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A.7 library(clpb): CLP(B): Constraint Logic Programming over Boolean Variables
- author
- Markus Triska
A.7.1 Introduction
This library provides CLP(B), Constraint Logic Programming over Boolean variables. It can be used to model and solve combinatorial problems such as verification, allocation and covering tasks.
CLP(B) is an instance of the general CLP(X) scheme (section 7), extending logic programming with reasoning over specialised domains.
The implementation is based on reduced and ordered Binary Decision Diagrams (BDDs).
Benchmarks and usage examples of this library are available from:
https://
www.metalevel.at/clpb/
We recommend the following reference for citing this library in scientific publications:
@inproceedings{Triska2016, author = "Markus Triska", title = "The {Boolean} Constraint Solver of {SWI-Prolog}: System Description", booktitle = "FLOPS", series = "LNCS", volume = 9613, year = 2016, pages = "45--61" }
The paper is available from
https://
www.metalevel.at/swiclpb.pdf
A.7.2 Boolean expressions
A Boolean expression is one of:
0
false 1
true variable unknown truth value atom universally quantified variable ~
Exprlogical NOT Expr + Expr logical OR Expr * Expr logical AND Expr # Expr exclusive OR Var ^
Exprexistential quantification Expr =:=
Exprequality Expr =\=
Exprdisequality (same as #) Expr =<
Exprless or equal (implication) Expr >=
Exprgreater or equal Expr < Expr less than Expr > Expr greater than card(Is,Exprs)
see below +(Exprs)
see below *(Exprs)
see below
where Expr again denotes a Boolean expression.
The Boolean expression card(Is,Exprs)
is true iff the
number of true expressions in the list Exprs is a member of
the list Is of integers and integer ranges of the form From-To
.
+(Exprs)
and *(Exprs)
denote, respectively,
the disjunction and conjunction of all elements in the list Exprs
of Boolean expressions.
Atoms denote parametric values that are universally quantified. All universal quantifiers appear implicitly in front of the entire expression. In residual goals, universally quantified variables always appear on the right-hand side of equations. Therefore, they can be used to express functional dependencies on input variables.
A.7.3 Interface predicates
The most frequently used CLP(B) predicates are:
- sat(+Expr)
- True iff the Boolean expression Expr is satisfiable.
- taut(+Expr, -T)
- If Expr is a tautology with respect to the posted constraints, succeeds with T = 1. If Expr cannot be satisfied, succeeds with T = 0. Otherwise, it fails.
- labeling(+Vs)
- Assigns truth values to the variables Vs such that all constraints are satisfied.
The unification of a CLP(B) variable X with a term T is
equivalent to posting the constraint sat(X=:=T)
.
A.7.4 Examples
Here is an example session with a few queries and their answers:
?- use_module(library(clpb)). true. ?- sat(X*Y). X = Y, Y = 1. ?- sat(X * ~X). false. ?- taut(X * ~X, T). T = 0, sat(X=:=X). ?- sat(X^Y^(X+Y)). sat(X=:=X), sat(Y=:=Y). ?- sat(X*Y + X*Z), labeling([X,Y,Z]). X = Z, Z = 1, Y = 0 ; X = Y, Y = 1, Z = 0 ; X = Y, Y = Z, Z = 1. ?- sat(X =< Y), sat(Y =< Z), taut(X =< Z, T). T = 1, sat(X=:=X*Y), sat(Y=:=Y*Z). ?- sat(1#X#a#b). sat(X=:=a#b).
The pending residual goals constrain remaining variables to Boolean expressions and are declaratively equivalent to the original query. The last example illustrates that when applicable, remaining variables are expressed as functions of universally quantified variables.
A.7.5 Obtaining BDDs
By default, CLP(B) residual goals appear in (approximately) algebraic
normal form (ANF). This projection is often computationally expensive.
We can set the Prolog flag clpb_residuals
to the value bdd
to see the BDD representation of all constraints. This results in faster
projection to residual goals, and is also useful for learning more about
BDDs. For example:
?- set_prolog_flag(clpb_residuals, bdd). true. ?- sat(X#Y). node(3)- (v(X, 0)->node(2);node(1)), node(1)- (v(Y, 1)->true;false), node(2)- (v(Y, 1)->false;true).
Note that this representation cannot be pasted back on the toplevel, and its details are subject to change. Use copy_term/3 to obtain such answers as Prolog terms.
The variable order of the BDD is determined by the order in which the variables first appear in constraints. To obtain different orders, we can for example use:
?- sat(+[1,Y,X]), sat(X#Y). node(3)- (v(Y, 0)->node(2);node(1)), node(1)- (v(X, 1)->true;false), node(2)- (v(X, 1)->false;true).
A.7.6 Enabling monotonic CLP(B)
In the default execution mode, CLP(B) constraints are not monotonic. This means that adding constraints can yield new solutions. For example:
?- sat(X=:=1), X = 1+0. false. ?- X = 1+0, sat(X=:=1), X = 1+0. X = 1+0.
This behaviour is highly problematic from a logical point of view, and it may render declarative debugging techniques inapplicable.
Set the flag clpb_monotonic
to true
to make
CLP(B) monotonic. If this mode is enabled, then you must wrap
CLP(B) variables with the functor v/1
. For example:
?- set_prolog_flag(clpb_monotonic, true). true. ?- sat(v(X)=:=1#1). X = 0.
A.7.7 Example: Pigeons
In this example, we are attempting to place I pigeons into J
holes in such a way that each hole contains at most one pigeon. One
interesting property of this task is that it can be formulated using
only cardinality constraints (card/2
). Another
interesting aspect is that this task has no short resolution refutations
in general.
In the following, we use Prolog DCG notation to describe a list Cs of CLP(B) constraints that must all be satisfied.
:- use_module(library(clpb)). :- use_module(library(clpfd)). pigeon(I, J, Rows, Cs) :- length(Rows, I), length(Row, J), maplist(same_length(Row), Rows), transpose(Rows, TRows), phrase((all_card1(Rows),all_max1(TRows)), Cs). all_card1([]) --> []. all_card1([Ls|Lss]) --> [card([1],Ls)], all_card1(Lss). all_max1([]) --> []. all_max1([Ls|Lss]) --> [card([0,1],Ls)], all_max1(Lss).
Example queries:
?- pigeon(9, 8, Rows, Cs), sat(*(Cs)). false. ?- pigeon(2, 3, Rows, Cs), sat(*(Cs)), append(Rows, Vs), labeling(Vs), maplist(portray_clause, Rows). [0, 0, 1]. [0, 1, 0].
A.7.8 Example: Boolean circuit
Consider a Boolean circuit that express the Boolean function XOR
with 4 NAND
gates. We can model such a circuit with CLP(B)
constraints as follows:
:- use_module(library(clpb)). nand_gate(X, Y, Z) :- sat(Z =:= ~(X*Y)). xor(X, Y, Z) :- nand_gate(X, Y, T1), nand_gate(X, T1, T2), nand_gate(Y, T1, T3), nand_gate(T2, T3, Z).
Using universally quantified variables, we can show that the circuit
does compute XOR
as intended:
?- xor(x, y, Z). sat(Z=:=x#y).
A.7.9 Acknowledgments
The interface predicates of this library follow the example of SICStus Prolog.
Use SICStus Prolog for higher performance in many cases.
A.7.10 CLP(B) predicate index
In the following, each CLP(B) predicate is described in more detail.
We recommend the following link to refer to this manual:
http://eu.swi-prolog.org/man/clpb.html
- [semidet]sat(+Expr)
- True iff Expr is a satisfiable Boolean expression.
- [semidet]taut(+Expr, -T)
- Tautology check. Succeeds with T = 0 if the Boolean expression Expr cannot be satisfied, and with T = 1 if Expr is always true with respect to the current constraints. Fails otherwise.
- [multi]labeling(+Vs)
- Enumerate concrete solutions. Assigns truth values to the Boolean variables Vs such that all stated constraints are satisfied.
- [det]sat_count(+Expr, -Count)
- Count the number of admissible assignments. Count
is the number of different assignments of truth values to the variables
in the Boolean expression Expr, such that Expr is
true and all posted constraints are satisfiable.
A common form of invocation is
sat_count(+[1|Vs], Count)
: This counts the number of admissible assignments to Vs without imposing any further constraints.Examples:
?- sat(A =< B), Vs = [A,B], sat_count(+[1|Vs], Count). Vs = [A, B], Count = 3, sat(A=:=A*B). ?- length(Vs, 120), sat_count(+Vs, CountOr), sat_count(*(Vs), CountAnd). Vs = [...], CountOr = 1329227995784915872903807060280344575, CountAnd = 1.
- [multi]weighted_maximum(+Weights, +Vs, -Maximum)
- Enumerate weighted optima over admissible assignments. Maximize a linear
objective function over Boolean variables Vs with integer
coefficients Weights. This predicate assigns 0 and 1 to the
variables in Vs such that all stated constraints are
satisfied, and
Maximum is the maximum of
sum(Weight_i*V_i)
over all admissible assignments. On backtracking, all admissible assignments that attain the optimum are generated.This predicate can also be used to minimize a linear Boolean program, since negative integers can appear in Weights.
Example:
?- sat(A#B), weighted_maximum([1,2,1], [A,B,C], Maximum). A = 0, B = 1, C = 1, Maximum = 3.
- [det]random_labeling(+Seed, +Vs)
- Select a single random solution. An admissible assignment of truth values to the Boolean variables in Vs is chosen in such a way that each admissible assignment is equally likely. Seed is an integer, used as the initial seed for the random number generator.