a value into a started generator: >>> def f(): ... print (yield 1) ... yield 2 >>> g = f() >>> g.next() 1 >>> g.send(42) 42 2 Sending a value into a new generator produces a TypeError: >>> f().send("foo") Traceback (most recent call last): ... TypeError: can't send non-None value to a just-started generator Yield by itself yields None: >>> def f(): yield >>> list(f()) [None] An obscene abuse of a yield expression within a generator expression: >>> list((yield 21) for i in range(4)) [21, None, 21, None, 21, None, 21, None] And a more sane, but still weird usage: >>> def f(): list(i for i in [(yield 26)]) >>> type(f()) A yield expression with augmented assignment. >>> def coroutine(seq): ... count = 0 ... while count < 200: ... count += yield ... seq.append(count) >>> seq = [] >>> c = coroutine(seq) >>> c.next() >>> print seq [] >>> c.send(10) >>> print seq [10] >>> c.send(10) >>> print seq [10, 20] >>> c.send(10) >>> print seq [10, 20, 30] Check some syntax errors for yield expressions: >>> f=lambda: (yield 1),(yield 2) #doctest: +IGNORE_EXCEPTION_DETAIL, +NORMALIZE_WHITESPACE Traceback (most recent call last): ... SyntaxError: 'yield' outside function (, line 1) >>> def f(): return lambda x=(yield): 1 #doctest: +IGNORE_EXCEPTION_DETAIL, +NORMALIZE_WHITESPACE Traceback (most recent call last): ... SyntaxError: 'return' with argument inside generator (, line 1) >>> def f(): x = yield = y #doctest: +IGNORE_EXCEPTION_DETAIL, +NORMALIZE_WHITESPACE Traceback (most recent call last): ... SyntaxError: assignment to yield expression not possible (, line 1) >>> def f(): (yield bar) = y #doctest: +IGNORE_EXCEPTION_DETAIL Traceback (most recent call last): ... SyntaxError: can't assign to yield expression (, line 1) >>> def f(): (yield bar) += y #doctest: +IGNORE_EXCEPTION_DETAIL Traceback (most recent call last): ... SyntaxError: augmented assignment to yield expression not possible (, line 1) Now check some throw() conditions: >>> def f(): ... while True: ... try: ... print (yield) ... except ValueError,v: ... print "caught ValueError (%s)" % (v), >>> import sys >>> g = f() >>> g.next() >>> g.throw(ValueError) # type only caught ValueError () >>> g.throw(ValueError("xyz")) # value only caught ValueError (xyz) >>> g.throw(ValueError, ValueError(1)) # value+matching type caught ValueError (1) >>> g.throw(ValueError, TypeError(1)) # mismatched type, rewrapped caught ValueError (1) >>> g.throw(ValueError, ValueError(1), None) # explicit None traceback caught ValueError (1) >>> g.throw(ValueError(1), "foo") # bad args Traceback (most recent call last): ... TypeError: instance exception may not have a separate value >>> g.throw(ValueError, "foo", 23) # bad args #doctest: +IGNORE_EXCEPTION_DETAIL Traceback (most recent call last): ... TypeError: throw() third argument must be a traceback object >>> def throw(g,exc): ... try: ... raise exc ... except: ... g.throw(*sys.exc_info()) >>> throw(g,ValueError) # do it with traceback included caught ValueError () >>> g.send(1) 1 >>> throw(g,TypeError) # terminate the generator Traceback (most recent call last): ... TypeError >>> print g.gi_frame None >>> g.send(2) Traceback (most recent call last): ... StopIteration >>> g.throw(ValueError,6) # throw on closed generator Traceback (most recent call last): ... ValueError: 6 >>> f().throw(ValueError,7) # throw on just-opened generator Traceback (most recent call last): ... ValueError: 7 >>> f().throw("abc") # throw on just-opened generator Traceback (most recent call last): ... abc Now let's try closing a generator: >>> def f(): ... try: yield ... except GeneratorExit: ... print "exiting" >>> g = f() >>> g.next() >>> g.close() exiting >>> g.close() # should be no-op now >>> f().close() # close on just-opened generator should be fine >>> def f(): yield # an even simpler generator >>> f().close() # close before opening >>> g = f() >>> g.next() >>> g.close() # close normally And finalization. But we have to force the timing of GC here, since we are running on Jython: >>> def f(): ... try: yield ... finally: ... print "exiting" >>> g = f() >>> g.next() >>> del g; extra_collect() exiting Now let's try some ill-behaved generators: >>> def f(): ... try: yield ... except GeneratorExit: ... yield "foo!" >>> g = f() >>> g.next() >>> g.close() Traceback (most recent call last): ... RuntimeError: generator ignored GeneratorExit >>> g.close() Our ill-behaved code should be invoked during GC: >>> import sys, StringIO >>> old, sys.stderr = sys.stderr, StringIO.StringIO() >>> g = f() >>> g.next() >>> del g; extra_collect() >>> sys.stderr.getvalue().startswith( ... "Exception RuntimeError" ... ) True >>> sys.stderr = old And errors thrown during closing should propagate: >>> def f(): ... try: yield ... except GeneratorExit: ... raise TypeError("fie!") >>> g = f() >>> g.next() >>> g.close() Traceback (most recent call last): ... TypeError: fie! Ensure that various yield expression constructs make their enclosing function a generator: >>> def f(): x += yield >>> type(f()) >>> def f(): x = yield >>> type(f()) >>> def f(): lambda x=(yield): 1 >>> type(f()) >>> def f(): x=(i for i in (yield) if (yield)) >>> type(f()) >>> def f(d): d[(yield "a")] = d[(yield "b")] = 27 >>> data = [1,2] >>> g = f(data) >>> type(g) >>> g.send(None) 'a' >>> data [1, 2] >>> g.send(0) 'b' >>> data [27, 2] >>> try: g.send(1) ... except StopIteration: pass >>> data [27, 27] """ refleaks_tests = """ Prior to adding cycle-GC support to itertools.tee, this code would leak references. We add it to the standard suite so the routine refleak-tests would trigger if it starts being uncleanable again. >>> import itertools >>> def leak(): ... class gen: ... def __iter__(self): ... return self ... def next(self): ... return self.item ... g = gen() ... head, tail = itertools.tee(g) ... g.item = head ... return head >>> it = leak() Make sure to also test the involvement of the tee-internal teedataobject, which stores returned items. >>> item = it.next() This test leaked at one point due to generator finalization/destruction. It was copied from Lib/test/leakers/test_generator_cycle.py before the file was removed. >>> def leak(): ... def gen(): ... while True: ... yield g ... g = gen() >>> leak() This test isn't really generator related, but rather exception-in-cleanup related. The coroutine tests (above) just happen to cause an exception in the generator's __del__ (tp_del) method. We can also test for this explicitly, without generators. We do have to redirect stderr to avoid printing warnings and to doublecheck that we actually tested what we wanted to test. >>> import sys, StringIO >>> from time import sleep >>> old = sys.stderr >>> try: ... sys.stderr = StringIO.StringIO() ... class Leaker: ... def __del__(self): ... raise RuntimeError ... ... l = Leaker() ... del l; extra_collect() ... err = sys.stderr.getvalue().strip() ... err.startswith( ... "Exception RuntimeError in <" ... ) ... err.endswith("> ignored") ... len(err.splitlines()) ... finally: ... sys.stderr = old True True 1 These refleak tests should perhaps be in a testfile of their own, test_generators just happened to be the test that drew these out. """ __test__ = {"tut": tutorial_tests, "pep": pep_tests, "email": email_tests, "fun": fun_tests, "syntax": syntax_tests, "conjoin": conjoin_tests, "weakref": weakref_tests, "coroutine": coroutine_tests, "refleaks": refleaks_tests, } # Magic test name that regrtest.py invokes *after* importing this module. # This worms around a bootstrap problem. # Note that doctest and regrtest both look in sys.argv for a "-v" argument, # so this works as expected in both ways of running regrtest. def test_main(verbose=None): from test import test_support, test_generators test_support.run_doctest(test_generators, verbose) def extra_collect(): import gc from time import sleep gc.collect(); sleep(1); gc.collect(); sleep(0.1); gc.collect() # This part isn't needed for regrtest, but for running the test directly. if __name__ == "__main__": test_main(1)