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HarishChandra*
, 1923
"... HarishChandra was one of the outstanding mathematicians of his generation, an algebraist and analyst, and one of those responsible for transforming infinitedimensional group representation theory from a modest topic on the periphery of mathematics and physics into a major field central to contemp ..."
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HarishChandra was one of the outstanding mathematicians of his generation, an algebraist and analyst, and one of those responsible for transforming infinitedimensional group representation theory from a modest topic on the periphery of mathematics and physics into a major field central
HarishChandra*
, 1923
"... HarishChandra was one of the outstanding mathematicians of his generation, an algebraist and analyst, and one of those responsible for transforming infinitedimensional group representation theory from a modest topic on the periphery of mathematics and physics into a major field central to contempo ..."
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HarishChandra was one of the outstanding mathematicians of his generation, an algebraist and analyst, and one of those responsible for transforming infinitedimensional group representation theory from a modest topic on the periphery of mathematics and physics into a major field central
Harish Kumar
, 2015
"... Enron Corporation was an American energy, commodities, and services company based in Houston, Texas. Before its bankruptcy on December 2, 2001, Enron employed approximately 20,000 staff and was one of the world’s major electricity, natural gas, communications, and pulp and paper companies, with cl ..."
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Enron Corporation was an American energy, commodities, and services company based in Houston, Texas. Before its bankruptcy on December 2, 2001, Enron employed approximately 20,000 staff and was one of the world’s major electricity, natural gas, communications, and pulp and paper companies, with claimed revenues of nearly $111 billion during 2000. At the end of 2001, it was revealed that its reported financial condition was sustained substantially by an institutionalized, systematic, and creatively planned accounting fraud, known since as the Enron scandal. Enron has since become a wellknown example of wilful corporate fraud and corruption. This report aims at answering whether top level Enron employees had incriminating evidence in their office emails or uncover any unusual patterns in the months leading up to the scandal through an exploratory data analysis. 1
Black Hole Entropy Function, Attractors and Precision Counting of Microstates
, 2007
"... In these lecture notes we describe recent progress in our understanding of attractor mechanism and entropy of extremal black holes based on the entropy function formalism. We also describe precise computation of the microscopic degeneracy of a class of quarter BPS dyons in N = 4 supersymmetric strin ..."
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Cited by 326 (28 self)
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In these lecture notes we describe recent progress in our understanding of attractor mechanism and entropy of extremal black holes based on the entropy function formalism. We also describe precise computation of the microscopic degeneracy of a class of quarter BPS dyons in N = 4 supersymmetric string theories, and compare the statistical entropy of these dyons, expanded in inverse powers of electric and magnetic charges, with a similar expansion of the corresponding black hole entropy. This comparison is extended to include the contribution to the entropy from multicentered black holes as well.
Generalized HarishChandra Modules
, 2011
"... 1 An introduction to generalized HarishChandra modules 2 2 An intoduction to the Zuckerman functor 10 3 Construction and reconstruction of generalized HarishChandra modules 20 ..."
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Cited by 1 (0 self)
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1 An introduction to generalized HarishChandra modules 2 2 An intoduction to the Zuckerman functor 10 3 Construction and reconstruction of generalized HarishChandra modules 20
The Kernel Of An Homomorphism Of HarishChandra
, 1995
"... Let g be a reductive, complex Lie algebra, with adjoint group G, let G act on the ring of differential operators D(g) via the adjoint action and write : g ! D(g) for the differential of this action. A classic result of HarishChandra shows that any invariant differential operator that kills O(g) G , ..."
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Cited by 6 (0 self)
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Let g be a reductive, complex Lie algebra, with adjoint group G, let G act on the ring of differential operators D(g) via the adjoint action and write : g ! D(g) for the differential of this action. A classic result of HarishChandra shows that any invariant differential operator that kills O(g) G
OF HARISHCHANDRA MODULES
"... Let 9be acomplex semisimple Lie algebra with anontrivial involutive automorphism 0of 9. We write $\mathfrak{g} $ $=\mathrm{E} $ $\oplus \mathfrak{p} $ for the symmetric decomposition of 9given by 0, where $\mathrm{e} $ and $\mathfrak{p} $ denote $\mathrm{t}\mathrm{h}\mathrm{e}+1 $ and1 eigenspaces ..."
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for 0, respectively. Let $K_{\mathbb{C}} $ be aconnected complex algebraic group with Lie algebra $\epsilon $. We assume that the natural inclusion $\mathrm{e} $ $\mathrm{c}arrow \mathfrak{g} $ gives
HARISHCHANDRA MODULES FOR YANGIANS
, 2003
"... Abstract. We study HarishChandra representations of the Yangian Y(gl 2) with respect to a natural maximal commutative subalgebra which satisfy a polynomial condition. We prove an analogue of the Kostant theorem showing that the restricted Yangian Yp(gl 2) is a free module over the corresponding sub ..."
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Abstract. We study HarishChandra representations of the Yangian Y(gl 2) with respect to a natural maximal commutative subalgebra which satisfy a polynomial condition. We prove an analogue of the Kostant theorem showing that the restricted Yangian Yp(gl 2) is a free module over the corresponding
HarishChandra Vertices
, 1993
"... this paper incorporating a third idea which goes back to a paper of Grabmeier [Gr], namely the idea of a Mackey system. Thus HarishChandra philosophy appears as the special case of this general theory, where the Mackey system is the system of parabolic subgroups and their unipotent radical of a fini ..."
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Cited by 1 (0 self)
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this paper incorporating a third idea which goes back to a paper of Grabmeier [Gr], namely the idea of a Mackey system. Thus HarishChandra philosophy appears as the special case of this general theory, where the Mackey system is the system of parabolic subgroups and their unipotent radical of a
Results 1  10
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7,185