Java Code Examples for kodkod.instance.TupleSet#remove()
The following examples show how to use
kodkod.instance.TupleSet#remove() .
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Example 1
| Source File: ALG197.java From org.alloytools.alloy with Apache License 2.0 | 5 votes |
|
/**
* Returns the bounds the problem (axioms 1, 4, 9-11, last formula of 14-15, and
* first formula of 16-22).
*
* @return the bounds for the problem
*/
@Override
public final Bounds bounds() {
final Bounds b = super.bounds();
final TupleFactory f = b.universe().factory();
final TupleSet op1h = b.upperBound(op1).clone();
final TupleSet op2h = b.upperBound(op2).clone();
final TupleSet op1l = f.setOf(f.tuple("e16", "e16", "e15")); // axiom
// 14,
// line
// 6
final TupleSet op2l = f.setOf(f.tuple("e26", "e26", "e25")); // axiom
// 15,
// line
// 6
op1h.removeAll(f.area(f.tuple("e16", "e16", "e10"), f.tuple("e16", "e16", "e16")));
op1h.addAll(op1l);
op2h.removeAll(f.area(f.tuple("e26", "e26", "e20"), f.tuple("e26", "e26", "e26")));
op2h.addAll(op2l);
b.bound(op1, op1l, op1h);
b.bound(op2, op2l, op2h);
final TupleSet high = f.area(f.tuple("e10", "e20"), f.tuple("e15", "e26"));
// first line of axioms 16-22
for (int i = 0; i < 7; i++) {
Tuple t = f.tuple("e16", "e2" + i);
high.add(t);
b.bound(h[i], f.setOf(t), high);
high.remove(t);
}
return b;
}
Example 2
| Source File: SymmetryBreakingTest.java From org.alloytools.alloy with Apache License 2.0 | 5 votes |
|
public void testAcyclic() {
bounds.bound(ac1, factory.area(factory.tuple("0", "0"), factory.tuple("4", "4")));
assertNotNull(solve(ac1.some().and(ac1.acyclic())));
assertPrimVarNum(10);
bounds.bound(r1, factory.range(factory.tuple("0"), factory.tuple("4")));
assertNotNull(solve(ac1.join(r1).some().and(ac1.acyclic())));
assertPrimVarNum(10 + bounds.upperBound(r1).size());
TupleSet ac2b = factory.setOf("5", "6", "7", "8");
ac2b = ac2b.product(ac2b);
bounds.bound(ac2, ac2b);
assertNotNull(solve(ac1.difference(ac2).some().and(ac1.acyclic()).and(ac2.acyclic())));
assertPrimVarNum(10 + 6);
bounds.boundExactly(r2, factory.setOf(factory.tuple("5", "6")));
assertNotNull(solve(ac2.join(r2).some().and(ac2.acyclic())));
final TupleSet ac3Bound = factory.allOf(2);
ac3Bound.remove(factory.tuple("9", "9"));
bounds.bound(ac3, ac3Bound);
assertNotNull(solve(ac1.difference(ac2).union(ac3).some().and(ac1.acyclic()).and(ac2.acyclic())));
assertPrimVarNum(ac3Bound.size() + 10 + 6);
bounds.bound(to3, factory.allOf(2));
bounds.bound(ord3, factory.setOf("0", "1", "2"));
bounds.bound(first3, bounds.upperBound(ord3));
bounds.bound(last3, bounds.upperBound(ord3));
assertNotNull(solve(to3.product(ac1).some().and(ac1.acyclic()).and(to3.totalOrder(ord3, first3, last3))));
assertPrimVarNum(bounds.upperBound(ac1).size());
}
Example 3
| Source File: ALG197.java From kodkod with MIT License | 5 votes |
|
/**
* Returns the bounds the problem (axioms 1, 4, 9-11, last formula of 14-15, and first formula of 16-22).
* @return the bounds for the problem
*/
public final Bounds bounds() {
final Bounds b = super.bounds();
final TupleFactory f = b.universe().factory();
final TupleSet op1h = b.upperBound(op1).clone();
final TupleSet op2h = b.upperBound(op2).clone();
final TupleSet op1l = f.setOf(f.tuple("e16", "e16", "e15")); // axiom 14, line 6
final TupleSet op2l = f.setOf(f.tuple("e26", "e26", "e25")); // axiom 15, line 6
op1h.removeAll(f.area(f.tuple("e16", "e16", "e10"), f.tuple("e16", "e16", "e16")));
op1h.addAll(op1l);
op2h.removeAll(f.area(f.tuple("e26", "e26", "e20"), f.tuple("e26", "e26", "e26")));
op2h.addAll(op2l);
b.bound(op1, op1l, op1h);
b.bound(op2, op2l, op2h);
final TupleSet high = f.area(f.tuple("e10", "e20"), f.tuple("e15", "e26"));
// first line of axioms 16-22
for(int i = 0; i < 7; i++) {
Tuple t = f.tuple("e16", "e2"+i);
high.add(t);
b.bound(h[i], f.setOf(t), high);
high.remove(t);
}
return b;
}
Example 4
| Source File: ALG195.java From kodkod with MIT License | 5 votes |
|
/**
* Returns the bounds the problem (axioms 1, 4, 9-13, second formula of 14-15, and first formula of 16-22).
* @return the bounds for the problem
*/
public final Bounds bounds() {
final Bounds b = super.bounds();
final TupleFactory f = b.universe().factory();
final TupleSet op1h = b.upperBound(op1).clone();
final TupleSet op2h = b.upperBound(op2).clone();
for(int i = 0; i < 7; i++) {
op1h.remove(f.tuple("e1"+i, "e1"+i, "e1"+i)); // axiom 12
op2h.remove(f.tuple("e2"+i, "e2"+i, "e2"+i)); // axiom 13
}
final TupleSet op1l = f.setOf(f.tuple("e15", "e15", "e11")); // axiom 14, line 2
final TupleSet op2l = f.setOf(f.tuple("e25", "e25", "e21")); // axiom 15, line 2
op1h.removeAll(f.area(f.tuple("e15", "e15", "e10"), f.tuple("e15", "e15", "e16")));
op1h.addAll(op1l);
op2h.removeAll(f.area(f.tuple("e25", "e25", "e20"), f.tuple("e25", "e25", "e26")));
op2h.addAll(op2l);
b.bound(op1, op1l, op1h);
b.bound(op2, op2l, op2h);
final TupleSet high = f.area(f.tuple("e10", "e20"), f.tuple("e14", "e26"));
high.addAll(f.area(f.tuple("e16", "e20"), f.tuple("e16", "e26")));
// first line of axioms 16-22
for(int i = 0; i < 7; i++) {
Tuple t = f.tuple("e15", "e2"+i);
high.add(t);
b.bound(h[i], f.setOf(t), high);
high.remove(t);
}
return b;
}
Example 5
| Source File: SymmetryBreakingTest.java From kodkod with MIT License | 5 votes |
|
@Test
public final void testAcyclic() {
bounds.bound(ac1, factory.area(factory.tuple("0","0"), factory.tuple("4","4")));
assertNotNull(solve(ac1.some().and(ac1.acyclic())));
assertPrimVarNum(10);
bounds.bound(r1, factory.range(factory.tuple("0"), factory.tuple("4")));
assertNotNull(solve(ac1.join(r1).some().and(ac1.acyclic())));
assertPrimVarNum(10 + bounds.upperBound(r1).size());
TupleSet ac2b = factory.setOf("5","6","7","8");
ac2b = ac2b.product(ac2b);
bounds.bound(ac2, ac2b);
assertNotNull(solve(ac1.difference(ac2).some().and(ac1.acyclic()).and(ac2.acyclic())));
assertPrimVarNum(10 + 6);
bounds.boundExactly(r2, factory.setOf(factory.tuple("5", "6")));
assertNotNull(solve(ac2.join(r2).some().and(ac2.acyclic())));
final TupleSet ac3Bound = factory.allOf(2);
ac3Bound.remove(factory.tuple("9", "9"));
bounds.bound(ac3, ac3Bound);
assertNotNull(solve(ac1.difference(ac2).union(ac3).some().and(ac1.acyclic()).and(ac2.acyclic())));
assertPrimVarNum(ac3Bound.size() + 10 + 6);
bounds.bound(to3, factory.allOf(2));
bounds.bound(ord3, factory.setOf("0","1","2"));
bounds.bound(first3, bounds.upperBound(ord3));
bounds.bound(last3, bounds.upperBound(ord3));
assertNotNull(solve(to3.product(ac1).some().and(ac1.acyclic()).and(to3.totalOrder(ord3,first3,last3))));
assertPrimVarNum(bounds.upperBound(ac1).size());
}
Example 6
| Source File: ALG195.java From org.alloytools.alloy with Apache License 2.0 | 4 votes |
|
/**
* Returns the bounds the problem (axioms 1, 4, 9-13, second formula of 14-15,
* and first formula of 16-22).
*
* @return the bounds for the problem
*/
@Override
public final Bounds bounds() {
final Bounds b = super.bounds();
final TupleFactory f = b.universe().factory();
final TupleSet op1h = b.upperBound(op1).clone();
final TupleSet op2h = b.upperBound(op2).clone();
for (int i = 0; i < 7; i++) {
op1h.remove(f.tuple("e1" + i, "e1" + i, "e1" + i)); // axiom 12
op2h.remove(f.tuple("e2" + i, "e2" + i, "e2" + i)); // axiom 13
}
final TupleSet op1l = f.setOf(f.tuple("e15", "e15", "e11")); // axiom
// 14,
// line
// 2
final TupleSet op2l = f.setOf(f.tuple("e25", "e25", "e21")); // axiom
// 15,
// line
// 2
op1h.removeAll(f.area(f.tuple("e15", "e15", "e10"), f.tuple("e15", "e15", "e16")));
op1h.addAll(op1l);
op2h.removeAll(f.area(f.tuple("e25", "e25", "e20"), f.tuple("e25", "e25", "e26")));
op2h.addAll(op2l);
b.bound(op1, op1l, op1h);
b.bound(op2, op2l, op2h);
final TupleSet high = f.area(f.tuple("e10", "e20"), f.tuple("e14", "e26"));
high.addAll(f.area(f.tuple("e16", "e20"), f.tuple("e16", "e26")));
// first line of axioms 16-22
for (int i = 0; i < 7; i++) {
Tuple t = f.tuple("e15", "e2" + i);
high.add(t);
b.bound(h[i], f.setOf(t), high);
high.remove(t);
}
return b;
}
