(1,0)-Super Solutions of (k,s)-CNF Formula

Fu, Zufeng; Xu, Duan; Wang, Yongping

doi:10.3390/e22020253

Cited by 3 publications

(5 citation statements)

References 13 publications

(16 reference statements)

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“…Therefore, we get ϕ(k, d) ≥ ϕ(k). Because the critical function ϕ(k) is an increasing function, proved in [27], we obtain ϕ(k, d) ≥ ϕ(k − 1). Any d-regular (k, s)-CNF formula obviously should be a (d + 1)-regular (k, s)-CNF formula, so we get ϕ(k, d) ≥ ϕ(k, d + 1).…”

Section: The Transitionmentioning

confidence: 79%

“…In [12], we proved that d-regular (k, s)-SAT also has the Transition Phenomenon from triviality (output the affirmative answer without computation) to NPcompleteness, and gave some favorable properties of the critical function f (k, d). In [27], we gave some existence conditions of a (1,0)-super solution, and pointed out that if there is an unsatisfiable (1,0)-(k, s)-SAT instance, then (1,0)-(k, s)-SAT problem is NP-complete for k > 3. That paper shows that the (1,0)-(k, s)-SAT problem also exhibits the Transition Phenomenon.…”

Section: Related Workmentioning

confidence: 99%

“…Therefore, if ϕ(k) < s, then ϕ(k, s − 2) < s. For d = ϕ(k) − 1, we get ϕ(k, d) = ϕ(k). According to some properties of the critical function f (k, d) and ϕ(k) presented in [12,27], we can obtain the following corollaries. Proof.…”

Section: The Transitionmentioning

confidence: 99%

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The Transition Phenomenon of (1,0)-d-Regular (k, s)-SAT

Wang

Liu

et al. 2022

Electronics

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For a d-regular (k,s)-CNF formula, a problem is to determine whether it has a (1,0)-super solution. If so, it is called (1,0)-d-regular (k,s)-SAT. A (1,0)-super solution is an assignment that satisfies at least two literals of each clause. When the value of any one of the variables is flipped, the (1,0)-super solution is still a solution. Super solutions have gained significant attention for their robustness. Here, a d-regular (k,s)-CNF formula is a special CNF formula with clauses of size exactly k, in which each variable appears exactly s-times, and the absolute frequency difference between positive and negative occurrences of each variable is at most a nonnegative integer d. Obviously, the structure of a d-regular (k,s)-CNF formula is much more regular than other formulas. In this paper, we certify that, for k≥5, there is a critical function φ(k,d) such that, if s≤φ(k,d), all d-regular (k,s)-CNF formulas have a (1,0)-super solution; otherwise (1,0)-d-regular (k,s)-SAT is NP-complete. By the Lopsided Local Lemma, we get an existence condition of (1,0)-super solutions and propose an algorithm to find the lower bound of φ(k,d).

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Section: The Transitionmentioning

confidence: 79%

Section: Related Workmentioning

confidence: 99%

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The Transition Phenomenon of (1,0)-d-Regular (k, s)-SAT

Wang

Liu

et al. 2022

Electronics

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“…([ 17 ]) . If the representation matrix of a formula F is

then the formula is satisfiable and every satisfying assignment forces all variables to a same value.…”

Section: Notationsmentioning

confidence: 99%

“…In order to further study SAT problems with regular structures, we introduced d -regular (

)-CNF formula in [ 16 , 17 ]. The regular (

)-CNF formula requires that each clause contains exactly k variables and each variable occurs in exactly s clauses.…”

Section: Introductionmentioning

confidence: 99%

Uniquely Satisfiable d-Regular (k,s)-SAT Instances

2020

Entropy

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Unique k-SAT is the promised version of k-SAT where the given formula has 0 or 1 solution and is proved to be as difficult as the general k-SAT. For any k ≥ 3 , s ≥ f ( k , d ) and ( s + d ) / 2 > k − 1 , a parsimonious reduction from k-CNF to d-regular (k,s)-CNF is given. Here regular (k,s)-CNF is a subclass of CNF, where each clause of the formula has exactly k distinct variables, and each variable occurs in exactly s clauses. A d-regular (k,s)-CNF formula is a regular (k,s)-CNF formula, in which the absolute value of the difference between positive and negative occurrences of every variable is at most a nonnegative integer d. We prove that for all k ≥ 3 , f ( k , d ) ≤ u ( k , d ) + 1 and f ( k , d + 1 ) ≤ u ( k , d ) . The critical function f ( k , d ) is the maximal value of s, such that every d-regular (k,s)-CNF formula is satisfiable. In this study, u ( k , d ) denotes the minimal value of s such that there exists a uniquely satisfiable d-regular (k,s)-CNF formula. We further show that for s ≥ f ( k , d ) + 1 and ( s + d ) / 2 > k − 1 , there exists a uniquely satisfiable d-regular ( k , s + 1 ) -CNF formula. Moreover, for k ≥ 7 , we have that u ( k , d ) ≤ f ( k , d ) + 1 .

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The NP-Completeness of (1,0)-Regular (k,s)-SAT

Wang

et al. 2022

2022 14th International Conference on Intelligent Human-Machine Systems and Cybernetics (IHMSC)

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(1,0)-Super Solutions of (k,s)-CNF Formula

Cited by 3 publications

References 13 publications

The Transition Phenomenon of (1,0)-d-Regular (k, s)-SAT

The Transition Phenomenon of (1,0)-d-Regular (k, s)-SAT

Uniquely Satisfiable d-Regular (k,s)-SAT Instances

The NP-Completeness of (1,0)-Regular (k,s)-SAT

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