The module structure of a group action on a ring

Peter Symonds

Ayuda

The module structure of a group action on a ring

Peter Symonds ^[1]
1. [1] University of Manchester
  
  University of Manchester
  
  Reino Unido
Localización: Selecta Mathematica, New Series, ISSN 1022-1824, Vol. 30, Nº. 4, 2024, págs. 1-19
Idioma: inglés
DOI: 10.1007/s00029-024-00968-w
Enlaces
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Resumen
- Consider a finite group G acting on a graded Noetherian k-algebra S, for some field k of characteristic p; for example S might be a polynomial ring. Regard S as a kG-module and consider the multiplicity of a particular indecomposable module as a summand in each degree. We show how this can be described in terms of homological algebra and how it is linked to the geometry of the group action on the spectrum of S.
Referencias bibliográficas
- Auslander, M., Reiten, I., Smalø, S.O.: Representation theory of Artin algebras, Cambridge Studies in Advanced Mathematics, 36. Cambridge...
- Benson, D.J.: Representations and Cohomology I, Cambridge Studies in Advanced Mathematics 30. Cambridge Univ. Press, Cambridge (1991)
- Benson, D.J.: Polynomial invariants of finite groups, London Mathematical Society Lecture Note Series, 190. Cambridge University Press, Cambridge...
- Broué, M.: On Scott modules and p-permutation modules: an approach through the Brauer morphism. Proc. Am. Math. Soc. 93, 401–408 (1985)
- Bruns, W., Herzog, W.: Cohen-Macaulay rings, Cambridge Studies in Advanced Mathematics, 39. Cambridge University Press, Cambridge (1993)
- Curtis, C.W., Reiner, I.: Methods of representation theory, vol. I. Wiley, New York (1981)
- Eisenbud, D.: Commutative algebra. Graduate Texts in Mathematics, 150. Springer-Verlag, New York (1995)
- Ellingsrud, G., Skjelbred, T.: Profondeur d’anneaux d’invariants en caractéristique p. Compositio Math. 41, 233–244 (1980)
- Elmer, J.: Modular covariants of cyclic groups of order p. J. Algebra 598, 134–155 (2022)
- Feshbach, M.: p-subgroups of compact Lie groups and torsion of infinite height in 𝐻∗(𝐵𝐺)H ∗ (BG) II. Michigan Math....
- Fleischmann, P.: Relative trace ideals and Cohen-Macaulay quotients of modular invariant rings. In: Computational methods for representations...
- Fleischmann, P., Kemper, G., Shank, J.R.: Depth and cohomological connectivity in modular invariant theory. Trans. Am. Math. Soc. 357, 3605–3621...
- Green, J.A.: Relative module categories for finite groups. J. Pure Appl. Algebra 2, 371–393 (1972)
- Himstedt, F., Symonds, P.: Equivariant Hilbert series. Algebra Number Theory 3, 423–443 (2009)
- Karagueuzian, D.B., Symonds, P.: The module structure of a group action on a polynomial ring: examples, generalizations, and applications....
- Karagueuzian, D.B., Symonds, P.: The module structure of a group action on a polynomial ring: a finiteness theorem. J. Am. Math. Soc. 20,...
- Kelly, G.M.: On the radical of a category. J. Austral. Math. Soc. 4, 299–307 (1964)
- Prest, M.: Purity, spectra and localisation. Encyclopedia of Mathematics and its Applications, 121. Cambridge University Press, Cambridge...
- Stacks Project Authors: Stacks Project, https://stacks.math.columbia.edu
- Stanley, R.P.: Invariants of finite groups and their applications to combinatorics. Bull. Am. Math. Soc. 1, 475–511 (1979)
- Symonds, P.: Structure theorems over polynomial rings. Adv. Math. 208, 408–421 (2007)
- Symonds, P.: Group action on polynomial and power series rings. Pacific J. Math. 195, 225–230 (2000)
- Symonds, P.: On the Castelnuovo-Mumford regularity of rings of polynomial invariants. Ann. Math. 174, 499–517 (2011)
- Symonds, P.: Group actions on rings and the Čech complex. Adv. Math. 240, 291–301 (2013)
- Totaro, B.: Group cohomology and algebraic cycles, Cambridge Tracts in Mathematics, 204. Cambridge University Press, Cambridge (2014)