6,838 research outputs found
3-Factor-criticality of vertex-transitive graphs
A graph of order is -factor-critical, where is an integer of the
same parity as , if the removal of any set of vertices results in a
graph with a perfect matching. 1-Factor-critical graphs and 2-factor-critical
graphs are factor-critical graphs and bicritical graphs, respectively. It is
well known that every connected vertex-transitive graph of odd order is
factor-critical and every connected non-bipartite vertex-transitive graph of
even order is bicritical. In this paper, we show that a simple connected
vertex-transitive graph of odd order at least 5 is 3-factor-critical if and
only if it is not a cycle.Comment: 15 pages, 3 figure
Cuts in matchings of 3-connected cubic graphs
We discuss conjectures on Hamiltonicity in cubic graphs (Tait, Barnette,
Tutte), on the dichromatic number of planar oriented graphs (Neumann-Lara), and
on even graphs in digraphs whose contraction is strongly connected
(Hochst\"attler). We show that all of them fit into the same framework related
to cuts in matchings. This allows us to find a counterexample to the conjecture
of Hochst\"attler and show that the conjecture of Neumann-Lara holds for all
planar graphs on at most 26 vertices. Finally, we state a new conjecture on
bipartite cubic oriented graphs, that naturally arises in this setting.Comment: 12 pages, 5 figures, 1 table. Improved expositio
Nash Williams Conjecture and the Dominating Cycle Conjecture
The disproved Nash Williams conjecture states that every 4-regular
4-connected graph has a hamiltonian cycle. We show that a modification of this
conjecture is equivalent to the Dominating Cycle Conjecture
On Cyclic Edge-Connectivity of Fullerenes
A graph is said to be cyclic -edge-connected, if at least edges must
be removed to disconnect it into two components, each containing a cycle. Such
a set of edges is called a cyclic--edge cutset and it is called a
trivial cyclic--edge cutset if at least one of the resulting two components
induces a single -cycle.
It is known that fullerenes, that is, 3-connected cubic planar graphs all of
whose faces are pentagons and hexagons, are cyclic 5-edge-connected. In this
article it is shown that a fullerene containing a nontrivial cyclic-5-edge
cutset admits two antipodal pentacaps, that is, two antipodal pentagonal faces
whose neighboring faces are also pentagonal. Moreover, it is shown that has
a Hamilton cycle, and as a consequence at least perfect matchings, where is the order of .Comment: 11 pages, 9 figure
Quantum Hall Ground States, Binary Invariants, and Regular Graphs
Extracting meaningful physical information out of a many-body wavefunction is
often impractical. The polynomial nature of fractional quantum Hall (FQH)
wavefunctions, however, provides a rare opportunity for a study by virtue of
ground states alone. In this article, we investigate the general properties of
FQH ground state polynomials. It turns out that the data carried by an FQH
ground state can be essentially that of a (small) directed graph/matrix. We
establish a correspondence between FQH ground states, binary invariants and
regular graphs and briefly introduce all the necessary concepts. Utilizing
methods from invariant theory and graph theory, we will then take a fresh look
on physical properties of interest, e.g. squeezing properties, clustering
properties, etc. Our methodology allows us to `unify' almost all of the
previously constructed FQH ground states in the literature as special cases of
a graph-based class of model FQH ground states, which we call \emph{accordion}
model FQH states
Expansion properties of a random regular graph after random vertex deletions
We investigate the following vertex percolation process. Starting with a
random regular graph of constant degree, delete each vertex independently with
probability p, where p=n^{-alpha} and alpha=alpha(n) is bounded away from 0. We
show that a.a.s. the resulting graph has a connected component of size n-o(n)
which is an expander, and all other components are trees of bounded size.
Sharper results are obtained with extra conditions on alpha. These results have
an application to the cost of repairing a certain peer-to-peer network after
random failures of nodes.Comment: 14 page
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