Longest common parameterized subsequences with fixed common substring

Gorbenko, Anna; Popov, Vladimir

doi:10.12988/ams.2013.13057

Cited by 5 publications

(5 citation statements)

References 10 publications

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“…Another well-studied string comparison measure is that of parameterized matching, where two equal-length strings are a parameterized-match if there exists a bijection on the alphabets such that one string matches the other under the bijection (see e.g. [1,2]). For instance, it is considered the periodicity of parameterized strings.…”

Section: Abstract: Parameterized Supersequence Satisfiability Np-comentioning

confidence: 99%

On the shortest common parameterized supersequence problem

Gorbenko¹,

Popov²

2013

ams

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In this paper, we consider the problem of the shortest common parameterized supersequence. In particular, we consider an explicit reduction from the problem to the satisfiability problem. Keywords: parameterized supersequence, satisfiability, NP-completeThe well-known problem of the shortest common supersequence (SCS) is a classical distance measure for strings. Another well-studied string comparison measure is that of parameterized matching, where two equal-length strings are a parameterized-match if there exists a bijection on the alphabets such that one string matches the other under the bijection (see e.g. [1,2]). For instance, it is considered the periodicity of parameterized strings. These results and some other studies about the periodicity of parameterized strings showed considerable differences between parameterized strings and ordinary strings.

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Section: Abstract: Parameterized Supersequence Satisfiability Np-comentioning

confidence: 99%

On the shortest common parameterized supersequence problem

Gorbenko¹,

Popov²

2013

ams

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“…A well-studied string comparison measure is that of parameterized matching (basic definitions and results can be found in [1]). In particular, the problem of the longest common parameterized subsequence with fixed common substring (STR-IC-LCPS) was proposed in [2]. In this paper we consider the problem of the longest common parameterized subsequence with parameterized common substring (PSTR-IC-LCPS).…”

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confidence: 99%

“…Note that if P is a string over Σ, then an instance of PSTR-IC-LCPS is an instance of STR-IC-LCPS. Therefore, in view of NP-completeness of STR-IC-LCPS (see [2]), it is easy to see that PSTR-IC-LCPS is NP-complete. Encoding different hard problems as instances of different variants of the satisfiability problem and solving them with very efficient satisfiability algorithms has caused considerable interest (see e.g.…”

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confidence: 99%

“…We have designed generators of natural instances for PSTR-IC-LCPS. We consider our genetic algorithms OA [1] (see [23]), OA [2] (see [24]), OA [3] (see [25]), and OA [4] (see [26]) for SAT. We used heterogeneous cluster.…”

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confidence: 99%

“…Note that due to restrictions on computation time (20 hours) we used savepoints. Selected experimental results are given in Table 1. time average max best OA [1] 2.63 h 33.54 h 23.81 min OA [2] 3.61 h 39.12 h 27.14 min OA [3] 4.26 h 43.28 h 24.29 min OA [4] 3.78 h 28.72 h 17.43 min Table 1: Experimental results for PSTR-IC-LCPS.…”

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confidence: 99%

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Longest common parameterized subsequences with parameterized common substring

Gorbenko¹,

Popov²

2013

ams

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Restricted common superstrings

Gorbenko¹,

Popov²

2013

ams

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In this paper we consider an approach to solve the restricted common superstring problem. This approach is based on an explicit reduction from the problem to the satisfiability problem.Keywords: restricted common superstring, NP-complete, satisfiabilityComputational complexity of different problems of finding regularities and efficient algorithms for these problems are thoroughly studied in theoretical computer science (see e.g. [1] -[6]). In particular, complexity of the restricted common superstring problem and some approximation algorithms for the problem was considered in [7,8].Let Σ = {a 1 , . . . , a m } be a finite alphabet. Let S = {S 1 , . . . , S n } be a set of strings over Σ. We assume that S[i] is the ith letter in string S. Also, we assume that S [i, j] is the substring of S consisting of the ith letter through the jth letter. The length of a string S is the number of letters in it. We assume that |S| is the length of S. We use #occ(X, Y ) to denote |{i | X = Y [i, j]}|.

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Longest common parameterized subsequences with fixed common substring

Cited by 5 publications

References 10 publications

On the shortest common parameterized supersequence problem

On the shortest common parameterized supersequence problem

Longest common parameterized subsequences with parameterized common substring

Restricted common superstrings

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