1,007 research outputs found
Flip Graphs of Degree-Bounded (Pseudo-)Triangulations
We study flip graphs of triangulations whose maximum vertex degree is bounded
by a constant . In particular, we consider triangulations of sets of
points in convex position in the plane and prove that their flip graph is
connected if and only if ; the diameter of the flip graph is .
We also show that, for general point sets, flip graphs of pointed
pseudo-triangulations can be disconnected for , and flip graphs of
triangulations can be disconnected for any . Additionally, we consider a
relaxed version of the original problem. We allow the violation of the degree
bound by a small constant. Any two triangulations with maximum degree at
most of a convex point set are connected in the flip graph by a path of
length , where every intermediate triangulation has maximum degree
at most .Comment: 13 pages, 12 figures, acknowledgments update
Transforming triangulations on non planar-surfaces
We consider whether any two triangulations of a polygon or a point set on a
non-planar surface with a given metric can be transformed into each other by a
sequence of edge flips. The answer is negative in general with some remarkable
exceptions, such as polygons on the cylinder, and on the flat torus, and
certain configurations of points on the cylinder.Comment: 19 pages, 17 figures. This version has been accepted in the SIAM
Journal on Discrete Mathematics. Keywords: Graph of triangulations,
triangulations on surfaces, triangulations of polygons, edge fli
The polytope of non-crossing graphs on a planar point set
For any finite set \A of points in , we define a
-dimensional simple polyhedron whose face poset is isomorphic to the
poset of ``non-crossing marked graphs'' with vertex set \A, where a marked
graph is defined as a geometric graph together with a subset of its vertices.
The poset of non-crossing graphs on \A appears as the complement of the star
of a face in that polyhedron.
The polyhedron has a unique maximal bounded face, of dimension
where is the number of points of \A in the interior of \conv(\A). The
vertices of this polytope are all the pseudo-triangulations of \A, and the
edges are flips of two types: the traditional diagonal flips (in
pseudo-triangulations) and the removal or insertion of a single edge.
As a by-product of our construction we prove that all pseudo-triangulations
are infinitesimally rigid graphs.Comment: 28 pages, 16 figures. Main change from v1 and v2: Introduction has
been reshape
Mutations and faces of the Thurston norm ball dynamically represented by multiple distinct flows
A pseudo-Anosov flow on a hyperbolic 3-manifold dynamically represents a face
F of the Thurston norm ball if the cone on F is dual to the cone spanned by
homology classes of closed orbits of the flow. Fried showed that for every
fibered face of the Thurston norm ball there is a unique, up to isotopy and
reparametrization, flow which dynamically represents the face. Using veering
triangulations we have found that there are non-fibered faces of the Thurston
norm ball which are dynamically represented by multiple topologically
inequivalent flows. This raises a question of how distinct flows representing
the same face are related.
We define combinatorial mutations of veering triangulations along surfaces
that they carry. We give sufficient and necessary conditions for the mutant
triangulation to be veering. After appropriate Dehn filling these veering
mutations correspond to transforming one 3-manifold M with a pseudo-Anosov flow
transverse to an embedded surface S into another 3-manifold admitting a
pseudo-Anosov flow transverse to a surface homeomorphic to S. We show that a
non-fibered face of the Thurston norm ball can be dynamically represented by
two distinct flows that differ by a veering mutation.Comment: 60 pages, 25 figure
Triangulating the Real Projective Plane
We consider the problem of computing a triangulation of the real projective
plane P2, given a finite point set S={p1, p2,..., pn} as input. We prove that a
triangulation of P2 always exists if at least six points in S are in general
position, i.e., no three of them are collinear. We also design an algorithm for
triangulating P2 if this necessary condition holds. As far as we know, this is
the first computational result on the real projective plane
A bijection for triangulations, quadrangulations, pentagulations, etc
A -angulation is a planar map with faces of degree . We present for
each integer a bijection between the class of -angulations of
girth (i.e., with no cycle of length less than ) and a class of
decorated plane trees. Each of the bijections is obtained by specializing a
"master bijection" which extends an earlier construction of the first author.
Our construction unifies known bijections by Fusy, Poulalhon and Schaeffer for
triangulations () and by Schaeffer for quadrangulations (). For
, both the bijections and the enumerative results are new. We also
extend our bijections so as to enumerate \emph{-gonal -angulations}
(-angulations with a simple boundary of length ) of girth . We thereby
recover bijectively the results of Brown for simple -gonal triangulations
and simple -gonal quadrangulations and establish new results for .
A key ingredient in our proofs is a class of orientations characterizing
-angulations of girth . Earlier results by Schnyder and by De Fraysseix
and Ossona de Mendez showed that simple triangulations and simple
quadrangulations are characterized by the existence of orientations having
respectively indegree 3 and 2 at each inner vertex. We extend this
characterization by showing that a -angulation has girth if and only if
the graph obtained by duplicating each edge times admits an orientation
having indegree at each inner vertex
The geometry of flip graphs and mapping class groups
The space of topological decompositions into triangulations of a surface has
a natural graph structure where two triangulations share an edge if they are
related by a so-called flip. This space is a sort of combinatorial
Teichm\"uller space and is quasi-isometric to the underlying mapping class
group. We study this space in two main directions. We first show that strata
corresponding to triangulations containing a same multiarc are strongly convex
within the whole space and use this result to deduce properties about the
mapping class group. We then focus on the quotient of this space by the mapping
class group to obtain a type of combinatorial moduli space. In particular, we
are able to identity how the diameters of the resulting spaces grow in terms of
the complexity of the underlying surfaces.Comment: 46 pages, 23 figure
Multitriangulations, pseudotriangulations and primitive sorting networks
We study the set of all pseudoline arrangements with contact points which
cover a given support. We define a natural notion of flip between these
arrangements and study the graph of these flips. In particular, we provide an
enumeration algorithm for arrangements with a given support, based on the
properties of certain greedy pseudoline arrangements and on their connection
with sorting networks. Both the running time per arrangement and the working
space of our algorithm are polynomial.
As the motivation for this work, we provide in this paper a new
interpretation of both pseudotriangulations and multitriangulations in terms of
pseudoline arrangements on specific supports. This interpretation explains
their common properties and leads to a natural definition of
multipseudotriangulations, which generalizes both. We study elementary
properties of multipseudotriangulations and compare them to iterations of
pseudotriangulations.Comment: 60 pages, 40 figures; minor corrections and improvements of
presentatio
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