Cubulating one-relator groups with torsion

Lauer, Joseph.

January 2007

No description available.

Group theory.

Trees (Graph theory)

The problem of coexistence in multi-type competition models /

Kordzakhia, George.

January 2003

Thesis (Ph. D.)--University of Chicago, Dept. of Statistics, August 2003. / Includes bibliographical references. Also available on the Internet.

Trees (Graph theory) Stochastic systems.

On the complexity of finding optimal edge rankings

余鳳玲, Yue, Fung-ling.

January 1996

published_or_final_version / abstract / toc / Computer Science / Master / Master of Philosophy

Trees (Graph theory)

Computational complexity.

Efficient algorithms for broadcast routing

王慧霞, Wong, Wai-ha.

January 1996

published_or_final_version / Computer Science / Master / Master of Philosophy

Trees (Graph theory)

Computer algorithms.

Independent trees in 4-connected graphs

Curran, Sean P.

08 1900

No description available.

Isoperimetric inequalities

Trees Graph theory

Cubulating one-relator groups with torsion

Lauer, Joseph.

January 2007

Let <a1,..., a m | wn> be a presentation of a group G, where w is freely and cyclically reduced and n ≥ 2 is maximal. We define a system of codimension-1 subspaces in the universal cover, and invoke a construction essentially due to Sageev to define an action of G on a CAT(0) cube complex. By proving easily formulated geometric properties of the codimension-1 subspaces we show that when n ≥ 4 the action is proper and cocompact, and that the cube complex is finite dimensional and locally finite. We also prove partial results when n = 2 or n = 3. It is also shown that the subgroups of G generated by non-empty proper subsets of {a1, a 2,..., am} embed by isometries into the whole group.

Trees (Graph theory)

Group theory.

The smallest irreducible lattices in the product of trees /

Janzen, David.

January 2007

We produce a nonpositively curved square complex, X, containing exactly four squares. Its universal cover, X̃ ≅ T4 x T 4, is isomorphic to the product of two 4-valent trees. The group, pi1X, is a lattice in Aut (X̃) but π1X is not virtually a nontrivial product of free groups. There is no such example with fewer than four squares. The main ingredient in our analysis is that X̃ contains an "anti-torus" which is a certain aperiodically tiled plane.

Trees (Graph theory)

Lattice theory.

Shedding new light on random trees

Broutin, Nicolas.

January 2007

We introduce a weighted model of random trees and analyze the asymptotic properties of their heights. Our framework encompasses most trees of logarithmic height that were introduced in the context of the analysis of algorithms or combinatorics. This allows us to state a sort of "master theorem" for the height of random trees, that covers binary search trees (Devroye, 1986), random recursive trees (Devroye, 1987; Pittel, 1994), digital search trees (Pittel, 1985), scale-free trees (Pittel, 1994; Barabasi and Albert, 1999), and all polynomial families of increasing trees (Bergeron et al., 1992; Broutin et al., 2006) among others. Other applications include the shape of skinny cells in geometric structures like k-d and relaxed k-d trees. / This new approach sheds new light on the tight relationship between data structures like trees and tries that used to be studied separately. In particular, we show that digital search trees and the tries built from sequences generated by the same memoryless source share the same stable core. This link between digital search trees and tries is at the heart of our analysis of heights of tries. It permits us to derive the height of several species of tries such as the trees introduced by de la Briandais (1959) and the ternary search trees of Bentley and Sedgewick (1997). / The proofs are based on the theory of large deviations. The first order terms of the asymptotic expansions of the heights are geometrically characterized using the Crame'r functions appearing in estimates of the tail probabilities for sums of independent random variables.

Trees (Graph theory) -- Data processing.

Trees and the implicit construction of eigenvalue multiplicity lists /

Nuckols, Jonathan Edward.

January 2008

Thesis (Honors)--College of William and Mary, 2008. / Includes bibliographical references (leaf 39). Also available via the World Wide Web.

Counting the number of spanning trees in some special graphs /

Zhang, Yuanping.

January 2002

Thesis (Ph. D.)--Hong Kong University of Science and Technology, 2002. / Includes bibliographical references (leaves 70-76). Also available in electronic version. Access restricted to campus users.