In implementing a SAT solver, it seems reasonable to create a class of clauses and a class for literals, where clauses are arrays of literals and whole formulas are arrays of clauses.

For instance, here is the literal class:

public class Literal {

//values in enum type? (1:true), (0:false), (-1:unassigned)

private int value;
final String name; 

//make sure to include double check
public void toFalse(){
    if{}//has negation 
    //check what negation value is
    //if negation is unassigned, then can assign, and assign negation also
    value = 0;
}

public void toTrue(){
    if{}
    value = 1;
}

Literal(String n){
    name = n;
    value = -1;
}

public String getName(){
    return name;
}

public int getValue(){
    //if first three letters are "not", then return negated value, else return value
    //if(name.contains("not")){
    //  return negate();
    //}
    //else return value;
    return value;
}

//to construct the negation of a literal    
public int negate(){

    if (value == 0){
        return 1;
    }
    else if (value == -1){
        return -1;
    }else return 0;
}

public boolean hasNegation(Literal[] metaliterals){
    if (name.matches("(not)[a-z]{1}")){
        //how to take the letter part out of name and compare it to see if it is in metaliterals
    }}}

As you can see, my approach right now is to think of negation as a method defined on an instance of the literal class. However, this approach would mean that a literal and its negation are tied together -- not allowing independence of objects.

The problem I am having is how to understand the relationship of a literal and its negation in such a way that 1) most elegantly uses Object-oriented design, and 2) makes the DPLL algorithm as clear as possible.

Put another way: when parsing an input in CNF, should I create one literal object and call a negate method whenever "Not" appears, or should I think of a literal and its negation as "linked"?

  • 2
    While you can do this, the typical implementation of a literal or its negation is an int – harold Dec 3 '17 at 18:07

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