Permanents, Pfaffian orientations, and even directed circuits

Neil Robertson, P.D. Seymour and Robin Thomas

Review from Zentralblatt MATH:

The paper deals with the following problem asked by Pólya in 1913: Given a 0-1 matrix $A$, is there a matrix $B$ obtained from $A$ by changing signs of some $1$'s to $-1$'s so that the permanent of $A$ equals the determinant of $B$? Such $B$ is called a Pólya matrix for $A$. The paper provides a structural characterization of matrices for which Pólya's matrices exist. This characterization is used to construct a polynomial-time algorithm to decide whether a matrix has its Pólya matrix.

Reviewed by M.Truszczynski

Keywords: Pfaffian orientations; permanent; determinant; Pólya matrix; characterization; polynomial-time algorithm

Classification (MSC2000): 05C75 15A15 05C85 68Q25 68R10 05C70 05C38 05B20 05C20

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