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Weyl modules for groups of type B2 and G2Fitzgerald, J. G. M. January 1990 (has links)
In this thesis we determine the submodule structure of a number of Weyl modules for algebraic groups with root systems B2 and G2. We use the Jantzen sum formula to find the composition factors of Weyl modules and go on to use homomorphisms between Weyl modules, given by H.H. Andersen, and the comparison of two filtrations of tensor products of Weyl modules to establish submodule structure. A computer program in the Prolog language is given which calculates the Jantzen sum formula. In addition we find one 2-dimensional Ext group for simple modules for type G2 in characteristic greater than or equal to 7.
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Distinguished representations of the metaplectic cover of GL(n)Petkov, Vladislav Vladilenov January 2017 (has links)
One of the fundamental differences between automorphic representations of classical groups like GL(n) and their metaplectic covers is that in the latter case the space of Whittaker functionals usually has a dimension bigger than one. Gelbart and Piatetski-Shapiro called the metaplectic representations, which possess a unique Whittaker model, distinguished and classified them for the double cover of the group GL(2). Later Patterson and Piatetski-Shapiro used a converse theorem to list the distinguished representations for the degree three cover of GL(3). In their milestone paper on general metaplectic covers of GL(n) Kazhdan and Patterson construct examples of non-cuspidal distinguished representations, which come as residues of metaplectic Eisenstein series. These are generalizations of the classical Jacobi theta functions. Despite some impressive local results to date, cuspidal distinguished representations are not classified or even constructed outside rank 1 and 2.
In her thesis Wang makes some progress toward the classification in rank 3.
In this dissertation we construct the distinguished representations for the degree four metaplectic cover of GL(4), applying a classical converse theorem like Patterson and Piatetski-Shapiro in the case of rank 2.
We obtain the necessary local properties of the Rankin-Selberg convolutions at the ramified places and finish the proof of the construction of cuspidal distinguished representations in rank 3.
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Affine Embeddings of Homogeneous SpacesI.V. Arzhantsev, D.A. Timashev, Andreas.Cap@esi.ac.at 29 August 2000 (has links)
No description available.
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A binary dynamic programming problem with affine transitions and reward functions : properties and algorithmGatica, Ricardo A. 12 1900 (has links)
No description available.
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Clifford-Fischer theory applied to certain groups associated with symplectic, unitary and Thompson groups.Basheer, Ayoub Basheer Mohammed. January 2012 (has links)
The character table of a finite group is a very powerful tool to study the groups and to prove
many results. Any finite group is either simple or has a normal subgroup and hence will be of
extension type. The classification of finite simple groups, more recent work in group theory, has
been completed in 1985. Researchers turned to look at the maximal subgroups and automorphism
groups of simple groups. The character tables of all the maximal subgroups of the sporadic simple
groups are known, except for some maximal subgroups of the Monster M and the Baby Monster B.
There are several well-developed methods for calculating the character tables of group extensions
and in particular when the kernel of the extension is an elementary abelian group. Character
tables of finite groups can be constructed using various theoretical and computational techniques.
In this thesis we study the method developed by Bernd Fischer and known nowadays as the theory
of Clifford-Fischer matrices. This method derives its fundamentals from the Clifford theory. Let
G = N·G, where N C G and G/N = G, be a group extension. For each conjugacy class [gi]G, we
construct a non-singular square matrix Fi, called a Fischer matrix. Once we have all the Fischer
matrices together with the character tables (ordinary or projective) and fusions of the inertia factor
groups into G, the character table of G is then can be constructed easily. In this thesis we apply
the coset analysis technique (this is a method to find the conjugacy classes of group extensions)
together with theory of Clifford-Fischer matrices to calculate the ordinary character tables of seven
groups of extensions type, in which four are non-split and three are split extensions. These groups
are of the forms: 21+8
+
·A9, 37:Sp(6, 2), 26·Sp(6, 2), 25·GL(5, 2), 210:(U5(2):2), 21+6
− :((31+2:8):2)
and 22n·Sp(2n, 2) and 28·Sp(8, 2). In addition we give some general results on the non-split group 22n·Sp(2n, 2). / Thesis (Ph.D.)-University of KwaZulu-Natal, Pietermaritzburg, 2012.
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Conjugacy classes in maximal parabolic subgroups of general linear groups /Murray, Scott H. January 2000 (has links)
Thesis (Ph. D.)--University of Chicago, Dept. of Mathematics, August 2000. / Includes bibliographical references. Also available on the Internet.
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Minimal anisotropic groups of higher real rankOndrus, Alexander A. January 2010 (has links)
Thesis (Ph. D.)--University of Alberta, 2010. / Title from pdf file main screen (viewed on June 24, 2010). A thesis submitted to the Faculty of Graduate Studies and Research in partial fulfillment of the requirements for the degree of Doctor of Philosophy in Mathematics, [Department of] Mathematical and Statistical Sciences, University of Alberta. Includes bibliographical references.
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Labile und relative Reduktionstheorie über ZahlkörpernMassold, Heinrich. January 2003 (has links)
Thesis (doctoral)--Rheinische Friedrich-Wilhelms-Universität Bonn, 2001. / Includes bibliographical references (p. 112).
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Riesz theory and Fredholm determinants in Banach algebrasBapela, Manas Majakwane 04 December 2006 (has links)
In the classical theory of operators on a Banach space a beautiful interplay exists between Riesz and Fredholm theory, and the theory of traces and de¬terminants for operator ideals. In this thesis we obtain a complete Riesz de¬composition theorem for Riesz elements in a semi prime Banach algebra and on the other hand extend the existing theory of traces and determinants to a more general setting of Banach algebras. In order to obtain some of these results we use the notion of finite multiplicity of spectral points to give a characterization of the essential spec¬trum for elements in a Banach algebra. As an immediate corollary we obtain the well-known characterization of Riesz elements namely that their non-zero spectral points are isolated and of finite multiplicities. In the final chapter of the thesis we use Plemelj's type formulas to define a determinant on the ideal of finite rank elements and show that it extends continuously to the ideal of nuclear elements. / Thesis (PhD (Mathematics))--University of Pretoria, 2006. / Mathematics and Applied Mathematics / unrestricted
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Existence of normal linear positive functionals on a von Neumann algebra invariant with respect to a semigroup of contractionsHsieh, Tsu-Teh January 1971 (has links)
Let A be a von Neumann algebra of linear operators on the
Hilbert space H . A linear operator T (resp. a linear bounded.
functional ϕ ) on A is said to be normal if for any increasing
net [formula omitted] of positive elements in A with least upper bound B , T(B)
is the least upper bound of [formula omitted]. Two linear positive functionals ψ1 and ψ2 on A are said to be equivalent
if ψ1 (B) = 0 <=> ψ2 (B) = 0 for any positive element B in A.
Let ϕ0 be a positive normal linear functional on A . Let
S be a semigroup and, {T(s) : s ε S} an antirepresentation of S as
normal positive linear contraction operators on A . We find in this
thesis equivalent conditions for the existence of a positive normal linear
functional ϕ on A which is equivalent to ϕ0 and invariant under
the semigroup {T(s) : s ε S} (i.e. ϕ(T(s)B) = ϕ(B) for all B in A and
s ε S ). We also extend the concept of weakly-wandering sets, which was
first introduced by Hajian-Kakutani, to weakly-wandering projections in A.
We give a relation between the non-existence of weakly-wandering projections
in A and the existence of positive normal linear functionals on A, invariant
with respect to an antirepresentation {T(s) : s ε S} of normal *-homomorphisms on A . Finally we investigate the existence of a complete set of
positive normal linear functionals on A which are invariant under the
semigroup {T(s) : s ε S}. / Science, Faculty of / Mathematics, Department of / Graduate
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