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1	A sufficient condition for subellipticity of the d-bar-Neumann problem Herbig, Anne-Katrin, January 2004 (has links) Thesis (Ph. D.)--Ohio State University, 2004. / Title from first page of PDF file. Document formatted into pages; contains vi, 55 p. : ill. Advisor: McNeal, J.D., Dept. of Mathematics. Includes bibliographical references (p. 54-55). Neumann problem.
2	Multiple nodal solutions for some singularly perturbed Neumann problems. / Multiple nodal solutions January 2004 (has links) Chan Sik Kin. / Thesis (M.Phil.)--Chinese University of Hong Kong, 2004. / Includes bibliographical references (leaves 38-41). / Abstracts in English and Chinese. / Chapter 1 --- Introduction --- p.4 / Chapter 2 --- Preliminary analysis --- p.11 / Chapter 3 --- Liapunov-Schmidt Reduction --- p.19 / Chapter 4 --- The reduced problem: A Minimizing Procedure --- p.32 / Chapter 5 --- Proof of the theorem 1.2 --- p.35 / Bibliography --- p.38 Neumann problem Singularities (Mathematics)
3	A survey of J. von Neumann's inequality / Rainone, Timothy. January 2007 (has links) No description available. Von Neumann algebras.
4	A survey of J. von Neumann's inequality / Rainone, Timothy. January 2007 (has links) Much of operator theory hangs its coat on the spectral theorem, but the latter is exclusive to normal operators. Likewise, isometries are well understood via the Wold decomposition. It is von Neumann's inequality that enables a functional calculus for arbitrary contractions on Hilbert spaces. There are essentially two avenues that lead to von Neumann, one being the analytical theory of positive maps, the other marked by geometric dilation theorems. These diverse lines of approach are in fact unified by the inequality. Although our main focus is von Neumann's inequality, for which we provide four different proofs, we shall, however, periodically indulge in some of its intricate cousins. Von Neumann algebras.
5	Wilhelm Neumann (1898-1965) Leben und Werk unter besonderer Berücksichtigung seiner Rolle in der Kampfstoff-Forschung / Kalb, Stefanie. Unknown Date (has links) (PDF) Universiẗat, Diss., 2005--Würzburg. Neumann, Wilhelm (Pharmakologe)
6	Analytische Ästhetik eine Untersuchung zu Nelson Goodman und zur literarischen Parodie / Peter, Georg. January 2000 (has links) Frankfurt (Main), Universiẗat, Diss., 2000. Goodman, Nelson Neumann, Robert
7	Trace formulae in finite von Neumann algebras Skripka, Anna, January 2007 (has links) Thesis (Ph. D.)--University of Missouri-Columbia, 2007. / The entire dissertation/thesis text is included in the research.pdf file; the official abstract appears in the short.pdf file (which also appears in the research.pdf); a non-technical general description, or public abstract, appears in the public.pdf file. Title from title screen of research.pdf file (viewed on October 9, 2007) Vita. Includes bibliographical references. Von Neumann algebras.
8	Os efeitos das condições de contorno na eletrodinâmica escalar e o efeito Casimir para N regiões de largura fi-nita e diferentes potenciais DILEM, B. B. 26 October 2012 (has links) Made available in DSpace on 2018-08-01T22:29:58Z (GMT). No. of bitstreams: 1 tese_6202_.pdf: 431100 bytes, checksum: 515ea3aee194ed9a8f6ee12b2e50a2ce (MD5) Previous issue date: 2012-10-26 / O presente trabalho pode ser dividido em duas partes principais: na primeira parte, capítulo 3, analisamos sob quais condições a imposição das condições de contorno de Neumann homogêneas sobre duas superfícies planas, infinitas e paralelas, separadas por uma distância a, poderiam inibir a quebra espontânea de simetria no mecanismo de Coleman Weinberg para eletrodinâmica escalar. No trabalho da referência [1], tal objetivo é atingido através de uma expansão do potencial efetivo em potências de aν, onde ν2 representa os termos quadráticos nos campos, a partir da qual os pontos críticos ⟨ϕc⟩ do Vef (máximos e mínimos) são encontrados. Tal abordagem é tediosa e complexa, além de requerer uma cuidadosa análise. Neste trabalho, sem recorrer a qualquer expansão do potencial efetivo, nós mostramos de uma maneira muito simples que, se a ≈ e2M−1 ϕ (onde e é a carga do campo escalar e Mϕ sua massa gerada pelo mecanismo de Coleman-Weinberg), ⟨ϕc⟩ = 0 é ponto de mínimo do Vef e que, portanto, a quebra espontânea de simetria é inibida. Na segunda parte, capítulo 6, desenvolvemos uma proposta para um tratamento mais geral do efeito Casimir. Como protótipo, usamos o campo escalar real, em (n+1) dimensões, interagindo com N regiões de diferentes potenciais modelados por funções degraus. Como resultado, obtivemos expressões que nos permitem calcular, através do tensor energia-momento, a energia e a força de Casimir para qualquer número de barreiras ou regiões de diferentes potenciais constantes, sendo portanto aplicável a inúmeras situações específicas. Nos capítulos 7 e 8 exploramos algumas possibilidades, alternando entre a proposta original de diferentes regiões finitas e o caso limite de barreiras modeladas por funções delta de Dirac. Mostramos também que, no limite de acoplamento forte, nossos resultados retornam ao famoso resultado de Lüscher et al., como já era esperado. Contorno de Neumann Teoria de Campo
9	Semi-metrics on the normal states of a W-algebra Promislow, S. David* January 1970 (has links) In this thesis we investigate certain semi-metrics defined on the normal states of a W* -algebra and their applications to infinite tensor products. This extends the work of Bures, who defined a metric d on the set of normal states by taking d(μ,v) = inf { / x-y / } , where the infimum is taken over all vectors x and y which induce the states μ and v respectively relative to any representation of the algebra as a von-Neumann algebra. He then made use of this metric in obtaining a classification of the various incomplete tensor products of a family of semi-finite W* -algebras, up to a natural type of equivalence known as product isomorphism. By removing the semi-finiteness restriction form Bures' "product formula", which relates the distance under d between two finite product states to the distances between their components, we obtain this tensor product classification for families of arbitrary W* -algebras. Moreover we extend the product formula to apply to the case of infinite product states. For any subgroup G of the -automorphism group of a W-algebra, we define the semi-metric d(G) on the set of normal states by: d(G) (μ,v) = inf {d(μ(α) ,v (β) : α,β ε G} ; where μ(α).a is defined by μ(α)(A) = μ(α(A)). We show the significance of d(G) in classifying incomplete tensor products up to weak product isomorphism, a natural weakening of the concept of product isomorphism. In the case of tensor products of semi-finite factors, we obtain explicit criteria for such a classification by calculating d(G)(μ, v) in terms of the Radon-Nikodym derivatives of the states. In the course of this calculation we introduce a concept of compatibility which yields some other results about d and d(G) . Two self-adjoint operators S and T are said to be compatible, if given any real numbers α and β , either E(α) ≤ F((β) or F(β) ≤ E(α) ; where {E(λ)} , (F(λ)} , are the spectral resolutions of S,T , respectively. We obtain some miscellaneous results concerning this concept. / Science, Faculty of / Mathematics, Department of / Graduate Von Neumann algebras
10	Flow under a function and discrete decomposition of properly infinite W-algebras Phillips, William James* January 1978 (has links) The aim of this thesis is to generalize the classical flow under a function construction to non-abelian W-algebras. We obtain existence and uniqueness theorems for this generalization. As an application we show that the relationship between a continuous and a discrete decomposition of a properly infinite W-algebra is that of generalized flow under a function. Since continuous decompositions are known to exist for any properly infinite W*-algebra, this leads to generalizations of Connes' results on discrete decomposition. / Science, Faculty of / Mathematics, Department of / Graduate Von Neumann algebras

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