# -*- coding: utf-8 -*- # This Source Code Form is subject to the terms of the Mozilla Public # License, v. 2.0. If a copy of the MPL was not distributed with this # file, You can obtain one at http://mozilla.org/MPL/2.0/. from __future__ import absolute_import, print_function, unicode_literals import unittest from ..graph import Graph from mozunit import main class TestGraph(unittest.TestCase): tree = Graph(set(['a', 'b', 'c', 'd', 'e', 'f', 'g']), { ('a', 'b', 'L'), ('a', 'c', 'L'), ('b', 'd', 'K'), ('b', 'e', 'K'), ('c', 'f', 'N'), ('c', 'g', 'N'), }) linear = Graph(set(['1', '2', '3', '4']), { ('1', '2', 'L'), ('2', '3', 'L'), ('3', '4', 'L'), }) diamonds = Graph(set(['A', 'B', 'C', 'D', 'E', 'F', 'G', 'H', 'I', 'J']), set(tuple(x) for x in 'AFL ADL BDL BEL CEL CHL DFL DGL EGL EHL FIL GIL GJL HJL'.split() )) multi_edges = Graph(set(['1', '2', '3', '4']), { ('2', '1', 'red'), ('2', '1', 'blue'), ('3', '1', 'red'), ('3', '2', 'blue'), ('3', '2', 'green'), ('4', '3', 'green'), }) disjoint = Graph(set(['1', '2', '3', '4', 'α', 'β', 'γ']), { ('2', '1', 'red'), ('3', '1', 'red'), ('3', '2', 'green'), ('4', '3', 'green'), ('α', 'β', 'πράσινο'), ('β', 'γ', 'κόκκινο'), ('α', 'γ', 'μπλε'), }) def test_transitive_closure_empty(self): "transitive closure of an empty set is an empty graph" g = Graph(set(['a', 'b', 'c']), {('a', 'b', 'L'), ('a', 'c', 'L')}) self.assertEqual(g.transitive_closure(set()), Graph(set(), set())) def test_transitive_closure_disjoint(self): "transitive closure of a disjoint set is a subset" g = Graph(set(['a', 'b', 'c']), set()) self.assertEqual(g.transitive_closure(set(['a', 'c'])), Graph(set(['a', 'c']), set())) def test_transitive_closure_trees(self): "transitive closure of a tree, at two non-root nodes, is the two subtrees" self.assertEqual(self.tree.transitive_closure(set(['b', 'c'])), Graph(set(['b', 'c', 'd', 'e', 'f', 'g']), { ('b', 'd', 'K'), ('b', 'e', 'K'), ('c', 'f', 'N'), ('c', 'g', 'N'), })) def test_transitive_closure_multi_edges(self): "transitive closure of a tree with multiple edges between nodes keeps those edges" self.assertEqual(self.multi_edges.transitive_closure(set(['3'])), Graph(set(['1', '2', '3']), { ('2', '1', 'red'), ('2', '1', 'blue'), ('3', '1', 'red'), ('3', '2', 'blue'), ('3', '2', 'green'), })) def test_transitive_closure_disjoint_edges(self): "transitive closure of a disjoint graph keeps those edges" self.assertEqual(self.disjoint.transitive_closure(set(['3', 'β'])), Graph(set(['1', '2', '3', 'β', 'γ']), { ('2', '1', 'red'), ('3', '1', 'red'), ('3', '2', 'green'), ('β', 'γ', 'κόκκινο'), })) def test_transitive_closure_linear(self): "transitive closure of a linear graph includes all nodes in the line" self.assertEqual(self.linear.transitive_closure(set(['1'])), self.linear) def test_visit_postorder_empty(self): "postorder visit of an empty graph is empty" self.assertEqual(list(Graph(set(), set()).visit_postorder()), []) def assert_postorder(self, seq, all_nodes): seen = set() for e in seq: for l, r, n in self.tree.edges: if l == e: self.failUnless(r in seen) seen.add(e) self.assertEqual(seen, all_nodes) def test_visit_postorder_tree(self): "postorder visit of a tree satisfies invariant" self.assert_postorder(self.tree.visit_postorder(), self.tree.nodes) def test_visit_postorder_diamonds(self): "postorder visit of a graph full of diamonds satisfies invariant" self.assert_postorder(self.diamonds.visit_postorder(), self.diamonds.nodes) def test_visit_postorder_multi_edges(self): "postorder visit of a graph with duplicate edges satisfies invariant" self.assert_postorder(self.multi_edges.visit_postorder(), self.multi_edges.nodes) def test_visit_postorder_disjoint(self): "postorder visit of a disjoint graph satisfies invariant" self.assert_postorder(self.disjoint.visit_postorder(), self.disjoint.nodes) def test_links_dict(self): "link dict for a graph with multiple edges is correct" self.assertEqual(self.multi_edges.links_dict(), { '2': set(['1']), '3': set(['1', '2']), '4': set(['3']), }) def test_named_links_dict(self): "named link dict for a graph with multiple edges is correct" self.assertEqual(self.multi_edges.named_links_dict(), { '2': dict(red='1', blue='1'), '3': dict(red='1', blue='2', green='2'), '4': dict(green='3'), }) def test_reverse_links_dict(self): "reverse link dict for a graph with multiple edges is correct" self.assertEqual(self.multi_edges.reverse_links_dict(), { '1': set(['2', '3']), '2': set(['3']), '3': set(['4']), }) if __name__ == '__main__': main()