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1	On index theorem for symplectic orbifolds Fedosov, Boris, Schulze, Bert-Wolfgang, Tarkhanov, Nikolai January 2003 (has links) We give an explicit construction of the trace on the algebra of quantum observables on a symplectic orbifold and propose an index formula. star product symmetry group G-trace G-index Mathematics
2	"Corporate Governance and Default Risk" Vateva, Tzveta 20 October 2014 (has links) No description available. Finance corporate governance CDS spreads credit ratings institutional ownership G-index
3	Hodnocení finanční situace podniku a návrhy na její zlepšení / Evaluation of the Financial Situation in the Firm and Proposals to its Improvement Vicenová, Lenka January 2010 (has links) This diploma thesis deals with economic health of the company JAKOS, a.s. in years 2005–2008. There was used selected methods of the financial analysis. Based on recognized facts I propose measures which should result in the improvement of financial situation of the company.
4	Teorida de G-índice e grau de aplicações G-equivariantes / G-index theory and degree of G-equivariant maps Neyra, Norbil Leodan Cordova 07 May 2010 (has links) Antes da publicação do trabalho An ideal-valued cohomological index theory with applications to Borsuk-Ulam and Bourgin-Yang theorems\"de Fadell e Husseini [20], haviam sido apenas considerados índices numéricos de G-espaços, nos casos G =\'Z IND. 2\' e G um grupo finito. No entanto, tais índices numéricos são obviamente insuficientes no caso de grupos mais complexos, como por exemplo a 1-esfera \'S POT. 1\'. Neste contexto, Fadell e Husseini introduziram o chamado Indice cohomológico de valor ideal: a cada G-espaço X paracompacto, eles associaram um ideal \'Ind POT. G\' (X;K) do anel de cohomología H(BG;K), onde a cohomologia de Cech H é considerada com coeficientes em um corpo K e BG é o espaço classificante do grupo G. Além disso, Fadell e Husseini associaram a este ideal o Índice cohomológico de valor numérico, o qual é definido como sendo a dimensão do K-espaço vetorial obtido do quociente entre o anel H(BG;K) e o ideal \'Ind POT. G\' (X;K). O objetivo principal deste trabalho é apresentar um estudo detalhado deste índice e utilizá-lo no estudo dos resultados sobre grau de aplicações G-equivariantes provados por Hara em \"The degree of equivariant maps\"[24] / Before the appearance of the paper An ideal-valued cohomological index theory with applications to Borsuk-Ulam and Bourgin-Yang theorems\"of Fadell and Husseini [20], had been considered numerical indices of G-spaces, when G = \'Z IND. 2\' and when G is a finite group. However, such numerical indices are obviously insufficient in the case of groups more complexes, for example, G =\'S POT 1\'. In this context Fadell andHusseini, introduced the called valued-ideal cohomological index: to every paracompact G-space X they associated an ideal \'Ind POT. G\' (X,K) of the cohomology ring H(BG;K), where the Cech cohomology H* is considered with coefficients in a field K and BG is the classifying space of the group G. Moreover, they associated to this ideal the numerical valued cohomological index, that is, the dimension of K-vector space obtained by the quotient between the ring H*(BG;K) and the ideal \'Ind POT. G\' (X,K). The main objective of this work is to present a detailed study of this index and use such index on the study of results on degree of equivariant maps proved by Hara in his paper The degree of equivariant maps\"[24] Aplicações G-equivariantes Cech cohomology Classifying spaces Cohomologia de Cech Degree Espaços classificantes G-equivariant maps G-espaços G-index G-índice G-spaces Grau
5	Teorida de G-índice e grau de aplicações G-equivariantes / G-index theory and degree of G-equivariant maps Norbil Leodan Cordova Neyra 07 May 2010 (has links) Antes da publicação do trabalho An ideal-valued cohomological index theory with applications to Borsuk-Ulam and Bourgin-Yang theorems\"de Fadell e Husseini [20], haviam sido apenas considerados índices numéricos de G-espaços, nos casos G =\'Z IND. 2\' e G um grupo finito. No entanto, tais índices numéricos são obviamente insuficientes no caso de grupos mais complexos, como por exemplo a 1-esfera \'S POT. 1\'. Neste contexto, Fadell e Husseini introduziram o chamado Indice cohomológico de valor ideal: a cada G-espaço X paracompacto, eles associaram um ideal \'Ind POT. G\' (X;K) do anel de cohomología H(BG;K), onde a cohomologia de Cech H é considerada com coeficientes em um corpo K e BG é o espaço classificante do grupo G. Além disso, Fadell e Husseini associaram a este ideal o Índice cohomológico de valor numérico, o qual é definido como sendo a dimensão do K-espaço vetorial obtido do quociente entre o anel H(BG;K) e o ideal \'Ind POT. G\' (X;K). O objetivo principal deste trabalho é apresentar um estudo detalhado deste índice e utilizá-lo no estudo dos resultados sobre grau de aplicações G-equivariantes provados por Hara em \"The degree of equivariant maps\"[24] / Before the appearance of the paper An ideal-valued cohomological index theory with applications to Borsuk-Ulam and Bourgin-Yang theorems\"of Fadell and Husseini [20], had been considered numerical indices of G-spaces, when G = \'Z IND. 2\' and when G is a finite group. However, such numerical indices are obviously insufficient in the case of groups more complexes, for example, G =\'S POT 1\'. In this context Fadell andHusseini, introduced the called valued-ideal cohomological index: to every paracompact G-space X they associated an ideal \'Ind POT. G\' (X,K) of the cohomology ring H(BG;K), where the Cech cohomology H* is considered with coefficients in a field K and BG is the classifying space of the group G. Moreover, they associated to this ideal the numerical valued cohomological index, that is, the dimension of K-vector space obtained by the quotient between the ring H*(BG;K) and the ideal \'Ind POT. G\' (X,K). The main objective of this work is to present a detailed study of this index and use such index on the study of results on degree of equivariant maps proved by Hara in his paper The degree of equivariant maps\"[24] Aplicações G-equivariantes Cohomologia de Cech Espaços classificantes G-espaços G-índice Grau Cech cohomology Classifying spaces Degree G-equivariant maps G-index G-spaces
6	Versões do teorema de Tverberg e aplicações Poncio, Carlos Henrique Felicio 25 February 2016 (has links) Submitted by Livia Mello (liviacmello@yahoo.com.br) on 2016-10-05T14:40:49Z No. of bitstreams: 1 DissCHFP.pdf: 1216039 bytes, checksum: e21e062b0283d2bfe6ec436442e824a5 (MD5) / Approved for entry into archive by Marina Freitas (marinapf@ufscar.br) on 2016-10-20T19:23:38Z (GMT) No. of bitstreams: 1 DissCHFP.pdf: 1216039 bytes, checksum: e21e062b0283d2bfe6ec436442e824a5 (MD5) / Approved for entry into archive by Marina Freitas (marinapf@ufscar.br) on 2016-10-20T19:23:43Z (GMT) No. of bitstreams: 1 DissCHFP.pdf: 1216039 bytes, checksum: e21e062b0283d2bfe6ec436442e824a5 (MD5) / Made available in DSpace on 2016-10-20T19:23:50Z (GMT). No. of bitstreams: 1 DissCHFP.pdf: 1216039 bytes, checksum: e21e062b0283d2bfe6ec436442e824a5 (MD5) Previous issue date: 2016-02-25 / Fundação de Amparo à Pesquisa do Estado de São Paulo (FAPESP) / In this work, we will use topological methods in combinatorics and geometry to present a proof of the topological Tverberg theorem and a result about many Tverberg partitions. / O objetivo principal desta dissertação consiste em desenvolver um estudo detalhado de métodos topológicos em combinatória e geometria visando apresentar uma prova da versão topológica do teorema de Tverberg e de um teorema sobre a quantidade de partições de Tverberg. / FAPESP: 2015/01264-7 Complexos simpliciais G-ações G-índices Teorema de tverberg Teoremas do tipo borsuk- ulam Simplicial complexes G-actions G-index Joins Tverberg theorem Borsuk-Ulam type theorems CIENCIAS EXATAS E DA TERRA::MATEMATICA

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