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Hochster–Roberts theorem

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In algebra, the Hochster–Roberts theorem, introduced by Hochster and Roberts (1974), states that rings of invariants of linearly reductive groups acting on regular rings are Cohen–Macaulay.

In other words,[1]

If V is a rational representation of a linearly reductive group G over a field k, then there exist algebraically independent invariant homogeneous polynomials such that is a free finite graded module over .

Boutot (1987) proved that if a variety over a field of characteristic 0 has rational singularities then so does its quotient by the action of a reductive group; this implies the Hochster–Roberts theorem in characteristic 0 as rational singularities are Cohen–Macaulay.

In characteristic p>0, there are examples of groups that are reductive (or even finite) acting on polynomial rings whose rings of invariants are not Cohen–Macaulay.

References

  1. ^ Mumford 1994, pg. 199
  • Boutot, Jean-François (1987), "Singularités rationnelles et quotients par les groupes réductifs", Inventiones Mathematicae, 88 (1): 65–68, doi:10.1007/BF01405091, ISSN 0020-9910, MR 0877006
  • Hochster, Melvin; Roberts, Joel L. (1974), "Rings of invariants of reductive groups acting on regular rings are Cohen-Macaulay", Advances in Mathematics, 13 (2): 115–175, doi:10.1016/0001-8708(74)90067-X, ISSN 0001-8708, MR 0347810
  • Mumford, D.; Fogarty, J.; Kirwan, F. Geometric invariant theory. Third edition. Ergebnisse der Mathematik und ihrer Grenzgebiete (2) (Results in Mathematics and Related Areas (2)), 34. Springer-Verlag, Berlin, 1994. xiv+292 pp. MR1304906 ISBN 3-540-56963-4