For finitely generated modules M over free twisted commutative algebras A generated in degree one, the projective dimension of M(C^n) as an A(C^n)-module is eventually linear in n.
Hilbert series for twisted commutative algebras
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abstract
Suppose that for each n >= 0 we have a representation $M_n$ of the symmetric group S_n. Such sequences arise in a wide variety of contexts, and often exhibit uniformity in some way. We prove a number of general results along these lines in this paper: our prototypical theorem states that if $M_n$ can be given a suitable module structure over a twisted commutative algebra then the sequence $M_n$ follows a predictable pattern. We phrase these results precisely in the language of Hilbert series (or Poincar\'e series, or formal characters) of modules over tca's.
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2022 1verdicts
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A note on projective dimension over twisted commutative algebras
For finitely generated modules M over free twisted commutative algebras A generated in degree one, the projective dimension of M(C^n) as an A(C^n)-module is eventually linear in n.