Your search keyword '"Dewar, Sean"' showing total 105 results

1. Spanning disks in triangulations of surfaces

Author

Clinch, Katie, Dewar, Sean, Fuladi, Niloufar, Gorsky, Maximilian, Huynh, Tony, Kastis, Eleftherios, Nixon, Anthony, and Servatius, Brigitte

Subjects

Mathematics - Combinatorics, Computer Science - Discrete Mathematics, 57Kxx, 05C10, G.2.2

Abstract

Given a triangulation $G$ of a surface $\mathbb{D}$, a spanning disk is a disk $\mathbb{D} \subseteq \mathbb{S}$ containing all the vertices of $G$ such that the boundary of $\mathbb{D}$ is a cycle of $G$. In this paper, we consider the question of when a triangulation of a surface contains a spanning disk. We give a very short proof that every triangulation of the torus contains a spanning disk, which strengthens a theorem of Nevo and Tarabykin. For arbitrary surfaces, we prove that triangulations with sufficiently high facewidth always contain spanning disks. Finally, we exhibit triangulations which do not have spanning disks. This shows that a minimum facewidth condition is necessary. Our results are motivated by and have applications for rigidity questions in the plane., Comment: 7 pages, 2 figures

Published

2024

2. Constructing reflection-symmetric flexible realisations of graphs

Author

Dewar, Sean, Grasegger, Georg, and Legerský, Jan

Subjects

Mathematics - Combinatorics, 52C25, 70B15, 05C70

Abstract

We study reflection-symmetric realisations of symmetric graphs in the plane that allow a continuous symmetry and edge-length preserving deformation. To do so, we identify a necessary combinatorial condition on graphs with reflection-symmetric flexible realisations. This condition is based on a specific type of edge colouring, where edges are assigned one of three colours in a symmetric way. From some of these colourings we also construct concrete reflection-symmetric realisations with their corresponding symmetry preserving motion. We study also a specific class of reflection-symmetric realisations consisting of triangles and parallelograms.

Published

2024

3. Single-cell 3D genome reconstruction in the haploid setting using rigidity theory

Author

Dewar, Sean, Grasegger, Georg, Kubjas, Kaie, Mohammadi, Fatemeh, and Nixon, Anthony

Subjects

Quantitative Biology - Genomics, Mathematics - Combinatorics, Mathematics - Metric Geometry, Mathematics - Optimization and Control

Abstract

This article considers the problem of 3-dimensional genome reconstruction for single-cell data, and the uniqueness of such reconstructions in the setting of haploid organisms. We consider multiple graph models as representations of this problem, and use techniques from graph rigidity theory to determine identifiability. Biologically, our models come from Hi-C data, microscopy data, and combinations thereof. Mathematically, we use unit ball and sphere packing models, as well as models consisting of distance and inequality constraints. In each setting, we describe and/or derive new results on realisability and uniqueness. We then propose a 3D reconstruction method based on semidefinite programming and apply it to synthetic and real data sets using our models.

Published

2024

4. Edge-length preserving embeddings of graphs between normed spaces

Author

Dewar, Sean, Kastis, Eleftherios, Kitson, Derek, and Sims, William

Subjects

Mathematics - Metric Geometry, Mathematics - Combinatorics, 05C10 (Primary) 52A21, 52C25 (Secondary)

Abstract

The concept of graph flattenability, initially formalized by Belk and Connelly and later expanded by Sitharam and Willoughby, extends the question of embedding finite metric spaces into a given normed space. A finite simple graph $G=(V,E)$ is said to be $(X,Y)$-flattenable if any set of induced edge lengths from an embedding of $G$ into a normed space $Y$ can also be realised by an embedding of $G$ into a normed space $X$. This property, being minor-closed, can be characterized by a finite list of forbidden minors. Following the establishment of fundamental results about $(X,Y)$-flattenability, we identify sufficient conditions under which it implies independence with respect to the associated rigidity matroids for $X$ and $Y$. We show that the spaces $\ell_2$ and $\ell_\infty$ serve as two natural extreme spaces of flattenability and discuss $(X, \ell_p )$-flattenability for varying $p$. We provide a complete characterization of $(X,Y)$-flattenable graphs for the specific case when $X$ is 2-dimensional and $Y$ is infinite-dimensional., Comment: 21 pages, 3 figures

Published

2024

5. Angular constraints on planar frameworks

Author

Dewar, Sean, Grasegger, Georg, Nixon, Anthony, Rosen, Zvi, Sims, William, Sitharam, Meera, and Urizar, David

Subjects

Mathematics - Combinatorics, Mathematics - Metric Geometry, 52C25 (Primary) 05C10, 52C35 (Secondary)

Abstract

Consider a collection of points and the sets of slopes or directions of the lines between pairs of points. It is known that the algebraic matroid on this set of elements is the well studied 2-dimensional rigidity matroid. This article analyzes a construction on top of the set of slopes given by an angle constraint system of incidences and angles. In this setting we provide a matricial rigidity formulation of the problem for colored graphs, an algebro-geometric reformulation, precise necessary conditions and a combinatorial characterization of the generic behaviour for a special case., Comment: 27 pages, 7 figures, 3 tables

Published

2024

6. Extremal decompositions of tropical varieties and relations with rigidity theory

Author

Babaee, Farhad, Dewar, Sean, and Maxwell, James

Subjects

Mathematics - Algebraic Geometry, Mathematics - Combinatorics, Mathematics - Metric Geometry, 14T10 (Primary) 14T15, 52C25 (Secondary)

Abstract

Extremality and irreducibility constitute fundamental concepts in mathematics, particularly within tropical geometry. While extremal decomposition is typically computationally hard, this article presents a fast algorithm for identifying the extremal decomposition of tropical varieties with rational balanced weightings. Additionally, we explore connections and applications related to rigidity theory. In particular, we prove that a tropical hypersurface is extremal if and only if it has a unique reciprocal diagram up to homothety., Comment: 30 pages, 12 figures

Published

2024

7. Rigidity of nearly planar classes of graphs

Author

Dewar, Sean, Grasegger, Georg, Kastis, Eleftherios, Nixon, Anthony, and Servatius, Brigitte

Subjects

Mathematics - Combinatorics, Mathematics - Metric Geometry, 52C25 (Primary) O5C10, 62H22 (Secondary)

Abstract

We explore the rigidity of generic frameworks in 3-dimensions whose underlying graph is close to being planar. Specifically we consider apex graphs, edge-apex graphs and their variants and prove independence results in the generic 3-dimensional rigidity matroid adding to the short list of graph classes for which 3-dimensional rigidity is understood. We then analyse global rigidity for these graph classes and use our results to deduce bounds on the maximum likelihood threshold of graphs in these nearly planar classes., Comment: 29 pages, 9 figures, 4 tables

Published

2024

8. Rigid frameworks with dilation constraints

Author

Dewar, Sean, Nixon, Anthony, and Sainsbury, Andrew

Subjects

Mathematics - Combinatorics, Mathematics - Metric Geometry

Abstract

We consider the rigidity and global rigidity of bar-joint frameworks in Euclidean $d$-space under additional dilation constraints in specified coordinate directions. In this setting we obtain a complete characterisation of generic rigidity. We then consider generic global rigidity. In particular, we provide an algebraic sufficient condition and a weak necessary condition. We also construct a large family of globally rigid frameworks and conjecture a combinatorial characterisation when most coordinate directions have dilation constraints., Comment: 15 pages, 1 figure

Published

2024

9. The number of realisations of a rigid graph in Euclidean and spherical geometries

Author

Dewar, Sean and Grasegger, Georg

Subjects

Mathematics - Combinatorics, Mathematics - Algebraic Geometry, 52C25 (Primary) 05C30, 68R10, 68R12 (Secondary)

Abstract

A graph is $d$-rigid if for any generic realisation of the graph in $\mathbb{R}^d$ (equivalently, the $d$-dimensional sphere $\mathbb{S}^d$), there are only finitely many non-congruent realisations in the same space with the same edge lengths. By extending this definition to complex realisations in a natural way, we define $c_d(G)$ to be the number of equivalent $d$-dimensional complex realisations of a $d$-rigid graph $G$ for a given generic realisation, and $c^*_d(G)$ to be the number of equivalent $d$-dimensional complex spherical realisations of $G$ for a given generic spherical realisation. Somewhat surprisingly, these two realisation numbers are not always equal. Recently developed algorithms for computing realisation numbers determined that the inequality $c_2(G) \leq c_2^*(G)$ holds for any minimally 2-rigid graph $G$ with 12 vertices or less. In this paper we confirm that, for any dimension $d$, the inequality $c_d(G) \leq c_d^*(G)$ holds for every $d$-rigid graph $G$. This result is obtained via new techniques involving coning, the graph operation that adds an extra vertex adjacent to all original vertices of the graph., Comment: 33 pages, 8 figures

Published

2023

10. On the uniqueness of collections of pennies and marbles

Author

Dewar, Sean, Grasegger, Georg, Kubjas, Kaie, Mohammadi, Fatemeh, and Nixon, Anthony

Subjects

Mathematics - Combinatorics, Mathematics - Metric Geometry, 05C10, 52C25, 52C17

Abstract

In this note we study the uniqueness problem for collections of pennies and marbles. More generally, consider a collection of unit $d$-spheres that may touch but not overlap. Given the existence of such a collection, one may analyse the contact graph of the collection. In particular we consider the uniqueness of the collection arising from the contact graph. Using the language of graph rigidity theory, we prove a precise characterisation of uniqueness (global rigidity) in dimensions 2 and 3 when the contact graph is additionally chordal. We then illustrate a wide range of examples in these cases. That is, we illustrate collections of marbles and pennies that can be perturbed continuously (flexible), are locally unique (rigid) and are unique (globally rigid). We also contrast these examples with the usual generic setting of graph rigidity., Comment: 9 pages, 11 figures

Published

2023

11. Rigid graphs in cylindrical normed spaces

Author

Dewar, Sean and Kitson, Derek

Subjects

Mathematics - Metric Geometry, Mathematics - Combinatorics, 52C25 (Primary) 52A21, 05C50 (Secondary)

Abstract

We characterise rigid graphs for cylindrical normed spaces $Z=X\oplus_\infty \mathbb{R}$ where $X$ is a finite dimensional real normed linear space and $Z$ is endowed with the product norm. In particular, we obtain purely combinatorial characterisations of minimal rigidity for a large class of 3-dimensional cylindrical normed spaces; for example, when $X$ is an $\ell_p$-plane with $p\in (1,\infty)$. We combine these results with recent work of Cros et al. to characterise rigid graphs in the 4-dimensional cylindrical space $(\mathbb{R}^2\oplus_1\mathbb{R})\oplus_\infty\mathbb{R}$. These are among the first combinatorial characterisations of rigid graphs in normed spaces of dimension greater than 2. Examples of rigid graphs are presented and algorithmic aspects are discussed., Comment: 28 pages

Published

2023

12. Identifying contact graphs of sphere packings with generic radii

Author

Dewar, Sean

Subjects

Mathematics - Combinatorics, Mathematics - Metric Geometry, 05B40 (Primary) 52C17, 52C25 (Secondary)

Abstract

Ozkan et al. conjectured that any packing of $n$ spheres with generic radii will be stress-free, and hence will have at most $3n-6$ contacts. In this paper we prove that this conjecture is true for any sphere packing with contact graph of the form $G \oplus K_2$, i.e., the graph formed by connecting every vertex in a graph $G$ to every vertex in the complete graph with two vertices. We also prove the converse of the conjecture holds in this special case: specifically, a graph $G \oplus K_2$ is the contact graph of a generic radii sphere packing if and only if $G$ is a penny graph with no cycles., Comment: 22 pages, 2 figures. Correction made to Lemma 3.1 (now Lemma 3.2) and Corollary 1.3 replaced by Conjecture 5.1

Published

2023

13. Computing maximum likelihood thresholds using graph rigidity

Author

Bernstein, Daniel Irving, Dewar, Sean, Gortler, Steven J., Nixon, Anthony, Sitharam, Meera, and Theran, Louis

Subjects

Mathematics - Combinatorics, Mathematics - Metric Geometry, Mathematics - Statistics Theory, 62H12 (Primary), 52C25 (Secondary)

Abstract

The maximum likelihood threshold (MLT) of a graph $G$ is the minimum number of samples to almost surely guarantee existence of the maximum likelihood estimate in the corresponding Gaussian graphical model. Recently a new characterization of the MLT in terms of rigidity-theoretic properties of $G$ was proved \cite{Betal}. This characterization was then used to give new combinatorial lower bounds on the MLT of any graph. We continue this line of research by exploiting combinatorial rigidity results to compute the MLT precisely for several families of graphs. These include graphs with at most $9$ vertices, graphs with at most 24 edges, every graph sufficiently close to a complete graph and graphs with bounded degrees., Comment: 15 pages, 5 figures. arXiv admin note: substantial text overlap with arXiv:2108.02185

Published

2022

14. How many contacts can exist between oriented squares of various sizes?

Author

Dewar, Sean

Subjects

Mathematics - Combinatorics, Mathematics - Metric Geometry, 05B40 (Primary) 52C15, 52C05 (Secondary)

Abstract

A homothetic packing of squares is any set of various-size squares with the same orientation where no two squares have overlapping interiors. If all $n$ squares have the same size then we can have up to roughly $4n$ contacts by arranging the squares in a grid formation. The maximum possible number of contacts for a set of $n$ squares will drop drastically, however, if the size of each square is chosen more-or-less randomly. In the following paper we describe a necessary and sufficient condition for determining if a set of $n$ squares with fixed sizes can be arranged into a homothetic square packing with more than $2n-2$ contacts. Using this, we then prove that any (possibly not homothetic) packing of $n$ squares will have at most $2n-2$ face-to-face contacts if the various widths of the squares do not satisfy a finite set of linear equations., Comment: 24 pages, 7 figures

Published

2022

15. Uniquely realisable graphs in analytic normed planes

Author

Dewar, Sean, Hewetson, John, and Nixon, Anthony

Subjects

Mathematics - Combinatorics, Mathematics - Metric Geometry, 52C25, 05C10, 52A21, 53A35, 52B40

Abstract

A bar-joint framework $(G,p)$ in the Euclidean space $\mathbb{E}^d$ is globally rigid if it is the unique realisation, up to rigid congruences, of $G$ in $\mathbb{E}^d$ with the edge lengths of $(G,p)$. Building on key results of Hendrickson and Connelly, Jackson and Jord\'{a}n gave a complete combinatorial characterisation of when a generic framework is global rigidity in $\mathbb{E}^2$. We prove an analogous result when the Euclidean norm is replaced by any norm that is analytic on $\mathbb{R}^2 \setminus \{0\}$. More precisely, we show that a graph $G=(V,E)$ is globally rigid in a non-Euclidean analytic normed plane if and only if $G$ is 2-connected and $G-e$ contains 2 edge-disjoint spanning trees for all $e\in E$. The main technical tool is a recursive construction of 2-connected and redundantly rigid graphs in analytic normed planes. We also obtain some sufficient conditions for global rigidity as corollaries of our main result and prove that the analogous necessary conditions hold in $d$-dimensional analytic normed spaces., Comment: 40 pages, 16 figures

Published

2022

16. Graph rigidity properties of Ramanujan graphs

Author

Cioabă, Sebastian M., Dewar, Sean, Grasegger, Georg, and Gu, Xiaofeng

Subjects

Mathematics - Combinatorics, 52C25 (Primary) 05C50, 05C40 (Secondary)

Abstract

A recent result of Cioab\u{a}, Dewar and Gu implies that any $k$-regular Ramanujan graph with $k\geq 8$ is globally rigid in $\mathbb{R}^2$. In this paper, we extend these results and prove that any $k$-regular Ramanujan graph of sufficiently large order is globally rigid in $\mathbb{R}^2$ when $k\in \{6, 7\}$, and when $k\in \{4,5\}$ if it is also vertex-transitive. These results imply that the Ramanujan graphs constructed by Morgenstern in 1994 are globally rigid. We also prove several results on other types of framework rigidity, including body-bar rigidity, body-hinge rigidity, and rigidity on surfaces of revolution. In addition, we use computational methods to determine which Ramanujan graphs of small order are globally rigid in $\mathbb{R}^2$., Comment: 23 pages, 9 figures

Published

2022

17. Quotient graphs of symmetrically rigid frameworks

Author

Dewar, Sean, Grasegger, Georg, Kastis, Eleftherios, and Nixon, Anthony

Subjects

Mathematics - Combinatorics, Mathematics - Metric Geometry, 52C25 (Primary) 05E18, 05C10, 60C05 (Secondary)

Abstract

A natural problem in combinatorial rigidity theory concerns the determination of the rigidity or flexibility of bar-joint frameworks in $\mathbb{R}^d$ that admit some non-trivial symmetry. When $d=2$ there is a large literature on this topic. In particular, it is typical to quotient the symmetric graph by the group and analyse the rigidity of symmetric, but otherwise generic frameworks, using the combinatorial structure of the appropriate group-labelled quotient graph. However, mirroring the situation for generic rigidity, little is known combinatorially when $d\geq 3$. Nevertheless in the periodic case, a key result of Borcea and Streinu characterises when a quotient graph can be lifted to a rigid periodic framework in $\mathbb{R}^d$. We develop an analogous theory for symmetric frameworks in $\mathbb{R}^d$. The results obtained apply to all finite and infinite 2-dimensional point groups, and then in arbitrary dimension they concern a wide range of infinite point groups, sufficiently large finite groups and groups containing translations and rotations. For the case of finite groups we also derive results concerning the probability of assigning group labels to a quotient graph so that the resulting lift is symmetrically rigid in $\mathbb{R}^d$., Comment: 31 pages, 11 figures

Published

2022

18. Classifying the globally rigid edge-transitive graphs and distance-regular graphs in the plane

Author

Dewar, Sean

Subjects

Mathematics - Combinatorics, 52C25

Abstract

A graph is said to be globally rigid if almost all embeddings of the graph's vertices in the Euclidean plane will define a system of edge-length equations with a unique (up to isometry) solution. In 2007, Jackson, Servatius and Servatius characterised exactly which vertex-transitive graphs are globally rigid solely by their degree and maximal clique number, two easily computable parameters for vertex-transitive graphs. In this short note we will extend this characterisation to all graphs that are determined by their automorphism group. We do this by characterising exactly which edge-transitive graphs and distance-regular graphs are globally rigid by their minimal and maximal degrees., Comment: 9 pages, 3 figures. Title updated

Published

2022

19. Coincident-point rigidity in normed planes

Author

Dewar, Sean, Hewetson, John, and Nixon, Anthony

Subjects

Mathematics - Combinatorics, Mathematics - Metric Geometry, 52C25, 05C10, 52B40, 46B20

Abstract

A bar-joint framework $(G,p)$ is the combination of a graph $G$ and a map $p$ assigning positions, in some space, to the vertices of $G$. The framework is rigid if every edge-length-preserving continuous motion of the vertices arises from an isometry of the space. We will analyse rigidity when the space is a (non-Euclidean) normed plane and two designated vertices are mapped to the same position. This non-genericity assumption leads us to a count matroid first introduced by Jackson, Kaszanitsky and the third author. We show that independence in this matroid is equivalent to independence as a suitably regular bar-joint framework in a normed plane with two coincident points; this characterises when a regular normed plane coincident-point framework is rigid and allows us to deduce a delete-contract characterisation. We then apply this result to show that an important construction operation (generalised vertex splitting) preserves the stronger property of global rigidity in normed planes and use this to construct rich families of globally rigid graphs when the normed plane is analytic., Comment: 12 pages, 6 figures

Published

2021

20. Flexing infinite frameworks with applications to braced Penrose tilings

Author

Dewar, Sean and Legerský, Jan

Subjects

Mathematics - Combinatorics, Mathematics - Metric Geometry, 52C25 (Primary) 05C63, 52C23 (Secondary)

Abstract

A planar framework -- a graph together with a map of its vertices to the plane -- is flexible if it allows a continuous deformation preserving the distances between adjacent vertices. Extending a recent previous result, we prove that a connected graph with a countable vertex set can be realized as a flexible framework if and only if it has a so-called NAC-coloring. The tools developed to prove this result are then applied to frameworks where every 4-cycle is a parallelogram, and countably infinite graphs with $n$-fold rotational symmetry. With this, we determine a simple combinatorial characterization that determines whether the 1-skeleton of a Penrose rhombus tiling with a given set of braced rhombi will have a flexible motion, and also whether the motion will preserve 5-fold rotational symmetry., Comment: 27 pages, 11 figures

Published

2021

21. Infinitesimal rigidity and prestress stability for frameworks in normed spaces

Author

Dewar, Sean

Subjects

Mathematics - Metric Geometry, 52C25 (Primary) 52A21, 49J52 (Secondary)

Abstract

A (bar-and-joint) framework is a set of points in a normed space with a set of fixed distance constraints between them. Determining whether a framework is locally rigid - i.e. whether every other suitably close framework with the same distance constraints is an isometric copy - is NP-hard when the normed space has dimension 2 or greater. We can reduce the complexity by instead considering derivatives of the constraints, which linearises the problem. By applying methods from non-smooth analysis, we shall strengthen previous sufficient conditions for framework rigidity that utilise first-order derivatives. We shall also introduce the notions of prestress stability and second-order rigidity to the topic of normed space rigidity, two weaker sufficient conditions for framework rigidity previously only considered for Euclidean spaces., Comment: 18 pages, 4 figures

Published

2021

22. Generalised rigid body motions in non-Euclidean planes with applications to global rigidity

Author

Dewar, Sean and Nixon, Anthony

Subjects

Mathematics - Metric Geometry, Mathematics - Combinatorics, 52C25, 05C10, 52A21

Abstract

A bar-joint framework $(G,p)$ in a (non-Euclidean) real normed plane $X$ is the combination of a finite, simple graph $G$ and a placement $p$ of the vertices in $X$. A framework $(G,p)$ is globally rigid in $X$ if every other framework $(G,q)$ in $X$ with the same edge lengths as $(G,p)$ arises from an isometry of $X$. The weaker property of local rigidity in normed planes (where only $(G,q)$ within a neighbourhood of $(G,p)$ are considered) has been studied by several researchers over the last 5 years after being introduced by Kitson and Power for $\ell_p$-norms. However global rigidity is an unexplored area for general normed spaces, despite being intensely studied in the Euclidean context by many groups over the last 40 years. In order to understand global rigidity in $X$, we introduce new generalised rigid body motions in normed planes where the norm is determined by an analytic function. This theory allows us to deduce several geometric and combinatorial results concerning the global rigidity of bar-joint frameworks in $X$., Comment: 33 pages, 6 figures

Published

2021

23. Maximum likelihood thresholds via graph rigidity

Author

Bernstein, Daniel Irving, Dewar, Sean, Gortler, Steven J., Nixon, Anthony, Sitharam, Meera, and Theran, Louis

Subjects

Mathematics - Combinatorics, Mathematics - Statistics Theory, 05C75, 62A99, 52C25, 62R01, 90C25

Abstract

The maximum likelihood threshold (MLT) of a graph $G$ is the minimum number of samples to almost surely guarantee existence of the maximum likelihood estimate in the corresponding Gaussian graphical model. We give a new characterization of the MLT in terms of rigidity-theoretic properties of $G$ and use this characterization to give new combinatorial lower bounds on the MLT of any graph. We use the new lower bounds to give high-probability guarantees on the maximum likelihood thresholds of sparse Erd{\"o}s-R\'enyi random graphs in terms of their average density. These examples show that the new lower bounds are within a polylog factor of tight, where, on the same graph families, all known lower bounds are trivial. Based on computational experiments made possible by our methods, we conjecture that the MLT of an Erd{\"o}s-R\'enyi random graph is equal to its generic completion rank with high probability. Using structural results on rigid graphs in low dimension, we can prove the conjecture for graphs with MLT at most $4$ and describe the threshold probability for the MLT to switch from $3$ to $4$. We also give a geometric characterization of the MLT of a graph in terms of a new "lifting" problem for frameworks that is interesting in its own right. The lifting perspective yields a new connection between the weak MLT (where the maximum likelihood estimate exists only with positive probability) and the classical Hadwiger-Nelson problem., Comment: In press at Annals of Applied Probability

Published

2021

24. How many contacts can exist between oriented squares of various sizes?

Author

Dewar, Sean

Published

2024

25. Homothetic packings of centrally symmetric convex bodies

Author

Dewar, Sean

Subjects

Mathematics - Metric Geometry, 52C25 (Primary) 52C15, 52A10 (Secondary)

Abstract

A centrally symmetric convex body is a convex compact set with non-empty interior that is symmetric about the origin. Of particular interest are those that are both smooth and strictly convex -- known here as regular symmetric bodies -- since they retain many of the useful properties of the $d$-dimensional Euclidean ball. We prove that for any given regular symmetric body $C$, a homothetic packing of copies of $C$ with randomly chosen radii will have a $(2,2)$-sparse planar contact graph. We further prove that there exists a comeagre set of centrally symmetric convex bodies $C$ where any $(2,2)$-sparse planar graph can be realised as the contact graph of a stress-free homothetic packing of $C$., Comment: 28 pages, 2 figures

Published

2020

26. Which graphs are rigid in $\ell_p^d$?

Author

Dewar, Sean, Kitson, Derek, and Nixon, Anthony

Subjects

Mathematics - Metric Geometry, 52C25 (Primary), 05C50 (Secondary)

Abstract

We present three results which support the conjecture that a graph is minimally rigid in $d$-dimensional $\ell_p$-space, where $p\in (1,\infty)$ and $p\not=2$, if and only if it is $(d,d)$-tight. Firstly, we introduce a graph bracing operation which preserves independence in the generic rigidity matroid when passing from $\ell_p^d$ to $\ell_p^{d+1}$. We then prove that every $(d,d)$-sparse graph with minimum degree at most $d+1$ and maximum degree at most $d+2$ is independent in $\ell_p^d$. Finally, we prove that every triangulation of the projective plane is minimally rigid in $\ell_p^3$. A catalogue of rigidity preserving graph moves is also provided for the more general class of strictly convex and smooth normed spaces and we show that every triangulation of the sphere is independent for 3-dimensional spaces in this class., Comment: 21 pages

Published

2020

27. Flexible placements of graphs with rotational symmetry

Author

Dewar, Sean, Grasegger, Georg, and Legerský, Jan

Subjects

Mathematics - Combinatorics, Computer Science - Robotics, Mathematics - Metric Geometry, 52C25, 51K99, 70B99, 05C78

Abstract

We study the existence of an $n$-fold rotationally symmetric placement of a symmetric graph in the plane allowing a continuous deformation that preserves the symmetry and the distances between adjacent vertices. We show that such a flexible placement exists if and only if the graph has a NAC-colouring satisfying an additional property on the symmetry; a NAC-colouring is a surjective edge colouring by two colours such that every cycle is either monochromatic, or there are at least two edges of each colour.

Published

2020

28. Spectral conditions for graph rigidity in the Euclidean plane

Author

Cioabă, Sebastian M., Dewar, Sean, and Gu, Xiaofeng

Subjects

Mathematics - Combinatorics, Mathematics - Geometric Topology, 05C50, 05C70

Abstract

Rigidity is the property of a structure that does not flex. It is well studied in discrete geometry and mechanics, and has applications in material science, engineering and biological sciences. A bar-and-joint framework is a pair $(G,p)$ of graph $G$ together with a map $p$ of the vertices of $G$ into the Euclidean plane. We view the edges of $(G, p)$ as bars and the vertices as universal joints. The vertices can move continuously as long as the distances between pairs of adjacent vertices are preserved. The framework is rigid if any such motion preserves the distances between all pairs of vertices. In 1970, Laman obtained a combinatorial characterization of rigid graphs in the Euclidean plane. In 1982, Lov\'asz and Yemini discovered a new characterization and proved that every $6$-connected graph is rigid. Combined with a characterization of global rigidity, their proof actually implies that every 6-connected graph is globally rigid. Consequently, if Fiedler's algebraic connectivity is greater than 5, then $G$ is globally rigid. In this paper, we improve this bound and show that for a graph $G$ with minimum degree $\delta\geq 6$, if its algebraic connectivity is greater than $2+\frac{1}{\delta -1}$, then $G$ is rigid and if its algebraic connectivity is greater than $2+\frac{2}{\delta -1}$, then $G$ is globally rigid. Our results imply that every connected regular Ramanujan graph with degree at least $8$ is globally rigid. We also prove a more general result giving a sufficient spectral condition for the existence of $k$ edge-disjoint spanning rigid subgraphs. The same condition implies that a graph contains $k$ edge-disjoint spanning $2$-connected subgraphs. This result extends previous spectral conditions for packing edge-disjoint spanning trees., Comment: 15 pages, 1 figure; this updated version includes a new co-author and new results involving global rigidity

Published

2020

29. Flexible placements of periodic graphs in the plane

Author

Dewar, Sean

Subjects

Mathematics - Combinatorics, Mathematics - Metric Geometry, 52C25, 13A18

Abstract

Given a periodic graph, we wish to determine via combinatorial methods whether it has periodic embeddings in the plane that -- via motions that preserve edge-lengths and periodicity -- can be continuously deformed into another non-congruent embedding of the graph. By introducing NBAC-colourings for the corresponding quotient gain graphs, we identify which periodic graphs have flexible embeddings in the plane when the lattice of periodicity is fixed. We further characterise with NBAC-colourings which 1-periodic graphs have flexible embeddings in the plane with a flexible lattice of periodicity, and characterise in special cases which 2-periodic graphs have flexible embeddings in the plane with a flexible lattice of periodicity., Comment: 34 pages, 13 figures

Published

2019

30. Infinitesimal rigidity in normed planes

Author

Dewar, Sean

Subjects

Mathematics - Metric Geometry, 52C25, 52A21

Abstract

We prove that a graph has an infinitesimally rigid placement in a non-Euclidean normed plane if and only if it contains a $(2,2)$-tight spanning subgraph. The method uses an inductive construction based on generalised Henneberg moves and the geometric properties of the normed plane. As a key step, rigid placements are constructed for the complete graph $K_4$ by considering smoothness and strict convexity properties of the unit ball., Comment: 26 pages

Published

2018

31. Flexible Placements of Graphs with Rotational Symmetry

Author

Dewar, Sean, Grasegger, Georg, Legerský, Jan, Siciliano, Bruno, Series Editor, Khatib, Oussama, Series Editor, Antonelli, Gianluca, Advisory Editor, Fox, Dieter, Advisory Editor, Harada, Kensuke, Advisory Editor, Hsieh, M. Ani, Advisory Editor, Kröger, Torsten, Advisory Editor, Kulic, Dana, Advisory Editor, Park, Jaeheung, Advisory Editor, Holderbaum, William, editor, and Selig, J. M., editor

Published

2022

32. Flexing infinite frameworks with applications to braced Penrose tilings

Author

Dewar, Sean and Legerský, Jan

Published

2023

33. The rigidity of countable frameworks in normed spaces

Author

Dewar, Sean

Subjects

515

Abstract

We present a rigorous study of framework rigidity in finite dimensional normed spaces using a wide array of tools to attack these problems, including differential and discrete geometry, matroid theory, convex analysis and graph theory. We shall first focus on giving a good grounding of the area of rigidity theory from a more general view point to allow us to deal with a variety of normed spaces. By observing orbits of placements from the perspective of Lie group actions on smooth manifolds, we obtain upper bounds for the dimension of the space of trivial motions for a framework. Utilising aspects of differential geometry, we prove an extension of Asimow and Roth’s 1978/9 result establishing the equivalence of local, continuous and infinitesimal rigidity for regular bar-and-joint frameworks in a d-dimensional Euclidean space. Further, we establish the independence of all graphs with d + 1 vertices d-dimensional normed space, and also prove they will be flexible if the normed space is non-Euclidean. Next, we prove that a graph has an infinitesimally rigid placement in a nonEuclidean normed plane if and only if it contains a (2, 2)-tight spanning subgraph. The method uses an inductive construction based on generalised Henneberg moves and the geometric properties of the normed plane. As a key step, rigid placements are constructed for the complete graph K4 by considering smoothness and strict convexity properties of the unit ball. Finally, we carry our previous results to countably infinite frameworks where this is possible, and otherwise identify when such results cannot be brought forward. We first establish matroidal methods for identifying rigidity and flexibility, and apply these methods to a large class of normed spaces. We characterise a necessary and sufficient condition for countably infinite graphs to have sequentially infinitesimally rigid placements in a general normed plane, and further stengthen the result for a large class normed planes. Finally, we prove that infinitesimal rigidity for countably infinite generic frameworks implies a weaker (but possibly equivalent) form of continuous rigidity, and infinitesimal rigidity for countably infinite algebraically generic frameworks implies continuous rigidity.

Published

2019

34. Maximum likelihood thresholds via graph rigidity

Author

Bernstein, Daniel Irving, primary, Dewar, Sean, additional, Gortler, Steven J., additional, Nixon, Anthony, additional, Sitharam, Meera, additional, and Theran, Louis, additional

Published

2024

35. Equivalence of continuous, local and infinitesimal rigidity in normed spaces

Author

Dewar, Sean

Subjects

Mathematics - Metric Geometry, 52C25

Abstract

We present a rigorous study of framework rigidity in general finite dimensional normed spaces from the perspective of Lie group actions on smooth manifolds. As an application, we prove an extension of Asimow and Roth's 1978/9 result establishing the equivalence of local, continuous and infinitesimal rigidity for regular bar-and-joint frameworks in a d-dimensional Euclidean space. Further, we obtain upper bounds for the dimension of the space of trivial motions for a framework and establish the flexibility of small frameworks in general non-Euclidean normed spaces., Comment: 15 pages

Published

2018

36. Infinitesimal rigidity and prestress stability for frameworks in normed spaces

Author

Dewar, Sean

Published

2022

37. Generalised rigid body motions in non-Euclidean planes with applications to global rigidity

Author

Dewar, Sean and Nixon, Anthony

Published

2022

38. Which graphs are rigid in ℓpd?

Author

Dewar, Sean, Kitson, Derek, and Nixon, Anthony

Published

2022

39. Uniquely Realisable Graphs in Analytic Normed Planes.

Author

Dewar, Sean, Hewetson, John, and Nixon, Anthony

Subjects

*NORMED rings

Abstract

A framework |$(G,p)$| in Euclidean space |$\mathbb{E}^{d}$| is globally rigid if it is the unique realisation, up to rigid congruences, of |$G$| with the edge lengths of |$(G,p)$|⁠. Building on key results of Hendrickson [ 28 ] and Connelly [ 14 ], Jackson and Jordán [ 29 ] gave a complete combinatorial characterisation of when a generic framework is global rigidity in |$\mathbb{E}^{2}$|⁠. We prove an analogous result when the Euclidean norm is replaced by any norm that is analytic on |$\mathbb{R}^{2} \setminus \{0\}$|⁠. Specifically, we show that a graph |$G=(V,E)$| has an open set of globally rigid realisations in a non-Euclidean analytic normed plane if and only if |$G$| is 2-connected and |$G-e$| contains 2 edge-disjoint spanning trees for all |$e\in E$|⁠. We also prove that the analogous necessary conditions hold in |$d$| -dimensional normed spaces. [ABSTRACT FROM AUTHOR]

Published

2024

40. Flexible Placements of Periodic Graphs in the Plane

Author

Dewar, Sean

Published

2021

41. Quotient graphs of symmetrically rigid frameworks

Author

Dewar, Sean, primary, Grasegger, Georg, additional, Kastis, Eleftherios, additional, and Nixon, Anthony, additional

Published

2024

42. Spectral conditions for graph rigidity in the Euclidean plane

Author

Cioabă, Sebastian M., Dewar, Sean, and Gu, Xiaofeng

Published

2021

43. Quotient graphs of symmetrically rigid frameworks

Author

Dewar, Sean, Grasegger, Georg, Kastis, Eleftherios, Nixon, Anthony, Dewar, Sean, Grasegger, Georg, Kastis, Eleftherios, and Nixon, Anthony

Abstract

A natural problem in combinatorial rigidity theory concerns the determination of the rigidity or flexibility of bar-joint frameworks in R d that admit some non-trivial symmetry. When d D 2 there is a large literature on this topic. In particular, it is typical to quotient the symmetric graph by the group and analyse the rigidity of symmetric, but otherwise generic frameworks, using the combinatorial structure of the appropriate group-labelled quotient graph. However, mirroring the situation for generic rigidity, little is known combinatorially when d ≥ 3. Nevertheless in the periodic case, a key result of Borcea and Streinu in 2011 characterises when a quotient graph can be lifted to a rigid periodic framework in R d. We develop an analogous theory for symmetric frameworks in R d. The results obtained apply to all finite and infinite 2-dimensional point groups, and then in arbitrary dimension they concern a wide range of infinite point groups, sufficiently large finite groups and groups containing translations and rotations. For the case of finite groups we also derive results concerning the probability of assigning group labels to a quotient graph so that the resulting lift is symmetrically rigid in R d.

Published

2024

44. Flexible Placements of Graphs with Rotational Symmetry

Author

Dewar, Sean, primary, Grasegger, Georg, additional, and Legerský, Jan, additional

Published

2021

45. Equivalence of Continuous, Local and Infinitesimal Rigidity in Normed Spaces

Author

Dewar, Sean

Published

2021

46. Homothetic packings of centrally symmetric convex bodies

Author

Dewar, Sean

Published

2022

47. Coincident-point rigidity in normed planes

Author

Dewar, Sean, primary, Hewetson, John, additional, and Nixon, Anthony, additional

Published

2023

48. Graph Rigidity Properties of Ramanujan Graphs

Author

Cioabă, Sebastian, primary, Dewar, Sean, additional, Grasegger, Georg, additional, and Gu, Xiaofeng, additional

Published

2023

49. Computing maximum likelihood thresholds using graph rigidity

Author

Bernstein, Daniel, Dewar, Sean, Gortler, Steven, Nixon, Anthony, Sitharam, Meera, Theran, Louis, Bernstein, Daniel, Dewar, Sean, Gortler, Steven, Nixon, Anthony, Sitharam, Meera, and Theran, Louis

Published

2023

50. Coincident-point rigidity in normed planes

Author

Dewar, Sean, Hewetson, John, Nixon, Anthony, Dewar, Sean, Hewetson, John, and Nixon, Anthony

Abstract

A bar-joint framework (G,p) is the combination of a graph G and a map p assigning positions, in some space, to the vertices of G. The framework is rigid if every edge-length-preserving continuous motion of the vertices arises from an isometry of the space. We will analyse rigidity when the space is a (non-Euclidean) normed plane and two designated vertices are mapped to the same position. This non-genericity assumption leads us to a count matroid first introduced by Jackson, Kaszanitsky and the third author. We show that independence in this matroid is equivalent to independence as a suitably regular bar-joint framework in a normed plane with two coincident points; this characterises when a regular normed plane coincident-point framework is rigid and allows us to deduce a delete-contract characterisation. We then apply this result to show that an important construction operation (generalised vertex splitting) preserves the stronger property of global rigidity in normed planes and use this to construct rich families of globally rigid graphs when the normed plane is analytic.

Published

2023