70 research outputs found
A bandwidth theorem for approximate decompositions
We provide a degree condition on a regular -vertex graph which ensures
the existence of a near optimal packing of any family of bounded
degree -vertex -chromatic separable graphs into . In general, this
degree condition is best possible.
Here a graph is separable if it has a sublinear separator whose removal
results in a set of components of sublinear size. Equivalently, the
separability condition can be replaced by that of having small bandwidth. Thus
our result can be viewed as a version of the bandwidth theorem of B\"ottcher,
Schacht and Taraz in the setting of approximate decompositions.
More precisely, let be the infimum over all
ensuring an approximate -decomposition of any sufficiently large regular
-vertex graph of degree at least . Now suppose that is an
-vertex graph which is close to -regular for some and suppose that is a sequence of bounded
degree -vertex -chromatic separable graphs with . We show that there is an edge-disjoint packing of
into .
If the are bipartite, then is sufficient. In
particular, this yields an approximate version of the tree packing conjecture
in the setting of regular host graphs of high degree. Similarly, our result
implies approximate versions of the Oberwolfach problem, the Alspach problem
and the existence of resolvable designs in the setting of regular host graphs
of high degree.Comment: Final version, to appear in the Proceedings of the London
Mathematical Societ
Hamilton cycles in graphs and hypergraphs: an extremal perspective
As one of the most fundamental and well-known NP-complete problems, the
Hamilton cycle problem has been the subject of intensive research. Recent
developments in the area have highlighted the crucial role played by the
notions of expansion and quasi-randomness. These concepts and other recent
techniques have led to the solution of several long-standing problems in the
area. New aspects have also emerged, such as resilience, robustness and the
study of Hamilton cycles in hypergraphs. We survey these developments and
highlight open problems, with an emphasis on extremal and probabilistic
approaches.Comment: to appear in the Proceedings of the ICM 2014; due to given page
limits, this final version is slightly shorter than the previous arxiv
versio
Edge-decompositions of graphs with high minimum degree
A fundamental theorem of Wilson states that, for every graph , every
sufficiently large -divisible clique has an -decomposition. Here a graph
is -divisible if divides and the greatest common divisor
of the degrees of divides the greatest common divisor of the degrees of
, and has an -decomposition if the edges of can be covered by
edge-disjoint copies of . We extend this result to graphs which are
allowed to be far from complete. In particular, together with a result of
Dross, our results imply that every sufficiently large -divisible graph of
minimum degree at least has a -decomposition. This
significantly improves previous results towards the long-standing conjecture of
Nash-Williams that every sufficiently large -divisible graph with minimum
degree at least has a -decomposition. We also obtain the
asymptotically correct minimum degree thresholds of for the
existence of a -decomposition, and of for the existence of a
-decomposition, where . Our main contribution is a
general `iterative absorption' method which turns an approximate or fractional
decomposition into an exact one. In particular, our results imply that in order
to prove an asymptotic version of Nash-Williams' conjecture, it suffices to
show that every -divisible graph with minimum degree at least
has an approximate -decomposition,Comment: 41 pages. This version includes some minor corrections, updates and
improvement
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