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ALGORITHMICA
2007
2007
The Consecutive Ones Submatrix Problem for Sparse Matrices
A 0-1 matrix has the Consecutive Ones Property (C1P) if there is a permutation of its columns that leaves the 1’s consecutive in each row. The Consecutive Ones Submatrix (C1S) problem is, given a 0-1 matrix A, to find the largest number of columns of A that form a submatrix with the C1P property. Such a problem finds application in physical mapping with hybridization data in genome sequencing. Let (a, b)-matrices be the 0-1 matrices in which there are at most a 1’s in each column and at most b 1’s in each row. This paper proves that the C1S problem remains NP-hard for i) (2, 3)-matrices and ii) (3, 2)-matrices. This solves an open problem posed in a recent paper of Hajiaghayi and Ganjali [1]. We further prove that the C1S problem is polynomial-time 0.8-approximatable for (2, 3)-matrices in which no two columns are identical and 0.5-approximatable for (2, ∞)-matrices in general. we also show that the C1S problem is polynomial-time 0.5-approximatable for (3, 2)-matrices. Howev...
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| Added | 08 Dec 2010 |
| Updated | 08 Dec 2010 |
| Type | Journal |
| Year | 2007 |
| Where | ALGORITHMICA |
| Authors | Jinsong Tan, Louxin Zhang |
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