Remove _repr_latex_() methods (current implementation not satisfying)
[linpy.git] / linpy / polyhedra.py
index 346ffff..c05432a 100644 (file)
@@ -36,21 +36,53 @@ __all__ = [
 
 class Polyhedron(Domain):
     """
-    Polyhedron class allows users to build and inspect polyherons. Polyhedron inherits from Domain.
+    A convex polyhedron (or simply "polyhedron") is the space defined by a
+    system of linear equalities and inequalities. This space can be unbounded. A
+    Z-polyhedron (simply called "polyhedron" in LinPy) is the set of integer
+    points in a convex polyhedron.
     """
+
     __slots__ = (
         '_equalities',
         '_inequalities',
-        '_constraints',
         '_symbols',
         '_dimension',
     )
 
     def __new__(cls, equalities=None, inequalities=None):
         """
-        Create and return a new Polyhedron from a string or list of equalities and inequalities.
-        """
+        Return a polyhedron from two sequences of linear expressions: equalities
+        is a list of expressions equal to 0, and inequalities is a list of
+        expressions greater or equal to 0. For example, the polyhedron
+        0 <= x <= 2, 0 <= y <= 2 can be constructed with:
+
+        >>> x, y = symbols('x y')
+        >>> square1 = Polyhedron([], [x, 2 - x, y, 2 - y])
+        >>> square1
+        And(0 <= x, x <= 2, 0 <= y, y <= 2)
+
+        It may be easier to use comparison operators LinExpr.__lt__(),
+        LinExpr.__le__(), LinExpr.__ge__(), LinExpr.__gt__(), or functions Lt(),
+        Le(), Eq(), Ge() and Gt(), using one of the following instructions:
+
+        >>> x, y = symbols('x y')
+        >>> square1 = (0 <= x) & (x <= 2) & (0 <= y) & (y <= 2)
+        >>> square1 = Le(0, x, 2) & Le(0, y, 2)
+
+        It is also possible to build a polyhedron from a string.
+
+        >>> square1 = Polyhedron('0 <= x <= 2, 0 <= y <= 2')
 
+        Finally, a polyhedron can be constructed from a GeometricObject
+        instance, calling the GeometricObject.aspolyedron() method. This way, it
+        is possible to compute the polyhedral hull of a Domain instance, i.e.,
+        the convex hull of two polyhedra:
+
+        >>> square1 = Polyhedron('0 <= x <= 2, 0 <= y <= 2')
+        >>> square2 = Polyhedron('1 <= x <= 3, 1 <= y <= 3')
+        >>> Polyhedron(square1 | square2)
+        And(0 <= x, 0 <= y, x <= y + 2, y <= x + 2, x <= 3, y <= 3)
+        """
         if isinstance(equalities, str):
             if inequalities is not None:
                 raise TypeError('too many arguments')
@@ -59,59 +91,54 @@ class Polyhedron(Domain):
             if inequalities is not None:
                 raise TypeError('too many arguments')
             return equalities.aspolyhedron()
-        if equalities is None:
-            equalities = []
-        else:
-            for i, equality in enumerate(equalities):
+        sc_equalities = []
+        if equalities is not None:
+            for equality in equalities:
                 if not isinstance(equality, LinExpr):
                     raise TypeError('equalities must be linear expressions')
-                equalities[i] = equality.scaleint()
-        if inequalities is None:
-            inequalities = []
-        else:
-            for i, inequality in enumerate(inequalities):
+                sc_equalities.append(equality.scaleint())
+        sc_inequalities = []
+        if inequalities is not None:
+            for inequality in inequalities:
                 if not isinstance(inequality, LinExpr):
                     raise TypeError('inequalities must be linear expressions')
-                inequalities[i] = inequality.scaleint()
-        symbols = cls._xsymbols(equalities + inequalities)
-        islbset = cls._toislbasicset(equalities, inequalities, symbols)
+                sc_inequalities.append(inequality.scaleint())
+        symbols = cls._xsymbols(sc_equalities + sc_inequalities)
+        islbset = cls._toislbasicset(sc_equalities, sc_inequalities, symbols)
         return cls._fromislbasicset(islbset, symbols)
 
     @property
     def equalities(self):
         """
-        Return a list of the equalities in a polyhedron.
+        The tuple of equalities. This is a list of LinExpr instances that are
+        equal to 0 in the polyhedron.
         """
         return self._equalities
 
     @property
     def inequalities(self):
         """
-        Return a list of the inequalities in a polyhedron.
+        The tuple of inequalities. This is a list of LinExpr instances that are
+        greater or equal to 0 in the polyhedron.
         """
         return self._inequalities
 
     @property
     def constraints(self):
         """
-        Return the list of the constraints of a polyhedron.
+        The tuple of constraints, i.e., equalities and inequalities. This is
+        semantically equivalent to: equalities + inequalities.
         """
-        return self._constraints
+        return self._equalities + self._inequalities
 
     @property
     def polyhedra(self):
         return self,
 
     def make_disjoint(self):
-        """
-        Return a polyhedron as disjoint.
-        """
         return self
 
     def isuniverse(self):
-        """
-        Return true if a polyhedron is the Universe set.
-        """
         islbset = self._toislbasicset(self.equalities, self.inequalities,
             self.symbols)
         universe = bool(libisl.isl_basic_set_is_universe(islbset))
@@ -119,15 +146,18 @@ class Polyhedron(Domain):
         return universe
 
     def aspolyhedron(self):
-        """
-        Return the polyhedral hull of a polyhedron.
-        """
         return self
 
-    def __contains__(self, point):
+    def convex_union(self, *others):
         """
-        Report whether a polyhedron constains an integer point
+        Return the convex union of two or more polyhedra.
         """
+        for other in others:
+            if not isinstance(other, Polyhedron):
+                raise TypeError('arguments must be Polyhedron instances')
+        return Polyhedron(self.union(*others))
+
+    def __contains__(self, point):
         if not isinstance(point, Point):
             raise TypeError('point must be a Point instance')
         if self.symbols != point.symbols:
@@ -141,27 +171,33 @@ class Polyhedron(Domain):
         return True
 
     def subs(self, symbol, expression=None):
-        """
-        Subsitute the given value into an expression and return the resulting
-        expression.
-        """
         equalities = [equality.subs(symbol, expression)
             for equality in self.equalities]
         inequalities = [inequality.subs(symbol, expression)
             for inequality in self.inequalities]
         return Polyhedron(equalities, inequalities)
 
-    def _asinequalities(self):
+    def asinequalities(self):
+        """
+        Express the polyhedron using inequalities, given as a list of
+        expressions greater or equal to 0.
+        """
         inequalities = list(self.equalities)
         inequalities.extend([-expression for expression in self.equalities])
         inequalities.extend(self.inequalities)
         return inequalities
 
     def widen(self, other):
+        """
+        Compute the standard widening of two polyhedra, à la Halbwachs.
+
+        In its current implementation, this method is slow and should not be
+        used on large polyhedra.
+        """
         if not isinstance(other, Polyhedron):
-            raise ValueError('argument must be a Polyhedron instance')
-        inequalities1 = self._asinequalities()
-        inequalities2 = other._asinequalities()
+            raise TypeError('argument must be a Polyhedron instance')
+        inequalities1 = self.asinequalities()
+        inequalities2 = other.asinequalities()
         inequalities = []
         for inequality1 in inequalities1:
             if other <= Polyhedron(inequalities=[inequality1]):
@@ -200,8 +236,7 @@ class Polyhedron(Domain):
         self = object().__new__(Polyhedron)
         self._equalities = tuple(equalities)
         self._inequalities = tuple(inequalities)
-        self._constraints = tuple(equalities + inequalities)
-        self._symbols = cls._xsymbols(self._constraints)
+        self._symbols = cls._xsymbols(self.constraints)
         self._dimension = len(self._symbols)
         return self
 
@@ -242,9 +277,6 @@ class Polyhedron(Domain):
 
     @classmethod
     def fromstring(cls, string):
-        """
-        Create and return a Polyhedron from a string.
-        """
         domain = Domain.fromstring(string)
         if not isinstance(domain, Polyhedron):
             raise ValueError('non-polyhedral expression: {!r}'.format(string))
@@ -253,37 +285,46 @@ class Polyhedron(Domain):
     def __repr__(self):
         strings = []
         for equality in self.equalities:
-            strings.append('Eq({}, 0)'.format(equality))
+            left, right, swap = 0, 0, False
+            for i, (symbol, coefficient) in enumerate(equality.coefficients()):
+                if coefficient > 0:
+                    left += coefficient * symbol
+                else:
+                    right -= coefficient * symbol
+                    if i == 0:
+                        swap = True
+            if equality.constant > 0:
+                left += equality.constant
+            else:
+                right -= equality.constant
+            if swap:
+                left, right = right, left
+            strings.append('{} == {}'.format(left, right))
         for inequality in self.inequalities:
-            strings.append('Ge({}, 0)'.format(inequality))
+            left, right = 0, 0
+            for symbol, coefficient in inequality.coefficients():
+                if coefficient < 0:
+                    left -= coefficient * symbol
+                else:
+                    right += coefficient * symbol
+            if inequality.constant < 0:
+                left -= inequality.constant
+            else:
+                right += inequality.constant
+            strings.append('{} <= {}'.format(left, right))
         if len(strings) == 1:
             return strings[0]
         else:
             return 'And({})'.format(', '.join(strings))
 
-
-    def _repr_latex_(self):
-        strings = []
-        for equality in self.equalities:
-            strings.append('{} = 0'.format(equality._repr_latex_().strip('$')))
-        for inequality in self.inequalities:
-            strings.append('{} \\ge 0'.format(inequality._repr_latex_().strip('$')))
-        return '$${}$$'.format(' \\wedge '.join(strings))
-
     @classmethod
     def fromsympy(cls, expr):
-        """
-        Convert a sympy object to a polyhedron.
-        """
         domain = Domain.fromsympy(expr)
         if not isinstance(domain, Polyhedron):
             raise ValueError('non-polyhedral expression: {!r}'.format(expr))
         return domain
 
     def tosympy(self):
-        """
-        Return a polyhedron as a sympy object.
-        """
         import sympy
         constraints = []
         for equality in self.equalities:
@@ -294,14 +335,14 @@ class Polyhedron(Domain):
 
 
 class EmptyType(Polyhedron):
-
-    __slots__ = Polyhedron.__slots__
+    """
+    The empty polyhedron, whose set of constraints is not satisfiable.
+    """
 
     def __new__(cls):
         self = object().__new__(cls)
         self._equalities = (Rational(1),)
         self._inequalities = ()
-        self._constraints = self._equalities
         self._symbols = ()
         self._dimension = 0
         return self
@@ -314,21 +355,19 @@ class EmptyType(Polyhedron):
     def __repr__(self):
         return 'Empty'
 
-    def _repr_latex_(self):
-        return '$$\\emptyset$$'
-
 Empty = EmptyType()
 
 
 class UniverseType(Polyhedron):
-
-    __slots__ = Polyhedron.__slots__
+    """
+    The universe polyhedron, whose set of constraints is always satisfiable,
+    i.e. is empty.
+    """
 
     def __new__(cls):
         self = object().__new__(cls)
         self._equalities = ()
         self._inequalities = ()
-        self._constraints = ()
         self._symbols = ()
         self._dimension = ()
         return self
@@ -336,68 +375,80 @@ class UniverseType(Polyhedron):
     def __repr__(self):
         return 'Universe'
 
-    def _repr_latex_(self):
-        return '$$\\Omega$$'
-
 Universe = UniverseType()
 
 
-def _polymorphic(func):
+def _pseudoconstructor(func):
     @functools.wraps(func)
-    def wrapper(left, right):
-        if not isinstance(left, LinExpr):
-            if isinstance(left, numbers.Rational):
-                left = Rational(left)
-            else:
-                raise TypeError('left must be a a rational number '
-                    'or a linear expression')
-        if not isinstance(right, LinExpr):
-            if isinstance(right, numbers.Rational):
-                right = Rational(right)
-            else:
-                raise TypeError('right must be a a rational number '
-                    'or a linear expression')
-        return func(left, right)
+    def wrapper(expr1, expr2, *exprs):
+        exprs = (expr1, expr2) + exprs
+        for expr in exprs:
+            if not isinstance(expr, LinExpr):
+                if isinstance(expr, numbers.Rational):
+                    expr = Rational(expr)
+                else:
+                    raise TypeError('arguments must be rational numbers '
+                        'or linear expressions')
+        return func(*exprs)
     return wrapper
 
-@_polymorphic
-def Lt(left, right):
+@_pseudoconstructor
+def Lt(*exprs):
     """
-    Returns a Polyhedron instance with a single constraint as left less than right.
+    Create the polyhedron with constraints expr1 < expr2 < expr3 ...
     """
-    return Polyhedron([], [right - left - 1])
+    inequalities = []
+    for left, right in zip(exprs, exprs[1:]):
+        inequalities.append(right - left - 1)
+    return Polyhedron([], inequalities)
 
-@_polymorphic
-def Le(left, right):
+@_pseudoconstructor
+def Le(*exprs):
     """
-    Returns a Polyhedron instance with a single constraint as left less than or equal to right.
+    Create the polyhedron with constraints expr1 <= expr2 <= expr3 ...
     """
-    return Polyhedron([], [right - left])
+    inequalities = []
+    for left, right in zip(exprs, exprs[1:]):
+        inequalities.append(right - left)
+    return Polyhedron([], inequalities)
 
-@_polymorphic
-def Eq(left, right):
+@_pseudoconstructor
+def Eq(*exprs):
     """
-    Returns a Polyhedron instance with a single constraint as left equal to right.
+    Create the polyhedron with constraints expr1 == expr2 == expr3 ...
     """
-    return Polyhedron([left - right], [])
+    equalities = []
+    for left, right in zip(exprs, exprs[1:]):
+        equalities.append(left - right)
+    return Polyhedron(equalities, [])
 
-@_polymorphic
-def Ne(left, right):
+@_pseudoconstructor
+def Ne(*exprs):
     """
-    Returns a Polyhedron instance with a single constraint as left not equal to right.
+    Create the domain such that expr1 != expr2 != expr3 ... The result is a
+    Domain object, not a Polyhedron.
     """
-    return ~Eq(left, right)
+    domain = Universe
+    for left, right in zip(exprs, exprs[1:]):
+        domain &= ~Eq(left, right)
+    return domain
 
-@_polymorphic
-def Gt(left, right):
+@_pseudoconstructor
+def Ge(*exprs):
     """
-    Returns a Polyhedron instance with a single constraint as left greater than right.
+    Create the polyhedron with constraints expr1 >= expr2 >= expr3 ...
     """
-    return Polyhedron([], [left - right - 1])
+    inequalities = []
+    for left, right in zip(exprs, exprs[1:]):
+        inequalities.append(left - right)
+    return Polyhedron([], inequalities)
 
-@_polymorphic
-def Ge(left, right):
+@_pseudoconstructor
+def Gt(*exprs):
     """
-    Returns a Polyhedron instance with a single constraint as left greater than or equal to right.
+    Create the polyhedron with constraints expr1 > expr2 > expr3 ...
     """
-    return Polyhedron([], [left - right])
+    inequalities = []
+    for left, right in zip(exprs, exprs[1:]):
+        inequalities.append(left - right - 1)
+    return Polyhedron([], inequalities)