When are the natural embeddings of classical invariant rings pure?

Melvin Hochster; Jack Jeffries; Vaibhav Pandey; Anurag K. Singh

doi:10.1017/fms.2023.67

Forum of Mathematics, Sigma (Jan 2023)

When are the natural embeddings of classical invariant rings pure?

Melvin Hochster,
Jack Jeffries,
Vaibhav Pandey,
Anurag K. Singh

Affiliations

Melvin Hochster: Department of Mathematics, University of Michigan, East Hall, 530 Church St., Ann Arbor, MI 48109, USA; E-mail:
Jack Jeffries: ORCiD; Department of Mathematics, University of Nebraska, 203 Avery Hall, Lincoln, NE 68588, USA; E-mail:
Vaibhav Pandey: Department of Mathematics, Purdue University, 150 N University St., West Lafayette, IN 47907, USA; E-mail:
Anurag K. Singh: Department of Mathematics, University of Utah, 155 South 1400 East, Salt Lake City, UT 84112, USA; E-mail:

DOI: https://doi.org/10.1017/fms.2023.67
Journal volume & issue: Vol. 11

Abstract

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Consider a reductive linear algebraic group G acting linearly on a polynomial ring S over an infinite field; key examples are the general linear group, the symplectic group, the orthogonal group, and the special linear group, with the classical representations as in Weyl’s book: For the general linear group, consider a direct sum of copies of the standard representation and copies of the dual; in the other cases, take copies of the standard representation. The invariant rings in the respective cases are determinantal rings, rings defined by Pfaffians of alternating matrices, symmetric determinantal rings and the Plücker coordinate rings of Grassmannians; these are the classical invariant rings of the title, with $S^G\subseteq S$ being the natural embedding.

Published in Forum of Mathematics, Sigma

ISSN: 2050-5094 (Online)
Publisher: Cambridge University Press
Country of publisher: United Kingdom
LCC subjects: Science: Mathematics
Website: https://www.cambridge.org/core/journals/forum-of-mathematics-sigma

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