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Communications in Algebra Volume 47, 2019 - Issue 4
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Original Article

Schur–Weyl duality over commutative rings

Tiago CruzInstitute of Algebra and Number Theory, University of Stuttgart, Stuttgart, GermanyCorrespondence[email protected]
ORCID Iconhttp://orcid.org/0000-0002-3645-259X
ORCID Icon
Pages 1619-1628 | Received 14 Nov 2017, Accepted 01 Aug 2018, Published online: 13 Nov 2018

References

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  • Cohn, P. M. (1966). On the structure of the GL2 of a ring. Inst. Hautes Études Sci. Publ. Math. 30:5–53.
  • De Concini, C., Procesi, C. (1976). A characteristic free approach to invariant theory. Adv. Math. 21(3):330–354.
  • Doty, S. (2009). Schur–Weyl duality in positive characteristic. In: Representation theory, Vol. 478 of Contemp. Math. Providence, RI: American Mathematical Society, pp. 15–28.
  • Green, J. A. (1980). Polynomial representations of GLn. In: Lecture Notes in Mathematics, Vol. 830. Berlin-Heidelberg: Springer.
  • Krause, H. (2015). Polynomial representations of GL(n) and Schur–Weyl duality. Beitr. Algebra Geom. 56(2):769–773.
  • Serre, D. (2002). Matrices: Theory and Applications. In: Graduate Texts in Mathematics. New York: Springer.

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