Rigidity of Graded Integral Domains and of their Veronese Subrings
Daniel Daigle
TL;DR
This paper investigates the rigidity properties of G-graded integral domains and their Veronese subrings, focusing on how non-rigidity and derivation extension relate within the structure.
Contribution
It provides new insights into the conditions under which Veronese subrings inherit non-rigidity and how derivations extend in G-graded integral domains.
Findings
Non-rigidity of B does not necessarily imply non-rigidity of B(H).
Derivations of B(H) can sometimes be extended to B.
Characterization of subgroups H with non-rigid B(H).
Abstract
A ring R is said to be rigid if the only locally nilpotent derivation of R is the zero derivation. Let G be an abelian group, and B = (direct sum of B_i for i in G) be a G-graded commutative integral domain of characteristic 0. For each subgroup H of G, consider the Veronese subring B(H) of B, defined by B(H) = (direct sum of the B_i for i in H). We study the following questions. If B is non-rigid, does it follow that B(H) is non-rigid? Can derivations of B(H) be extended to derivations of B? What are the properties of the set of subgroups H of G such that B(H) is non-rigid?
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Taxonomy
TopicsRings, Modules, and Algebras · Advanced Topics in Algebra · Commutative Algebra and Its Applications