# Tagged Questions

Satisfiability (often written in all capitals or abbreviated SAT) is the problem of determining if the variables of a given Boolean formula can be assigned in such a way as to make the formula evaluate to TRUE.

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### Convert Boolean FlatZinc to CNF DIMACS

To solve a set of Boolean equations, I am experimenting with the Constraint-Programming Solver MiniZinc using the following input: % Solve system of Brent's equations modulo 2 % Matrix dimensions ...
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### Weird error with syntax

Just experimenting with smtlib. I'm not seeing whats wrong with the following... (set-logic BV) (declare-fun var1 () (_ BitVec 32)) ; a is a constant (declare-fun var2 () (_ BitVec 32)) ; a is a ...
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### Subgraph isomorphism to SAT

The Subgraph Isomorphism (SI) problem is a computational task in which two graphs G and H are given as input, and one must determine whether G contains a subgraph that is isomorphic to H. This is a ...
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### GSAT incompleteness example

The GSAT (Greedy Satisfiability) algorithm can be used to find a solution to a search problem encoded in CNF. I'm aware that since GSAT is greedy, it is incomplete (which means there would be cases ...
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### SAT Solving for Optimization

Suppose you have a CNF formula with some variables marked special. Is there a way to make a SAT Solver (say, minisat) find a solution maximizing the number of special variables assigned to true?
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### Verify Combinatorial CNF SAT Encodings?

I am trying to solve a combinatorial problem by using a SAT Solver. This involves the following steps: Encode the problem as set of boolean expressions. Translate a conjunction of the ...
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### Haskell: binding to fast and simple SAT solver

Today I wanted too look into options on SAT solving in haskell. First I tought about writing my own interface to the picosat solver. Then I found out there is the SBV library. It's interfaces to Z3, ...
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### Can a SAT solver be used to find all solutions?

I wrote an answer to what I thought was a quite interesting question, but unfortunately the question was deleted by its author before I could post. I'm reposting a summary of the question and my ...
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### SAT solvers to determine features of multivariate functions?

The Boolean Satisfiabiity problem is a generalization for checking the satisfiability of a boolean expression. Now the boolean expression is generated by the nonnegativity algorithm of a polynomial. ...
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### SAT-Solving a system of one-hot constraints [closed]

I'm trying to solve a SAT problem that consists of one-hot constraints only. Right now I'm using the one-hot encoding proposed by Claessen in Sec. 4.2 of [1] and MiniSAT. I wonder if there is a ...
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### Picosat SAT solver: set the propagation limit — but what value?

From the API: /* As alternative to a decision limit you can use the number of propagations * as limit. This is more linearly related to execution time. This has to * be called after 'picosat_init' ...
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### How Max-SMT solvers do work?

SMT solvers are developed at deal with the satisfiability similar like SAT. As we known, SAT is also for satisfiability and variants of SAT are proposed. One of them is max-SAT. So I want to ask ...
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### What is a clause when talking about CSP/SAT?

Here is the question: Consider the following rules and definitions for a sports league scheduling problem: N (even) teams, and every two teams play each other exactly once during season. The ...
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### 3-sat and Tutte polynomial

Please consider the following 3-SAT instance and the corresponding graph The graph can be displayed in other two forms The Tutte polynomial for this graph is The independence number of the ...
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### Does the SMT-Lib standard support the combination of theories?

I know that several works are trying to deal with the combination of theories in SMT. However, the SMT-Lib 2.0 language (http://smtlib.cs.uiowa.edu/docs.html) doesn't say anything regarding this ...
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### Boolean formula encoding

i am wondering how many bits required to encode a boolean formula like @(x1,x2,x3,x4) = (x1 OR x2 OR NOT(x3) OR x4) AND ((NOT)x2 OR x3) AND (x1 OR (NOT)x4) @ is an instance of SAT. I think it ...
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### Checking satisfiability of expression tree

I'm trying to look for a practical way (e.g. in terms of engineering effort) of solving a problem, where I have a bunch of unknown values: val a: Int32 = ??? val c: Int32 = ??? val d: Bool = ??? ...
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### Dpll, SAT (satisfability) probl, Need DPLL Function or Procedure? [closed]

here is my problem, i stucked in Matlab with SAT Problem (Satisfability) Actually i need a function called DPLL, i saw it somewhere here but its in java, can anyone help me please?? Thanks
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### How can I find a solution of binary matrix equation AX = B?

Given an m*n binary matrix A, m*p binary matrix B, where n > m what is an efficient algorithm to compute X such that AX=B? For example: A = 1 1 0 0 1 1 0 1 0 0 1 1 0 0 1 0 1 0 0 ...
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### Wrong result from z3

I'm trying to proof the following with Z3 SMT Solver: ((x*x) + x) = ((~x * ~x) + ~x). This is correct, because of overflow semantic in the c programming language. Now I have written the following ...
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### Sets of equalities and inequalities constraint satisfiability problem

I am relatively new to CSPs and I am trying to find the value of all the variables from their respective domains, based on ==, >, < and != constraints imposed between the variables. I looked at ...
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### How does skolemisation of lone EXISTS clauses work?

If I have a formula like: FAx FAy (Ez(!A(x,z) v !A(y,z)) v B(x,y)) (FA = For All / E = Exists) The rules of skolemisation say that: if E is outside FA replace with a constant or if E is inside ...
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### smallest independent set

Given a set s of formula, I want to find a smallest subset s' of s that implies every formula in s. I call s the smallest independent set because for every pair a,b in s' , a does not imply b and ...
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### A hash function for SAT preprocessing

During preprocessing of a SAT instance consisting of a clause database, every variable needs to be assigned a word. A hash function returns for each variable a 32-bit word only consisting of 0â€™s ...
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### proving a 3CNF related prob. is in P [closed]

I need help proving that this problem is decidable in polynomial-time: Input: a 3CNF formula with more than one clause. Question: can the formula be divided into two satisfiable 3CNF formulas ? ...
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### Boolean satisfiability - algorithm

I have a boolean formula: (x_{1} or x_{2}) and (x_{3} or x_{4}) and ..... and (x_{2r-1} or x_{2r}), where x_{i} belongs to the set: {p_{1}, p_{2}, ... p_{99} , ~p_{1}, ~p_{2}, ... ~p_{99} } and I have ...
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### What's the advantage of SMT-solver over CSP-solver in constraint solving?

SMT-Solver can be used for constraint solving. As we known, CSP solvers are also for constraint solving for many years. So what's the advantage of SMT-solver over CSP solvers?
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### Does any body knows or has a greedy satisfiability(GSAT) and simulated annealing satisfabiilty(SA-SAT) java algorithm?

I am looking for a GSAT and SA-SAT algorithm implemented in java. Does any body know about one? Thank you.
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### Compilers that translate verification algorithms into SAT problems

The proof that SAT is NP-complete is a constructive proof, so it should be possible to implement it as a program. Has anyone done this? I'm looking for a program (a compiler), that takes as input a ...
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### Propositional logic

I have the following problem: I have two propositional formulas that must become logically equivalent. Only, one of them contains a 'variable', in the sense that the variable may be replaced by any ...
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### SAT/CNF optimization

Problem I'm looking at a special subset of SAT optimization problem. For those not familiar with SAT and related topics, here's the related Wikipedia article. TRUE=(a OR b OR c OR d) AND (a OR f) ...
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### Special cases of SAT and corresponding #SAT with complexity a most O(n^2) AND that have efficient algorithms for generating instances?

I am interested in learning about special cases of boolean satisfiability problems that are known to be polynomial (or more realistically, O(N^2)). These cases should also have efficient algorithm for ...