For example, if I have the expression (A > 5) && (A == 6)
,
that expression can be simplified to just (A == 6)
, and still have the same behavior for A ∈ ℤ.
I also need it to work with multiple variables, so for instance ((B > 2) && (C == 2)) || ((B > 2) && (C < 2))
should simplify to (B > 2) && (C < 3)
.
I won't need to compare two unknowns, only unknowns and numbers, and I only need it to work with the operators <
, >
, and ==
for numbers, and &&
and ||
for expressions (&&
being AND and ||
being OR, of course). All unknowns are integers.
Is there any algorithm that takes such an expression and returns an expression with equal behavior and a minimal amount of operators?
(in my specific case, ||
operators are preferred over &&
)
Here's a slow dynamic programming algorithm along the lines that you were thinking of.
from collections import defaultdict, namedtuple
from heapq import heappop, heappush
from itertools import product
from math import inf
# Constructors for Boolean expressions. False and True are also accepted.
Lt = namedtuple("Lt", ["lhs", "rhs"])
Eq = namedtuple("Eq", ["lhs", "rhs"])
Gt = namedtuple("Gt", ["lhs", "rhs"])
And = namedtuple("And", ["lhs", "rhs"])
Or = namedtuple("Or", ["lhs", "rhs"])
# Variable names. Arbitrary strings are accepted.
A = "A"
B = "B"
C = "C"
# Example formulas.
first_example = And(Gt(A, 5), Eq(A, 6))
second_example = Or(And(Gt(B, 2), Eq(C, 2)), And(Gt(B, 2), Lt(C, 2)))
third_example = Or(And(Gt(A, 1), Gt(B, 1)), And(Gt(A, 0), Gt(B, 2)))
fourth_example = Or(Lt(A, 6), Gt(A, 5))
fifth_example = Or(And(Eq(A, 2), Gt(C, 2)), And(Eq(B, 2), Lt(C, 2)))
# Returns a map from each variable to the set of values such that the formula
# might evaluate differently for variable = value-1 versus variable = value.
def get_critical_value_sets(formula, result=None):
if result is None:
result = defaultdict(set)
if isinstance(formula, bool):
pass
elif isinstance(formula, Lt):
result[formula.lhs].add(formula.rhs)
elif isinstance(formula, Eq):
result[formula.lhs].add(formula.rhs)
result[formula.lhs].add(formula.rhs + 1)
elif isinstance(formula, Gt):
result[formula.lhs].add(formula.rhs + 1)
elif isinstance(formula, (And, Or)):
get_critical_value_sets(formula.lhs, result)
get_critical_value_sets(formula.rhs, result)
else:
assert False, str(formula)
return result
# Returns a list of inputs sufficient to compare Boolean combinations of the
# primitives returned by enumerate_useful_primitives.
def enumerate_truth_table_inputs(critical_value_sets):
variables, value_sets = zip(*critical_value_sets.items())
return [
dict(zip(variables, values))
for values in product(*({-inf} | value_set for value_set in value_sets))
]
# Returns both constants and all single comparisons whose critical value set is
# a subset of the given ones.
def enumerate_useful_primitives(critical_value_sets):
yield False
yield True
for variable, value_set in critical_value_sets.items():
for value in value_set:
yield Lt(variable, value)
if value + 1 in value_set:
yield Eq(variable, value)
yield Gt(variable, value - 1)
# Evaluates the formula recursively on the given input.
def evaluate(formula, input):
if isinstance(formula, bool):
return formula
elif isinstance(formula, Lt):
return input[formula.lhs] < formula.rhs
elif isinstance(formula, Eq):
return input[formula.lhs] == formula.rhs
elif isinstance(formula, Gt):
return input[formula.lhs] > formula.rhs
elif isinstance(formula, And):
return evaluate(formula.lhs, input) and evaluate(formula.rhs, input)
elif isinstance(formula, Or):
return evaluate(formula.lhs, input) or evaluate(formula.rhs, input)
else:
assert False, str(formula)
# Evaluates the formula on the many inputs, packing the values into an integer.
def get_truth_table(formula, inputs):
truth_table = 0
for input in inputs:
truth_table = (truth_table << 1) + evaluate(formula, input)
return truth_table
# Returns (the number of operations in the formula, the number of Ands).
def get_complexity(formula):
if isinstance(formula, bool):
return (0, 0)
elif isinstance(formula, (Lt, Eq, Gt)):
return (1, 0)
elif isinstance(formula, And):
ops_lhs, ands_lhs = get_complexity(formula.lhs)
ops_rhs, ands_rhs = get_complexity(formula.rhs)
return (ops_lhs + 1 + ops_rhs, ands_lhs + 1 + ands_rhs)
elif isinstance(formula, Or):
ops_lhs, ands_lhs = get_complexity(formula.lhs)
ops_rhs, ands_rhs = get_complexity(formula.rhs)
return (ops_lhs + 1 + ops_rhs, ands_lhs + ands_rhs)
else:
assert False, str(formula)
# Formula compared by complexity.
class HeapItem:
__slots__ = ["_complexity", "formula"]
def __init__(self, formula):
self._complexity = get_complexity(formula)
self.formula = formula
def __lt__(self, other):
return self._complexity < other._complexity
def __le__(self, other):
return self._complexity <= other._complexity
def __eq__(self, other):
return self._complexity == other._complexity
def __ne__(self, other):
return self._complexity != other._complexity
def __ge__(self, other):
return self._complexity >= other._complexity
def __gt__(self, other):
return self._complexity > other._complexity
# Like heapq.merge except we can add iterables dynamically.
class Merge:
__slots__ = ["_heap", "_iterable_count"]
def __init__(self):
self._heap = []
self._iterable_count = 0
def update(self, iterable):
iterable = iter(iterable)
try:
value = next(iterable)
except StopIteration:
return
heappush(self._heap, (value, self._iterable_count, iterable))
self._iterable_count += 1
def __iter__(self):
return self
def __next__(self):
if not self._heap:
raise StopIteration
value, index, iterable = heappop(self._heap)
try:
next_value = next(iterable)
except StopIteration:
return value
heappush(self._heap, (next_value, index, iterable))
return value
class Combinations:
__slots__ = ["_op", "_formula", "_best_formulas", "_i", "_n"]
def __init__(self, op, formula, best_formulas):
self._op = op
self._formula = formula
self._best_formulas = best_formulas
self._i = 0
self._n = len(best_formulas)
def __iter__(self):
return self
def __next__(self):
if self._i >= self._n:
raise StopIteration
formula = self._op(self._formula, self._best_formulas[self._i])
self._i += 1
return HeapItem(formula)
# Returns the simplest equivalent formula, breaking ties in favor of fewer Ands.
def simplify(target_formula):
critical_value_sets = get_critical_value_sets(target_formula)
inputs = enumerate_truth_table_inputs(critical_value_sets)
target_truth_table = get_truth_table(target_formula, inputs)
best = {}
merge = Merge()
for formula in enumerate_useful_primitives(critical_value_sets):
merge.update([HeapItem(formula)])
best_formulas = []
for item in merge:
if target_truth_table in best:
return best[target_truth_table]
formula = item.formula
truth_table = get_truth_table(formula, inputs)
if truth_table in best:
continue
n = len(best_formulas)
for op in [And, Or]:
merge.update(Combinations(op, formula, best_formulas))
best[truth_table] = formula
best_formulas.append(formula)
print(simplify(first_example))
print(simplify(second_example))
print(simplify(third_example))
print(simplify(fourth_example))
print(simplify(fifth_example))
Output:
Eq(lhs='A', rhs=6)
And(lhs=Lt(lhs='C', rhs=3), rhs=Gt(lhs='B', rhs=2))
And(lhs=And(lhs=Gt(lhs='B', rhs=1), rhs=Gt(lhs='A', rhs=0)), rhs=Or(lhs=Gt(lhs='B', rhs=2), rhs=Gt(lhs='A', rhs=1)))
True
Or(lhs=And(lhs=Eq(lhs='B', rhs=2), rhs=Lt(lhs='C', rhs=2)), rhs=And(lhs=Gt(lhs='C', rhs=2), rhs=Eq(lhs='A', rhs=2)))
Maybe you can consider intervals for your variables, for example:
(A > 5) && (A == 6)
Given you have a variable A
, set an initial interval for it: A: [-∞, ∞]
.
Each condition that you read, you can reduce your interval:
(A > 5) sets the interval for A: [6, ∞]
(A == 6) sets the interval for A: [6, 6]
For each update on the interval, check if the new condition is possible, for example:
(A > 5) sets the interval for A: [6, ∞]
(A == 5) out of the interval, impossible condition.
Just another example:
((B > 2) && (C == 2)) || ((B > 2) && (C < 2))
Initially: B: [-∞, ∞]
and C: [-∞, ∞]
.
((B > 2) && (C == 2))
(B > 2) sets the interval for B: [3, ∞]
(C == 2) sets the interval for C: [2, 2]
The next condition is attached with ||
, so you add intervals:
((B > 2) && (C < 2))
(B > 2) sets the interval for B: [3, ∞]
(C < 2) sets the interval for C: [2, 2] U [-∞, 1] = [-∞, 2]
If you love us? You can donate to us via Paypal or buy me a coffee so we can maintain and grow! Thank you!
Donate Us With