mirror of
https://github.com/Brandon-Rozek/matmod.git
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309 lines
11 KiB
Python
309 lines
11 KiB
Python
"""
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Matrix model semantics and satisfiability of
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a given logic.
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"""
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from common import set_to_str
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from logic import (
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get_propostional_variables, Logic,
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Operation, PropositionalVariable, Term
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)
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from collections import defaultdict
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from functools import cached_property, lru_cache, reduce
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from itertools import chain, combinations_with_replacement, permutations, product
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from typing import Dict, List, Optional, Set, Tuple
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__all__ = ['ModelValue', 'ModelFunction', 'Model', 'Interpretation']
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class ModelValue:
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def __init__(self, name):
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self.name = name
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self.hashed_value = hash(self.name)
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def immutable(self, name, value):
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raise Exception("Model values are immutable")
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self.__setattr__ = immutable
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def __str__(self):
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return self.name
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def __hash__(self):
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return self.hashed_value
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def __eq__(self, other):
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return isinstance(other, ModelValue) and self.name == other.name
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def __deepcopy__(self, _):
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return ModelValue(self.name)
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class ModelFunction:
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def __init__(self, arity: int, mapping, operation_name = ""):
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self.operation_name = operation_name
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self.arity = arity
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# Transform the mapping such that the
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# key is always a tuple of model values
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corrected_mapping: Dict[Tuple[ModelValue], ModelValue] = {}
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for k, v in mapping.items():
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if isinstance(k, tuple):
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assert len(k) == arity
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corrected_mapping[k] = v
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elif isinstance(k, list):
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assert len(k) == arity
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corrected_mapping[tuple(k)] = v
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else: # Assume it's atomic
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assert arity == 1
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corrected_mapping[(k,)] = v
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self.mapping = corrected_mapping
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@cached_property
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def domain(self):
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result_set: Set[ModelValue] = set()
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for args in self.mapping.keys():
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for v in args:
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result_set.add(v)
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return result_set
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def __str__(self):
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if self.arity == 1:
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return unary_function_str(self)
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elif self.arity == 2:
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return binary_function_str(self)
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# Default return dictionary representation
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str_dict = dict()
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for k, v in self.mapping.items():
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inputstr = "(" + ", ".join(str(ki) for ki in k) + ")"
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str_dict[inputstr] = str(v)
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return self.operation_name + " " + str(str_dict)
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def __call__(self, *args):
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return self.mapping[args]
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def unary_function_str(f: ModelFunction) -> str:
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assert isinstance(f, ModelFunction) and f.arity == 1
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sorted_domain = sorted(f.domain, key=lambda v : v.name)
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header_line = f" {f.operation_name} | " + " ".join((str(v) for v in sorted_domain))
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sep_line = "-" + ("-" * len(f.operation_name)) + "-+-" +\
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("-" * len(sorted_domain)) +\
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("-" * reduce(lambda sum, v : sum + len(v.name), sorted_domain, 0))
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data_line = (" " * (len(f.operation_name) + 2)) + "| " + " ".join((str(f.mapping[(v,)]) for v in sorted_domain))
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return "\n".join((header_line, sep_line, data_line)) + "\n"
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def binary_function_str(f: ModelFunction) -> str:
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assert isinstance(f, ModelFunction) and f.arity == 2
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sorted_domain = sorted(f.domain, key=lambda v : v.name)
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max_col_width = max(chain((len(v.name) for v in sorted_domain), (len(f.operation_name),)))
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header_line = f" {f.operation_name} " +\
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(" " * (max_col_width - len(f.operation_name))) + "| " +\
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" ".join((str(v) for v in sorted_domain))
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sep_line = "-" + ("-" * max_col_width) + "-+-" +\
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("-" * len(sorted_domain)) +\
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("-" * reduce(lambda sum, v : sum + len(v.name), sorted_domain, 0))
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data_lines = ""
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for row_v in sorted_domain:
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data_line = f" {row_v.name} | " + " ".join((str(f.mapping[(row_v, col_v)]) for col_v in sorted_domain))
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data_lines += data_line + "\n"
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return "\n".join((header_line, sep_line, data_lines))
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Interpretation = Dict[Operation, ModelFunction]
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class Model:
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def __init__(
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self,
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carrier_set: Set[ModelValue],
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logical_operations: Set[ModelFunction],
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designated_values: Set[ModelValue],
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name: Optional[str] = None
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):
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assert designated_values <= carrier_set
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self.carrier_set = carrier_set
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self.logical_operations = logical_operations
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self.designated_values = designated_values
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self.name = str(abs(hash((
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frozenset(carrier_set),
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frozenset(logical_operations),
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frozenset(designated_values)
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))))[:5] if name is None else name
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def __str__(self):
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result = ("=" * 25) + f"""
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Model Name: {self.name}
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Carrier Set: {set_to_str(self.carrier_set)}
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Designated Values: {set_to_str(self.designated_values)}
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"""
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for function in self.logical_operations:
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result += f"{str(function)}\n"
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return result + ("=" * 25) + "\n"
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def evaluate_term(
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t: Term, f: Dict[PropositionalVariable, ModelValue],
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interpretation: Dict[Operation, ModelFunction]) -> ModelValue:
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"""
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Given a term in a logic, mapping
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between terms and model values,
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as well as an interpretation
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of operations to model functions,
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return the evaluated model value.
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"""
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if isinstance(t, PropositionalVariable):
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return f[t]
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model_function = interpretation[t.operation]
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model_arguments: List[ModelValue] = []
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for logic_arg in t.arguments:
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model_arg = evaluate_term(logic_arg, f, interpretation)
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model_arguments.append(model_arg)
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return model_function(*model_arguments)
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def all_model_valuations(
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pvars: Tuple[PropositionalVariable],
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mvalues: Tuple[ModelValue]):
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"""
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Given propositional variables and model values,
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produce every possible mapping between the two.
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"""
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all_possible_values = product(mvalues, repeat=len(pvars))
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for valuation in all_possible_values:
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mapping: Dict[PropositionalVariable, ModelValue] = {}
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assert len(pvars) == len(valuation)
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for pvar, value in zip(pvars, valuation):
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mapping[pvar] = value
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yield mapping
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@lru_cache
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def all_model_valuations_cached(
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pvars: Tuple[PropositionalVariable],
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mvalues: Tuple[ModelValue]):
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return list(all_model_valuations(pvars, mvalues))
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def satisfiable(logic: Logic, model: Model, interpretation: Dict[Operation, ModelFunction]) -> bool:
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"""
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Determine whether a model satisfies a logic
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given an interpretation.
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"""
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pvars = tuple(get_propostional_variables(tuple(logic.rules)))
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mappings = all_model_valuations_cached(pvars, tuple(model.carrier_set))
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for mapping in mappings:
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# Make sure that the model satisfies each of the rules
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for rule in logic.rules:
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# The check only applies if the premises are designated
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premise_met = True
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premise_ts: Set[ModelValue] = set()
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for premise in rule.premises:
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premise_t = evaluate_term(premise, mapping, interpretation)
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# As soon as one premise is not designated,
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# move to the next rule.
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if premise_t not in model.designated_values:
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premise_met = False
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break
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# If designated, keep track of the evaluated term
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premise_ts.add(premise_t)
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if not premise_met:
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continue
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# With the premises designated, make sure the consequent is designated
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consequent_t = evaluate_term(rule.conclusion, mapping, interpretation)
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if consequent_t not in model.designated_values:
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return False
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return True
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def model_closure(initial_set: Set[ModelValue], mfunctions: Set[ModelFunction], forbidden_element: Optional[ModelValue]) -> Set[ModelValue]:
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"""
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Given an initial set of model values and a set of model functions,
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compute the complete set of model values that are closed
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under the operations.
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If top or bottom is encountered, then we end the saturation procedure early.
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"""
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closure_set: Set[ModelValue] = initial_set
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last_new: Set[ModelValue] = initial_set
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changed: bool = True
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forbidden_found = False
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while changed:
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changed = False
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new_elements: Set[ModelValue] = set()
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old_closure: Set[ModelValue] = closure_set - last_new
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# arity -> args
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cached_args = defaultdict(list)
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# Pass elements into each model function
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for mfun in mfunctions:
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# If a previous function shared the same arity,
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# we'll use the same set of computed arguments
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# to pass into the model functions.
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if mfun.arity in cached_args:
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for args in cached_args[mfun.arity]:
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# Compute the new elements
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# given the cached arguments.
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element = mfun(*args)
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if element not in closure_set:
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new_elements.add(element)
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# Optimization: Break out of computation
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# early when top or bottom element is foun
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if forbidden_element is not None and element == forbidden_element:
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forbidden_found = True
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break
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if forbidden_found:
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break
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# We don't need to compute the arguments
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# thanks to the cache, so move onto the
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# next function.
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continue
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# At this point, we don't have cached arguments, so we need
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# to compute this set.
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# Each argument must have at least one new element to not repeat
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# work. We'll range over the number of new model values within our
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# argument.
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for num_new in range(1, mfun.arity + 1):
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new_args = combinations_with_replacement(last_new, r=num_new)
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old_args = combinations_with_replacement(old_closure, r=mfun.arity - num_new)
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# Determine every possible ordering of the concatenated
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# new and old model values.
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for new_arg, old_arg in product(new_args, old_args):
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for args in permutations(new_arg + old_arg):
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cached_args[mfun.arity].append(args)
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element = mfun(*args)
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if element not in closure_set:
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new_elements.add(element)
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# Optimization: Break out of computation
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# early when top or bottom element is foun
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if forbidden_element is not None and element == forbidden_element:
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forbidden_found = True
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break
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if forbidden_found:
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break
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if forbidden_found:
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break
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closure_set.update(new_elements)
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changed = len(new_elements) > 0
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last_new = new_elements
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if forbidden_found:
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break
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return closure_set
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