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The Global ETD Search service is a free service for researchers
to find electronic theses and dissertations. This service is
provided by the
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 291 to 300 of 2719 (0.314 seconds)Spelling suggestions: "subject:"tet"" "subject:"beet""
| 291 |
Derivations on certain banach algebrasKnapper, Andrew January 2000 (has links)
No description available.
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| 292 |
A quad-tree algorithm for efficient polygon comparison, and its parallel implementationDubreuil, Christophe January 1997 (has links)
No description available.
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| 293 |
The modelling of changeovers and the classification of changeover time reduction techniquesGest, G. B. January 1995 (has links)
No description available.
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| 294 |
Optimal Points for a Probability Distribution on a Nonhomogeneous Cantor SetRoychowdhury, Lakshmi 1975- 02 October 2013 (has links)
The objective of my thesis is to find optimal points and the quantization error for a probability measure defined on a Cantor set. The Cantor set, we have considered in this work, is generated by two self-similar contraction mappings on the real line with distinct similarity ratios. Then we have defined a nonhomogeneous probability measure, the support of which lies on the Cantor set. For such a probability measure first we have determined the n-optimal points and the nth quantization error for n = 2 and n = 3. Then by some other lemmas and propositions we have proved a theorem which gives all the n-optimal points and the nth quantization error for all positive integers n. In addition, we have given some properties of the optimal points and the quantization error for the probability measure. In the end, we have also given a list of n-optimal points and error for some positive integers n. The result in this thesis is a nonhomogeneous extension of a similar result of Graf and Luschgy in 1997. The techniques in my thesis could be extended to discretise any continuous random variable with another random variable with finite range.
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| 295 |
Continuous functions and exceptional sets in potential theoryJesuraj, Ramasamy. January 1981 (has links)
On presente une generalisation d'un resultat de Wallin ainsi qu'une caracterisation des ensembles compacts polaires dans un espace de Brelot. Ces resultats se generalisent a un produit de n espaces de Brelot en demontrant la continuite des fonctions multireduites. On en deduit qu'un ensemble localement n polaire est un ensemble in polaire. Des resultats semblebles ont lieu pour une sous-classe des ensembles pluripolaires dans un domaine hyperconvexe et borne de C('n).
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| 296 |
Combinatorial methods in drug design: towards Modulating protein-protein InteractionsLong, Stephen M. Unknown Date (has links)
No description available.
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| 297 |
On Hamilton Cycles and Hamilton Cycle Decompositions of Graphs based on GroupsDean, Matthew Lee Youle Unknown Date (has links)
No description available.
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| 298 |
Combinatorial methods in drug design: towards Modulating protein-protein InteractionsLong, Stephen M. Unknown Date (has links)
No description available.
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| 299 |
On hamilton cycles and manilton cycle decompositions of graphs based on groupsDean, Matthew Lee Youle Unknown Date (has links)
A Hamilton cycle is a cycle which passes through every vertex of a graph. A Hamilton cycle decomposition of a k-regular graph is defined as the partition of the edge set into Hamilton cycles if k is even, or a partition into Hamilton cycles and a 1-factor, if k is odd. Consequently, for 2-regular or 3-regular graphs, finding a Hamilton cycle decompositon is equilvalent to finding a Hamilton cycle. Two classes of graphs are studies in this thesis and both have significant symmetry. The first class of graphs is the 6-regular circulant graphs. These are a king of Cayley graph. Given a finite group A and a subset S ⊆ A, the Cayley Graph Cay(A,S) is the simple graph with vertex set A and edge set {{a, as}|a ∈ A, s ∈ S}. If the group A is cyclic then the graph is called a circulant graph. This thesis proves two results on 6-regular circulant graphs: 1. There is a Hamilton cycle decomposition of every 6-regular circulant graph Cay(Z[subscript n],S) in which S has an element of order n; 2. There is a Hamilton cycle decomposition of every connected 6-regular circulant graph of odd order. The second class of graphs examined in this thesis is a futher generalization of the Generalized Petersen graphs. The Petersen graph is well known as a highly symmetrical graph which does not contain a Hamilton cycle. In 1983 Alspach completely determined which Generalized Petersen graphs contain Hamilton cycles. In this thesis we define a larger class of graphs which includes the Generalized Petersen graphs as a special case. We call this larger class spoked Cayley graphs. We determine which spoked Cayley graphs on Abelian groups are Hamiltonian. As a corollary, we determine which are 1-factorable.
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| 300 |
Combinatorial methods in drug design: towards Modulating protein-protein InteractionsLong, Stephen M. Unknown Date (has links)
No description available.
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