Conflict-Driven Clause Learning

In computer science, Conflict-Driven Clause Learning (CDCL) is an algorithm for solving the Boolean satisfiability problem (SAT). Given a Boolean formula, the SAT problem asks for an assignment of variables so that the entire formula evaluates to true. The internal workings of CDCL SAT solvers were inspired by DPLL solvers.

Conflict-Driven Clause Learning was proposed by Marques-Silva and Sakallah (1996,[1] 1999 [2]) and Bayardo and Schrag (1997 [3])

Background

Background knowledge about the following issues is needed to have a clear idea about the CDCL algorithm.

Boolean satisfiability problem

The satisfiability problem consists in finding a satisfying assignment for a given formula in conjunctive normal form (CNF).

An example of such a formula is:

( (not A) or (not C) )   and   (B or C),

or, using a common notation:

(A' + C') (B + C)

where A,B,C are Boolean variables, A', C', B, and C are literals, and A' + C' and B + C are clauses.

A satisfying assignment for this formula is e.g.:

A = False, B = False , C = True

since it makes the first clause true (since A' is true) as well as the second one (since C is true).

This examples uses three variables (A, B, C), and there are two possible assignments (True and False) for each of them. So one has  2^3 = 8 possibilities. In this small example, one can use brute-force search to try all possible assignments and check if they satisfy the formula. But in realistic appilcations with millions of variables and clauses brute force search is impractical. The responsibility of a SAT solver is to find a satisfying assignment efficiently and quickly by applying different heuristics for complex CNF formulas.

Unit clause rule (unit propagation)

Main article: Unit propagation

If an unsatisfied clause has all but one of its literals or variables evaluated at False, then the free literal must be True in order for the clause to be True. For example, if the below unsatisfied clause is evaluated with  A = False and  B = False we must have  C = True in order for the clause  (A \or B \or C ) to be true.

Boolean constraint propagation (BCP)

The iterated application of the unit clause rule is referred to as unit propagation or Boolean constraint propagation (BCP).

Resolution

Main article: Resolution (logic)

Consider two clauses  (A \or B \or C ) and  (A \or B \or \neg C ). By applying resolution refutation we get (A \or B),
by cancelling out  \neg C and  C.

DP algorithm

Davis, Putnam (1960) developed this algorithm. Some properties of this algorithms are:

  • Iteratively select variable for resolution till no more variable are left.
  • Can discard all original clauses after each iteration.

See more details here DP Algorithm

DPLL algorithm

Main article: DPLL algorithm

Davis, Putnam, Logemann, Loveland (1962) had developed this algorithm. Some properties of this algorithms are:

  • It is based on search.
  • It is the basis for almost all modern SAT solvers.
  • It uses learning and chronological back tracking (1996).

See more details here DPLL algorithm. An example with visualization of DPLL algorithm having chronological back tracking:

CDCL (Conflict-Driven Clause Learning)

The main difference of CDCL and DPLL is that CDCL's back jumping is non-chronological.

Conflict-Driven Clause Learning works as follows.

  1. Select a variable and assign True or False. This is called decision state. Remember the assignment.
  2. Apply Boolean constraint propagation (Unit propagation).
  3. Build the implication graph.
  4. If there is any conflict then analyze the conflict and non-chronologically backtrack ("back jump") to the appropriate decision level.
  5. Otherwise continue from step 1 until all variable values are assigned.

Example

A visual example of CDCL algorithm:

Completeness

DPLL is a sound and complete algorithm for SAT. CDCL SAT solvers implement DPLL, but can learn new clauses and backtrack non-chronologically. Clause learning with conflict analysis does not affect soundness or completeness. Conflict analysis identifies new clauses using the resolution operation. Therefore, each learnt clause can be inferred from the original clauses and other learnt clauses by a sequence of resolution steps. If cN is the new learnt clause, then ϕ is satisfiable if and only if ϕ ∪ {cN} is also satisfiable. Moreover, the modified backtracking step also does not affect soundness or completeness, since backtracking information is obtained from each new learnt clause.[4]

Applications

The main application of CDCL algorithm is in different SAT solvers including:

  • MiniSAT
  • Zchaff SAT
  • Z3
  • ManySAT etc.

The CDCL algorithm has made SAT solvers so powerful that they are being used effectively in several real world application areas like AI planning, bioinformatics, software test pattern generation, software package dependencies, hardware and software model checking, and cryptography.

Related algorithms

Related algorithms to CDCL are the DP and DPLL algorithm described before. The DP algorithm uses resolution refutation and it has potential memory access problem. Whereas the DPLL algorithm is OK for randomly generated instances, it is bad for instances generated in practical applications. CDCL is a more powerful approach to solve such problems in that applying CDCL provides less state space search in comparison to DPLL.

References

Wikimedia Commons has media related to Conflict-driven clause learning algorithm.
  1. J.P. Marques-Silva and Karem A. Sakallah (November 1996). "GRASP-A New Search Algorithm for Satisfiability". Digest of IEEE International Conference on Computer-Aided Design (ICCAD). pp. 220227.
  2. J.P. Marques-Silva and Karem A. Sakallah (May 1999). "GRASP: A Search Algorithm for Propositional Satisfiability" (PDF). IEEE Transactions on Computers 48 (5): 506521. doi:10.1109/12.769433.
  3. Roberto J. Bayardo Jr. and Robert C. Schrag (1997). "Using CSP look-back techniques to solve real world SAT instances" (PDF). Proc. 14th Nat. Conf. on Artificial Intelligence (AAAI). pp. 203–208.
  4. Biere, Heule, Van Maaren, Walsh (February 2009). Handbook of Satisfiability (PDF). IOS Press. p. 138. ISBN 978-1-60750-376-7.

Other material

Besides CDCL there are other approaches which are used to speed up SAT solvers. Some of them are:

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