Jonna Gill scite author profile

Jonna Gill

3Publications

35Citation Statements Received

30Citation Statements Given

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Linköping University

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A regular decomposition of the edge-product space of phylogenetic trees

Gill

Linusson

Moulton

et al. 2008

Advances in Applied Mathematics

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We investigate the topology and combinatorics of a topological space called the edge-product space that is generated by the set of edge-weighted finite labelled trees. This space arises by multiplying the weights of edges on paths in trees, and is closely connected to tree-indexed Markov processes in molecular evolutionary biology. In particular, by considering combinatorial properties of the Tuffley poset of labelled forests, we show that the edge-product space has a regular cell decomposition with face poset equal to the Tuffley poset.Original Publication:Jonna Gill, Svante Linusson, Vincent Moulton and Mike Steel, A regular decomposition of the edge-product space of phylogenetic trees, 2008, Advances in Applied Mathematics, (14), 2, 158-176.http://dx.doi.org/10.1016/j.aam.2006.07.007Copyright: Elsevier Science B.V., Amsterdamhttp://www.elsevier.com

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The k-assignment polytope, phylogenetic trees, and permutation patterns

Gill

2013

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In this thesis three combinatorial problems are studied in four papers.In Paper 1 we study the structure of the k-assignment polytope, whose vertices are the m × n (0,1)-matrices with exactly k 1:s and at most one 1 in each row and each column. This is a natural generalisation of the Birkhoff polytope and many of the known properties of the Birkhoff polytope are generalised. A representation of the faces by certain bipartite graphs is given. This representation is used to describe the properties of the polytope, such as a complete description of the cover relation in the face poset of the polytope and an exact expression for the diameter of its graph. An ear decomposition of these bipartite graphs is constructed.In Paper 2 we investigate the topology and combinatorics of a topological space, called the edge-product space, that is generated by a set of edge-weighted finite semi-labelled trees. This space arises by multiplying the weights of edges on paths in trees, and is closely connected to tree-indexed Markov processes in molecular evolutionary biology. In particular, by considering combinatorial properties of the Tuffley poset of semi-labelled forests, we show that the edgeproduct space has a regular cell decomposition with face poset equal to the Tuffley poset.The elements of the Tuffley poset are called X-forests, where X is a finite set of labels. A generating function of the X-forests with respect to natural statistics is studied in Paper 3 and a closed formula is found. In addition, a closed formula for the corresponding generating function of X-trees is found. Singularity analysis is used on these formulas to find asymptotics for the number of components, edges, and unlabelled nodes in X-forests and X-trees as |X| → ∞.In Paper 4 permutation statistics counting occurrences of patterns are studied. Their expected values on a product of t permutations chosen randomly from Γ ⊆ S n , where Γ is a union of conjugacy classes, are considered. Hultman has described a method for computing such an expected value, denoted E Γ (s, t), of a statistic s, when Γ is a union of conjugacy classes of S n . The only prerequisite is that the mean of s over the conjugacy classes is written as a linear combination of irreducible characters of S n . Therefore, the main focus of this paper is to express the means of pattern-counting statistics as such linear combinations. A procedure for calculating such expressions for statistics counting occurrences of classical and vincular patterns of length 3 is developed, and is then used to calculate all these expressions.iii Populärvetenskaplig sammanfattning I denna avhandling, som består av fyra artiklar, studeras tre olika områden inom diskret matematik.I den första artikeln studeras en generalisering av en polytop som kallas Birkhoffpolytopen. En polytop är ett geometriskt objekt med hörn och platta sidor, som t.ex. ett mjölkpaket, en pyramid eller ett A4-papper. Hur en polytop ser ut bestäms av koordinaterna för dess hörn. En polytops diameter är längsta avstån-det mellan tv...

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The k-assignment polytope

Gill

Linusson

2009

Discrete Optimization

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In this paper we study the structure of the k-assignment polytope, whose vertices are the m × n (0,1)-matrices with exactly k 1:s and at most one 1 in each row and each column. This is a natural generalisation of the Birkhoff polytope and many of the known properties of the Birkhoff polytope are generalised. A representation of the faces by certain bipartite graphs is given. This tool is used to describe properties of the polytope, especially a complete description of the cover relation in the face poset of the polytope and an exact expression for the diameter. An ear decomposition of these bipartite graphs is constructed.

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Jonna Gill

A regular decomposition of the edge-product space of phylogenetic trees

The k-assignment polytope, phylogenetic trees, and permutation patterns

The k-assignment polytope

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