5 research outputs found
Pivots, Determinants, and Perfect Matchings of Graphs
We give a characterization of the effect of sequences of pivot operations on
a graph by relating it to determinants of adjacency matrices. This allows us to
deduce that two sequences of pivot operations are equivalent iff they contain
the same set S of vertices (modulo two). Moreover, given a set of vertices S,
we characterize whether or not such a sequence using precisely the vertices of
S exists. We also relate pivots to perfect matchings to obtain a
graph-theoretical characterization. Finally, we consider graphs with self-loops
to carry over the results to sequences containing both pivots and local
complementation operations.Comment: 16 page
Nullity Invariance for Pivot and the Interlace Polynomial
We show that the effect of principal pivot transform on the nullity values of
the principal submatrices of a given (square) matrix is described by the
symmetric difference operator (for sets). We consider its consequences for
graphs, and in particular generalize the recursive relation of the interlace
polynomial and simplify its proof.Comment: small revision of Section 8 w.r.t. v2, 14 pages, 6 figure
The Group Structure of Pivot and Loop Complementation on Graphs and Set Systems
We study the interplay between principal pivot transform (pivot) and loop
complementation for graphs. This is done by generalizing loop complementation
(in addition to pivot) to set systems. We show that the operations together,
when restricted to single vertices, form the permutation group S_3. This leads,
e.g., to a normal form for sequences of pivots and loop complementation on
graphs. The results have consequences for the operations of local
complementation and edge complementation on simple graphs: an alternative proof
of a classic result involving local and edge complementation is obtained, and
the effect of sequences of local complementations on simple graphs is
characterized.Comment: 21 pages, 7 figures, significant additions w.r.t. v3 are Thm 7 and
Remark 2
Maximal Pivots on Graphs with an Application to Gene Assembly
We consider principal pivot transform (pivot) on graphs. We define a natural
variant of this operation, called dual pivot, and show that both the kernel and
the set of maximally applicable pivots of a graph are invariant under this
operation. The result is motivated by and applicable to the theory of gene
assembly in ciliates.Comment: modest revision (including different latex style) w.r.t. v2, 16
pages, 5 figure