Esempio n. 1
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def test_reduce_combined():
    """Fig.5 in 1986 Bryant TOC"""
    ordering = {'x': 0, 'y': 1, 'z': 2}
    g = BDD(ordering)
    g.roots.add(2)
    g._succ[2] = (0, 3, 4)
    g._succ[3] = (1, -1, 5)
    g._succ[4] = (1, 5, 6)
    g._succ[5] = (2, -1, 1)
    g._succ[6] = (2, -1, 1)
    h = g.reduction()
    assert 1 in h
    assert ordering == h.ordering

    r = nx.MultiDiGraph()
    r.add_node(1, level=3)
    r.add_node(2, level=0)
    r.add_node(3, level=1)
    r.add_node(4, level=2)

    r.add_edge(2, 3, value=False, complement=False)
    r.add_edge(2, 4, value=True, complement=False)
    r.add_edge(3, 4, value=True, complement=False)
    r.add_edge(3, 1, value=False, complement=True)
    r.add_edge(4, 1, value=False, complement=True)
    r.add_edge(4, 1, value=True, complement=False)

    (u, ) = h.roots
    compare(u, h, r)
Esempio n. 2
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def test_reduce_combined():
    """Fig.5 in 1986 Bryant TOC"""
    ordering = {'x': 0, 'y': 1, 'z': 2}
    g = BDD(ordering)
    g.roots.add(2)
    g._succ[2] = (0, 3, 4)
    g._succ[3] = (1, -1, 5)
    g._succ[4] = (1, 5, 6)
    g._succ[5] = (2, -1, 1)
    g._succ[6] = (2, -1, 1)
    h = g.reduction()
    assert 1 in h
    assert ordering == h.ordering

    r = nx.MultiDiGraph()
    r.add_node(1, level=3)
    r.add_node(2, level=0)
    r.add_node(3, level=1)
    r.add_node(4, level=2)

    r.add_edge(2, 3, value=False, complement=False)
    r.add_edge(2, 4, value=True, complement=False)
    r.add_edge(3, 4, value=True, complement=False)
    r.add_edge(3, 1, value=False, complement=True)
    r.add_edge(4, 1, value=False, complement=True)
    r.add_edge(4, 1, value=True, complement=False)

    (u, ) = h.roots
    compare(u, h, r)
Esempio n. 3
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def test_elimination():
    ordering = {'x': 0, 'y': 1}
    g = BDD(ordering)
    g.roots.add(2)
    # high == low, so node 2 is redundant
    g._succ[2] = (0, 3, 3)
    g._succ[3] = (1, -1, 1)
    h = g.reduction()
    assert set(h) == {1, 2}
Esempio n. 4
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def test_elimination():
    ordering = {'x': 0, 'y': 1}
    g = BDD(ordering)
    g.roots.add(2)
    # high == low, so node 2 is redundant
    g._succ[2] = (0, 3, 3)
    g._succ[3] = (1, -1, 1)
    h = g.reduction()
    assert set(h) == {1, 2}
Esempio n. 5
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def test_isomorphism():
    ordering = {'x': 0}
    g = BDD(ordering)
    g.roots.update([2, 3])
    g._succ[2] = (0, -1, 1)
    g._succ[3] = (0, -1, 1)
    h = g.reduction()
    assert set(h) == {1, 2}, set(h)
    assert 0 not in h
    assert h._succ[1] == (1, None, None)
    assert h._succ[2] == (0, -1, 1)
    assert h.roots == {2}
Esempio n. 6
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def test_isomorphism():
    ordering = {'x': 0}
    g = BDD(ordering)
    g.roots.update([2, 3])
    g._succ[2] = (0, -1, 1)
    g._succ[3] = (0, -1, 1)
    h = g.reduction()
    assert set(h) == {1, 2}, set(h)
    assert 0 not in h
    assert h._succ[1] == (1, None, None)
    assert h._succ[2] == (0, -1, 1)
    assert h.roots == {2}