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Authors:
Brieden, Andreas; Cokus, Shawn 
Document type:
Zeitschriftenartikel / Journal Article 
Title:
On the hardness of efficiently computing maximal non-L submatrices 
Journal:
Linear Algebra and its Applications 
Volume:
377 
Year:
2004 
Pages from - to:
195-205 
Language:
Englisch 
Keywords:
L-matrix ; Inapproximability ; Approximation-preserving reductions ; 2-Sat Satisfiability ; Complexity ; Sign-solvability ; Qualitative linear algebra 
Abstract:
The sign pattern of a real matrix A is the matrix obtained by replacing each entry of A by its sign. A real matrix A is an L-matrix if every real matrix with the same sign pattern as A has linearly independent columns. L-matrices arise naturally in and are essential to the study of sign-solvability and related notions. In special cases, the L-matrix property has connections to the even dicycle problem, Pfaffian orientations, and Pólya’s permanent problem. Unfortunately, the problem of recognizin...    »
 
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Ja / Yes