aabe0fdbb98b551887e9d69e37e6f0c1616aae5a
5 from . import islhelper
7 from .islhelper
import mainctx
, libisl
8 from .geometry
import GeometricObject
, Point
, Vector
9 from .linexprs
import Expression
, Symbol
, Rational
10 from .domains
import Domain
15 'Lt', 'Le', 'Eq', 'Ne', 'Ge', 'Gt',
20 class Polyhedron(Domain
):
30 def __new__(cls
, equalities
=None, inequalities
=None):
31 if isinstance(equalities
, str):
32 if inequalities
is not None:
33 raise TypeError('too many arguments')
34 return cls
.fromstring(equalities
)
35 elif isinstance(equalities
, GeometricObject
):
36 if inequalities
is not None:
37 raise TypeError('too many arguments')
38 return equalities
.aspolyhedron()
39 if equalities
is None:
42 for i
, equality
in enumerate(equalities
):
43 if not isinstance(equality
, Expression
):
44 raise TypeError('equalities must be linear expressions')
45 equalities
[i
] = equality
.scaleint()
46 if inequalities
is None:
49 for i
, inequality
in enumerate(inequalities
):
50 if not isinstance(inequality
, Expression
):
51 raise TypeError('inequalities must be linear expressions')
52 inequalities
[i
] = inequality
.scaleint()
53 symbols
= cls
._xsymbols
(equalities
+ inequalities
)
54 islbset
= cls
._toislbasicset
(equalities
, inequalities
, symbols
)
55 return cls
._fromislbasicset
(islbset
, symbols
)
59 return self
._equalities
62 def inequalities(self
):
63 return self
._inequalities
66 def constraints(self
):
67 return self
._constraints
75 Return this set as disjoint.
81 Return true if this set is the Universe set.
83 islbset
= self
._toislbasicset
(self
.equalities
, self
.inequalities
,
85 universe
= bool(libisl
.isl_basic_set_is_universe(islbset
))
86 libisl
.isl_basic_set_free(islbset
)
89 def aspolyhedron(self
):
91 Return polyhedral hull of this set.
95 def __contains__(self
, point
):
96 if not isinstance(point
, Point
):
97 raise TypeError('point must be a Point instance')
98 if self
.symbols
!= point
.symbols
:
99 raise ValueError('arguments must belong to the same space')
100 for equality
in self
.equalities
:
101 if equality
.subs(point
.coordinates()) != 0:
103 for inequality
in self
.inequalities
:
104 if inequality
.subs(point
.coordinates()) < 0:
108 def subs(self
, symbol
, expression
=None):
109 equalities
= [equality
.subs(symbol
, expression
)
110 for equality
in self
.equalities
]
111 inequalities
= [inequality
.subs(symbol
, expression
)
112 for inequality
in self
.inequalities
]
113 return Polyhedron(equalities
, inequalities
)
116 def _fromislbasicset(cls
, islbset
, symbols
):
117 islconstraints
= islhelper
.isl_basic_set_constraints(islbset
)
120 for islconstraint
in islconstraints
:
121 constant
= libisl
.isl_constraint_get_constant_val(islconstraint
)
122 constant
= islhelper
.isl_val_to_int(constant
)
124 for index
, symbol
in enumerate(symbols
):
125 coefficient
= libisl
.isl_constraint_get_coefficient_val(islconstraint
,
126 libisl
.isl_dim_set
, index
)
127 coefficient
= islhelper
.isl_val_to_int(coefficient
)
129 coefficients
[symbol
] = coefficient
130 expression
= Expression(coefficients
, constant
)
131 if libisl
.isl_constraint_is_equality(islconstraint
):
132 equalities
.append(expression
)
134 inequalities
.append(expression
)
135 libisl
.isl_basic_set_free(islbset
)
136 self
= object().__new
__(Polyhedron
)
137 self
._equalities
= tuple(equalities
)
138 self
._inequalities
= tuple(inequalities
)
139 self
._constraints
= tuple(equalities
+ inequalities
)
140 self
._symbols
= cls
._xsymbols
(self
._constraints
)
141 self
._dimension
= len(self
._symbols
)
145 def _toislbasicset(cls
, equalities
, inequalities
, symbols
):
146 dimension
= len(symbols
)
147 indices
= {symbol
: index
for index
, symbol
in enumerate(symbols
)}
148 islsp
= libisl
.isl_space_set_alloc(mainctx
, 0, dimension
)
149 islbset
= libisl
.isl_basic_set_universe(libisl
.isl_space_copy(islsp
))
150 islls
= libisl
.isl_local_space_from_space(islsp
)
151 for equality
in equalities
:
152 isleq
= libisl
.isl_equality_alloc(libisl
.isl_local_space_copy(islls
))
153 for symbol
, coefficient
in equality
.coefficients():
154 islval
= str(coefficient
).encode()
155 islval
= libisl
.isl_val_read_from_str(mainctx
, islval
)
156 index
= indices
[symbol
]
157 isleq
= libisl
.isl_constraint_set_coefficient_val(isleq
,
158 libisl
.isl_dim_set
, index
, islval
)
159 if equality
.constant
!= 0:
160 islval
= str(equality
.constant
).encode()
161 islval
= libisl
.isl_val_read_from_str(mainctx
, islval
)
162 isleq
= libisl
.isl_constraint_set_constant_val(isleq
, islval
)
163 islbset
= libisl
.isl_basic_set_add_constraint(islbset
, isleq
)
164 for inequality
in inequalities
:
165 islin
= libisl
.isl_inequality_alloc(libisl
.isl_local_space_copy(islls
))
166 for symbol
, coefficient
in inequality
.coefficients():
167 islval
= str(coefficient
).encode()
168 islval
= libisl
.isl_val_read_from_str(mainctx
, islval
)
169 index
= indices
[symbol
]
170 islin
= libisl
.isl_constraint_set_coefficient_val(islin
,
171 libisl
.isl_dim_set
, index
, islval
)
172 if inequality
.constant
!= 0:
173 islval
= str(inequality
.constant
).encode()
174 islval
= libisl
.isl_val_read_from_str(mainctx
, islval
)
175 islin
= libisl
.isl_constraint_set_constant_val(islin
, islval
)
176 islbset
= libisl
.isl_basic_set_add_constraint(islbset
, islin
)
180 def fromstring(cls
, string
):
181 domain
= Domain
.fromstring(string
)
182 if not isinstance(domain
, Polyhedron
):
183 raise ValueError('non-polyhedral expression: {!r}'.format(string
))
189 elif self
.isuniverse():
193 for equality
in self
.equalities
:
194 strings
.append('Eq({}, 0)'.format(equality
))
195 for inequality
in self
.inequalities
:
196 strings
.append('Ge({}, 0)'.format(inequality
))
197 if len(strings
) == 1:
200 return 'And({})'.format(', '.join(strings
))
202 def _repr_latex_(self
):
204 return '$\\emptyset$'
205 elif self
.isuniverse():
209 for equality
in self
.equalities
:
210 strings
.append('{} = 0'.format(equality
._repr
_latex
_().strip('$')))
211 for inequality
in self
.inequalities
:
212 strings
.append('{} \\ge 0'.format(inequality
._repr
_latex
_().strip('$')))
213 return '${}$'.format(' \\wedge '.join(strings
))
216 def fromsympy(cls
, expr
):
217 domain
= Domain
.fromsympy(expr
)
218 if not isinstance(domain
, Polyhedron
):
219 raise ValueError('non-polyhedral expression: {!r}'.format(expr
))
225 for equality
in self
.equalities
:
226 constraints
.append(sympy
.Eq(equality
.tosympy(), 0))
227 for inequality
in self
.inequalities
:
228 constraints
.append(sympy
.Ge(inequality
.tosympy(), 0))
229 return sympy
.And(*constraints
)
232 def _polygon_inner_point(cls
, points
):
233 symbols
= points
[0].symbols
234 coordinates
= {symbol
: 0 for symbol
in symbols
}
236 for symbol
, coordinate
in point
.coordinates():
237 coordinates
[symbol
] += coordinate
238 for symbol
in symbols
:
239 coordinates
[symbol
] /= len(points
)
240 return Point(coordinates
)
243 def _sort_polygon_2d(cls
, points
):
246 o
= cls
._polygon
_inner
_point
(points
)
250 dx
, dy
= (coordinate
for symbol
, coordinate
in om
.coordinates())
251 angle
= math
.atan2(dy
, dx
)
253 return sorted(points
, key
=angles
.get
)
256 def _sort_polygon_3d(cls
, points
):
259 o
= cls
._polygon
_inner
_point
(points
)
270 raise ValueError('degenerate polygon')
274 normprod
= norm_oa
* om
.norm()
275 cosinus
= max(oa
.dot(om
) / normprod
, -1.)
276 sinus
= u
.dot(oa
.cross(om
)) / normprod
277 angle
= math
.acos(cosinus
)
278 angle
= math
.copysign(angle
, sinus
)
280 return sorted(points
, key
=angles
.get
)
283 vertices
= self
.vertices()
285 for constraint
in self
.constraints
:
287 for vertex
in vertices
:
288 if constraint
.subs(vertex
.coordinates()) == 0:
293 def _plot_2d(self
, plot
=None, **kwargs
):
294 import matplotlib
.pyplot
as plt
295 from matplotlib
.patches
import Polygon
296 vertices
= self
._sort
_polygon
_2d
(self
.vertices())
297 xys
= [tuple(vertex
.values()) for vertex
in vertices
]
300 plot
= fig
.add_subplot(1, 1, 1)
301 xmin
, xmax
= plot
.get_xlim()
302 ymin
, ymax
= plot
.get_xlim()
304 xmin
, xmax
= min(xmin
, float(min(xs
))), max(xmax
, float(max(xs
)))
305 ymin
, ymax
= min(ymin
, float(min(ys
))), max(ymax
, float(max(ys
)))
306 plot
.set_xlim(xmin
, xmax
)
307 plot
.set_ylim(ymin
, ymax
)
308 plot
.add_patch(Polygon(xys
, closed
=True, **kwargs
))
311 def _plot_3d(self
, plot
=None, **kwargs
):
312 import matplotlib
.pyplot
as plt
313 from mpl_toolkits
.mplot3d
import Axes3D
314 from mpl_toolkits
.mplot3d
.art3d
import Poly3DCollection
320 xmin
, xmax
= axes
.get_xlim()
321 ymin
, ymax
= axes
.get_xlim()
322 zmin
, zmax
= axes
.get_xlim()
324 for vertices
in self
.faces():
325 if len(vertices
) == 0:
327 vertices
= Polyhedron
._sort
_polygon
_3d
(vertices
)
328 vertices
.append(vertices
[0])
329 face_xyzs
= [tuple(vertex
.values()) for vertex
in vertices
]
330 xs
, ys
, zs
= zip(*face_xyzs
)
331 xmin
, xmax
= min(xmin
, float(min(xs
))), max(xmax
, float(max(xs
)))
332 ymin
, ymax
= min(ymin
, float(min(ys
))), max(ymax
, float(max(ys
)))
333 zmin
, zmax
= min(zmin
, float(min(zs
))), max(zmax
, float(max(zs
)))
334 poly_xyzs
.append(face_xyzs
)
335 collection
= Poly3DCollection(poly_xyzs
, **kwargs
)
336 axes
.add_collection3d(collection
)
337 axes
.set_xlim(xmin
, xmax
)
338 axes
.set_ylim(ymin
, ymax
)
339 axes
.set_zlim(zmin
, zmax
)
342 def plot(self
, plot
=None, **kwargs
):
344 Display 3D plot of set.
346 if self
.dimension
== 2:
347 return self
._plot
_2d
(plot
=plot
, **kwargs
)
348 elif self
.dimension
== 3:
349 return self
._plot
_3d
(plot
=plot
, **kwargs
)
351 raise ValueError('polyhedron must be 2 or 3-dimensional')
354 def _polymorphic(func
):
355 @functools.wraps(func
)
356 def wrapper(left
, right
):
357 if not isinstance(left
, Expression
):
358 if isinstance(left
, numbers
.Rational
):
359 left
= Rational(left
)
361 raise TypeError('left must be a a rational number '
362 'or a linear expression')
363 if not isinstance(right
, Expression
):
364 if isinstance(right
, numbers
.Rational
):
365 right
= Rational(right
)
367 raise TypeError('right must be a a rational number '
368 'or a linear expression')
369 return func(left
, right
)
375 Return true if the first set is less than the second.
377 return Polyhedron([], [right
- left
- 1])
382 Return true the first set is less than or equal to the second.
384 return Polyhedron([], [right
- left
])
389 Return true if the sets are equal.
391 return Polyhedron([left
- right
], [])
396 Return true if the sets are NOT equal.
398 return ~
Eq(left
, right
)
403 Return true if the first set is greater than the second set.
405 return Polyhedron([], [left
- right
- 1])
410 Return true if the first set is greater than or equal the second set.
412 return Polyhedron([], [left
- right
])
417 Universe
= Polyhedron([])