Abstract
AbstractLet $$\lambda $$ λ be a general length function for modules over a Noetherian ring R. We use $$\lambda $$ λ to introduce Hilbert series and polynomials for R[X]-modules, measuring the growth rate of $$\lambda $$ λ . We show that the leading term $$\mu $$ μ of the Hilbert polynomial is an invariant of the module, which refines both the algebraic entropy and the receptive algebraic entropy; its degree is a suitable notion of dimension for R[X]-modules. Similar to algebraic entropy, $$\mu $$ μ in general is not additive for exact sequences of R[X]-modules: we demonstrate how to adapt certain entropy constructions to this new invariant. We also consider multi-variate versions of the Hilbert polynomial.
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