On Chevalley–Shephard–Todd’s Theorem in Positive Characteristic

Broer, Abraham

doi:10.1007/978-0-8176-4875-6_2

Abraham Broer⁵

Part of the book series: Progress in Mathematics ((PM,volume 278))

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Summary

Let G be a finite group acting linearly on the vector space V over a field of arbitrary characteristic. The action is called coregular if the invariant ring is generated by algebraically independent homogeneous invariants and the direct summand property holds if there is a surjective k[V]^G-linear map π : k[V]→k[V]^G. The following Chevalley–Shephard–Todd type theorem is proved. Suppose V is an irreducible kG-representation, then the action is coregular if and only if G is generated by pseudo-reflections and the direct summand property holds.

Mathematics Subject Classification (2000): 13A50, 20H15

To Gerald Schwarz on the occasion of his 60th anniversary

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Authors and Affiliations

Dèpartement de mathèmatiques et de statistique, Universitè de Montrèal, C.P. 6128, succursale Centre-ville, Montrèal (Quèbec), Canada, H3C 3J7
Abraham Broer

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Abraham Broer
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Correspondence to Abraham Broer .

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Editors and Affiliations

Dept. Mathematics, University of New Brunswick, Fredericton, E3B 5A3, Canada
H. E. A. Campbell
Dept. Mathematics, North Carolina State University, Harrelson Hall 255, Raleigh, 27695, U.S.A.
Aloysius G. Helminck
Inst. Mathematik, Universität Basel, Rheinsprung 21, Basel, 4051, Switzerland
Hanspeter Kraft
Dept. Mathematics & Statistics, Queen's University, Kingston, University Ave. 99, Kingston, K7L 3N6, Canada
David Wehlau

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Broer, A. (2010). On Chevalley–Shephard–Todd’s Theorem in Positive Characteristic. In: Campbell, H., Helminck, A., Kraft, H., Wehlau, D. (eds) Symmetry and Spaces. Progress in Mathematics, vol 278. Birkhäuser Boston. https://doi.org/10.1007/978-0-8176-4875-6_2

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DOI: https://doi.org/10.1007/978-0-8176-4875-6_2
Published: 14 November 2009
Publisher Name: Birkhäuser Boston
Print ISBN: 978-0-8176-4874-9
Online ISBN: 978-0-8176-4875-6
eBook Packages: Mathematics and StatisticsMathematics and Statistics (R0)

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