AbstractIn this paper, we consider the problem of covering a set of strings S with a set C of substrings in S, where C is said to cover S if every string in S can be written as a concatenation of the substrings in C. We discuss applications for the problem that arise in the context of computational biology and formal language theory.We then proceed to show several hardness of approximation results for the problem, and in the main part of the paper, we focus on devising approximation algorithms using two generic paradigms—the local-ratio technique and linear programming rounding
AbstractA superstring of a set of strings {s1,…, sn} is a string s containing each si, 1 ⩽ i ⩽ n, as...
In this paper we introduce the notion of an optimal cover. Let M denote the maximum number of positi...
Computing approximate patterns in strings or sequences has important applications in DNA sequence an...
AbstractIn this paper, we consider the problem of covering a set of strings S with a set C of substr...
In this paper we consider the problem of covering a set of strings S with a set C of substrings in S...
In this paper, we consider the problem of covering a set of strings S with a set C of substrings in ...
A string cover C of a set of strings S is a set of substrings from S such that every string in S can...
Abstract-In this paper, we consider the problem of covering a set of strings S with a set of strings...
A factor u of a string y is a cover of y if every letter of y lies within some occurrence of u in y;...
We introduce subsequence covers (s-covers, in short), a new type of covers of a word. A word C is an...
AbstractThe object of the shortest common superstring problem (SCS) is to find the shortest possible...
We introduce subsequence covers (s-covers, in short), a new type of covers of a word. A word C is an...
This note corrects an error in a paper recently published in this journal (An optimal algorithm to ...
A nonempty circular string C(x) of length n is said to be covered by a set Uk of strings each of fix...
A superstring of a set of words P = {s_1, ..., s_p } is a string that contains each word of P as sub...
AbstractA superstring of a set of strings {s1,…, sn} is a string s containing each si, 1 ⩽ i ⩽ n, as...
In this paper we introduce the notion of an optimal cover. Let M denote the maximum number of positi...
Computing approximate patterns in strings or sequences has important applications in DNA sequence an...
AbstractIn this paper, we consider the problem of covering a set of strings S with a set C of substr...
In this paper we consider the problem of covering a set of strings S with a set C of substrings in S...
In this paper, we consider the problem of covering a set of strings S with a set C of substrings in ...
A string cover C of a set of strings S is a set of substrings from S such that every string in S can...
Abstract-In this paper, we consider the problem of covering a set of strings S with a set of strings...
A factor u of a string y is a cover of y if every letter of y lies within some occurrence of u in y;...
We introduce subsequence covers (s-covers, in short), a new type of covers of a word. A word C is an...
AbstractThe object of the shortest common superstring problem (SCS) is to find the shortest possible...
We introduce subsequence covers (s-covers, in short), a new type of covers of a word. A word C is an...
This note corrects an error in a paper recently published in this journal (An optimal algorithm to ...
A nonempty circular string C(x) of length n is said to be covered by a set Uk of strings each of fix...
A superstring of a set of words P = {s_1, ..., s_p } is a string that contains each word of P as sub...
AbstractA superstring of a set of strings {s1,…, sn} is a string s containing each si, 1 ⩽ i ⩽ n, as...
In this paper we introduce the notion of an optimal cover. Let M denote the maximum number of positi...
Computing approximate patterns in strings or sequences has important applications in DNA sequence an...