Kraft, Hanspeter and Wallach, Nolan. (2010) Polarization and nullcone of reductive groups. Progress in mathematics, Vol. 278. pp. 153-168.
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Official URL: http://edoc.unibas.ch/dok/A5251078
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Abstract
The paper starts with the following simple observation. Let V be a representation of a reductive group G, and let f_1,f_2,...,f_n be homogeneous invariant functions. Then the polarizations of f_1,f_2,...,f_n define the nullcone of k 0} h(t) x = 0 for all x in L. This is then applied to many examples. A surprising result is about the group SL(2,C) where almost all representations V have the property that all linear subspaces of the nullcone are annihilated. Again, this has interesting applications to the invariants on several copies. Another result concerns the n-qubits which appear in quantum computing. This is the representation of a product of n copies of $SL_2$ on the n-fold tensor product C^2 otimes C^2 otimes ... otimes C^2. Here we show just the opposite, namely that the polarizations never define the nullcone of several copies if n <= 3. (An earlier version of this paper, distributed in 2002, was split into two parts; the first part with the title ``On the nullcone of representations of reductive groups'' is published in Pacific J. Math. {bf 224} (2006), 119--140.)
Faculties and Departments: | 05 Faculty of Science > Departement Mathematik und Informatik > Ehemalige Einheiten Mathematik & Informatik > Algebra (Kraft) |
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UniBasel Contributors: | Kraft, Hanspeter |
Item Type: | Article, refereed |
Article Subtype: | Research Article |
Note: | Also published in: Symmetry and spaces. - Boston : Birkhäuser, 2010. - S. 153-168 -- Publication type according to Uni Basel Research Database: Journal article |
Language: | English |
edoc DOI: | |
Last Modified: | 31 Dec 2015 10:46 |
Deposited On: | 22 Mar 2012 13:59 |
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