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The Global ETD Search service is a free service for researchers
to find electronic theses and dissertations. This service is
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Networked Digital Library of Theses and Dissertations.
Our metadata is collected from universities around the world. If you manage a university/consortium/country archive and want to be added, details can be found on the NDLTD website.
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Showing 1 to 10 of 176 (0.103 seconds)| 1 |
The structure of the enumeration degreesMcEvoy, K. January 1984 (has links)
No description available.
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The enumeration degrees of #SIGMA#2̲ setsCopestake, C. S. January 1987 (has links)
No description available.
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The combinatorics of the Jack parameter and the genus series for topological mapsLa Croix, Michael Andrew January 2009 (has links)
Informally, a rooted map is a topologically pointed embedding of a graph in a surface. This thesis examines two problems in the enumerative theory of rooted maps.
The b-Conjecture, due to Goulden and Jackson, predicts that structural similarities between the generating series for rooted orientable maps with respect
to vertex-degree sequence, face-degree sequence, and number of edges, and
the corresponding generating series for rooted locally orientable maps, can be
explained by a unified enumerative theory. Both series specialize M(x,y,z;b), a
series defined algebraically in terms of Jack symmetric functions, and the unified
theory should be based on the existence of an appropriate integer valued invariant of rooted maps with respect to which M(x,y,z;b) is the generating series for locally orientable maps. The conjectured invariant should take the value zero when evaluated on orientable maps, and should take positive values when evaluated on non-orientable maps, but since it must also depend on
rooting, it cannot be directly related to genus.
A new family of candidate invariants, η, is described recursively in terms of root-edge deletion. Both the generating series for rooted maps with respect to η and an appropriate specialization of M satisfy the same differential equation with a unique solution. This shows that η gives the appropriate enumerative theory when vertex degrees are ignored, which is precisely the setting required by Goulden, Harer, and Jackson for an application to algebraic geometry. A functional equation satisfied by M and the existence of a bijection between
rooted maps on the torus and a restricted set of rooted maps on the Klein bottle show that η has additional structural properties that are required of the conjectured invariant.
The q-Conjecture, due to Jackson and Visentin, posits a natural combinatorial
explanation, for a functional relationship between a generating series for rooted
orientable maps and the corresponding generating series for 4-regular rooted
orientable maps. The explanation should take the form of a bijection, ϕ, between appropriately decorated rooted orientable maps and 4-regular rooted orientable
maps, and its restriction to undecorated maps is expected to be related to the
medial construction.
Previous attempts to identify ϕ have suffered from the fact that the existing
derivations of the functional relationship involve inherently non-combinatorial
steps, but the techniques used to analyze η suggest the possibility of a new derivation of the relationship that may be more suitable to combinatorial analysis. An examination of automorphisms that must be induced by ϕ gives evidence for a refinement of the functional relationship, and this leads to a more combinatorially refined conjecture. The refined conjecture is then reformulated algebraically so that its predictions can be tested numerically.
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The combinatorics of the Jack parameter and the genus series for topological mapsLa Croix, Michael Andrew January 2009 (has links)
Informally, a rooted map is a topologically pointed embedding of a graph in a surface. This thesis examines two problems in the enumerative theory of rooted maps.
The b-Conjecture, due to Goulden and Jackson, predicts that structural similarities between the generating series for rooted orientable maps with respect
to vertex-degree sequence, face-degree sequence, and number of edges, and
the corresponding generating series for rooted locally orientable maps, can be
explained by a unified enumerative theory. Both series specialize M(x,y,z;b), a
series defined algebraically in terms of Jack symmetric functions, and the unified
theory should be based on the existence of an appropriate integer valued invariant of rooted maps with respect to which M(x,y,z;b) is the generating series for locally orientable maps. The conjectured invariant should take the value zero when evaluated on orientable maps, and should take positive values when evaluated on non-orientable maps, but since it must also depend on
rooting, it cannot be directly related to genus.
A new family of candidate invariants, η, is described recursively in terms of root-edge deletion. Both the generating series for rooted maps with respect to η and an appropriate specialization of M satisfy the same differential equation with a unique solution. This shows that η gives the appropriate enumerative theory when vertex degrees are ignored, which is precisely the setting required by Goulden, Harer, and Jackson for an application to algebraic geometry. A functional equation satisfied by M and the existence of a bijection between
rooted maps on the torus and a restricted set of rooted maps on the Klein bottle show that η has additional structural properties that are required of the conjectured invariant.
The q-Conjecture, due to Jackson and Visentin, posits a natural combinatorial
explanation, for a functional relationship between a generating series for rooted
orientable maps and the corresponding generating series for 4-regular rooted
orientable maps. The explanation should take the form of a bijection, ϕ, between appropriately decorated rooted orientable maps and 4-regular rooted orientable
maps, and its restriction to undecorated maps is expected to be related to the
medial construction.
Previous attempts to identify ϕ have suffered from the fact that the existing
derivations of the functional relationship involve inherently non-combinatorial
steps, but the techniques used to analyze η suggest the possibility of a new derivation of the relationship that may be more suitable to combinatorial analysis. An examination of automorphisms that must be induced by ϕ gives evidence for a refinement of the functional relationship, and this leads to a more combinatorially refined conjecture. The refined conjecture is then reformulated algebraically so that its predictions can be tested numerically.
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Algebraic Methods and Monotone Hurwitz NumbersGuay-Paquet, Mathieu January 2012 (has links)
We develop algebraic methods to solve join-cut equations, which are partial differential equations that arise in the study of permutation factorizations. Using these techniques, we give a detailed study of the recently introduced monotone Hurwitz numbers, which count factorizations of a given permutation into a fixed number of transpositions, subject to some technical conditions known as transitivity and monotonicity.
Part of the interest in monotone Hurwitz numbers comes from the fact that they have been identified as the coefficients in a certain asymptotic expansion related to the Harish-Chandra-Itzykson-Zuber integral, which comes from the theory of random matrices and has applications in mathematical physics. The connection between random matrices and permutation factorizations goes through representation theory, with symmetric functions in the Jucys-Murphy elements playing a key role.
As the name implies, monotone Hurwitz numbers are related to the more classical Hurwitz numbers, which count permutation factorizations regardless of monotonicity, and for which there is a significant body of work. Our results for monotone Hurwitz numbers are inspired by similar results for Hurwitz numbers; we obtain a genus expansion for the related generating functions, which yields explicit formulas and a polynomiality result for monotone Hurwitz numbers. A significant difference between the two cases is that our methods are purely algebraic, whereas the theory of Hurwitz numbers relies on some fairly deep results in algebraic geometry.
Despite our methods being algebraic, it seems that there should be a connection between monotone Hurwitz numbers and geometry, although this is currently missing. We give some evidence for this connection by identifying some of the coefficients in the monotone Hurwitz genus expansion with coefficients in the classical Hurwitz genus expansion known to be Hodge integrals over the moduli space of curves.
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Kernelization and Enumeration: New Approaches to Solving Hard ProblemsMeng, Jie 2010 May 1900 (has links)
NP-Hardness is a well-known theory to identify the hardness of computational problems.
It is believed that NP-Hard problems are unlikely to admit polynomial-time algorithms.
However since many NP-Hard problems are of practical significance, different approaches
are proposed to solve them: Approximation algorithms, randomized algorithms and heuristic
algorithms. None of the approaches meet the practical needs. Recently parameterized
computation and complexity has attracted a lot of attention and been a fruitful branch of
the study of efficient algorithms. By taking advantage of the moderate value of parameters
in many practical instances, we can design efficient algorithms for the NP-Hard problems in
practice.
In this dissertation, we discuss a new approach to design efficient parameterized algorithms,
kernelization. The motivation is that instances of small size are easier to solve.
Roughly speaking, kernelization is a preprocess on the input instances and is able to significantly reduce their sizes.
We present a 2k kernel for the cluster editing problem, which improves the previous
best kernel of size 4k; We also present a linear kernel of size 7k 2d for the d-cluster
editing problem, which is the first linear kernel for the problem. The kernelization algorithm
is simple and easy to implement.
We propose a quadratic kernel for the pseudo-achromatic number problem. This
implies that the problem is tractable in term of parameterized complexity. We also study
the general problem, the vertex grouping problem and prove it is intractable in term of
parameterized complexity.
In practice, many problems seek a set of good solutions instead of a good solution.
Motivated by this, we present the framework to study enumerability in term of parameterized
complexity. We study three popular techniques for the design of parameterized algorithms,
and show that combining with effective enumeration techniques, they could be transferred
to design efficient enumeration algorithms.
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Algebraic Methods and Monotone Hurwitz NumbersGuay-Paquet, Mathieu January 2012 (has links)
We develop algebraic methods to solve join-cut equations, which are partial differential equations that arise in the study of permutation factorizations. Using these techniques, we give a detailed study of the recently introduced monotone Hurwitz numbers, which count factorizations of a given permutation into a fixed number of transpositions, subject to some technical conditions known as transitivity and monotonicity.
Part of the interest in monotone Hurwitz numbers comes from the fact that they have been identified as the coefficients in a certain asymptotic expansion related to the Harish-Chandra-Itzykson-Zuber integral, which comes from the theory of random matrices and has applications in mathematical physics. The connection between random matrices and permutation factorizations goes through representation theory, with symmetric functions in the Jucys-Murphy elements playing a key role.
As the name implies, monotone Hurwitz numbers are related to the more classical Hurwitz numbers, which count permutation factorizations regardless of monotonicity, and for which there is a significant body of work. Our results for monotone Hurwitz numbers are inspired by similar results for Hurwitz numbers; we obtain a genus expansion for the related generating functions, which yields explicit formulas and a polynomiality result for monotone Hurwitz numbers. A significant difference between the two cases is that our methods are purely algebraic, whereas the theory of Hurwitz numbers relies on some fairly deep results in algebraic geometry.
Despite our methods being algebraic, it seems that there should be a connection between monotone Hurwitz numbers and geometry, although this is currently missing. We give some evidence for this connection by identifying some of the coefficients in the monotone Hurwitz genus expansion with coefficients in the classical Hurwitz genus expansion known to be Hodge integrals over the moduli space of curves.
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A reformulation-linearization based implicit enumeration algorithm for the rectilinear distance location-allocation problem /Ramachandran, Sridhar, January 1991 (has links)
Thesis (M.S.)--Virginia Polytechnic Institute and State University, 1991. / Vita. Abstract. Includes bibliographical references (leaves 75-77). Also available via the Internet.
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Asymptotic enumeration for combinatorial structures /Maxwell, Mark M. January 1994 (has links)
Thesis (Ph. D.)--Oregon State University, 1995. / Typescript (photocopy). Includes bibliographical references (leaves 52-54). Also available on the World Wide Web.
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Distributed enumeration of four node graphlets at quadrillion-scaleLiu, Xiaozhou 19 November 2021 (has links)
Graphlet enumeration is a basic task in graph analysis with many applications. Thus it is important to be able to perform this task within a reasonable amount of time. However, this objective is challenging when the input graph is very large, with millions of nodes and edges. Known solutions are limited in terms of scalability. Distributed computing is often proposed as a solution to improve scalability. How- ever, it has to be done carefully to reduce the overhead cost and to really benefit from the distributed solution. We study the enumeration of four-node graphlets in undirected graphs using a distributed platform. We propose an efficient distributed solution which significantly surpasses the existing solutions. With this method we are able to process larger graphs that have never been processed before and enumerate quadrillions of graphlets using a modest cluster of machines. We convincingly show the scalability of our solution through experimental results. / Graduate
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