B-orderings for all ideals B of Dedekind domains and generalized factorials
Abstract
This paper extends Bhargava's theory of p-orderings of subsets S of a Dedekind ring R valid for prime ideals p in R. Bhargava's theory defines for integers k1 invariants of S, the generalized factorials [k]!S, which are ideals of R. This paper defines b-orderings of subsets S of a Dedekind domain D for all nontrivial proper ideals b of D. It defines generalized integers [k]S,T, as ideals of D, which depend on S and on a subset T of the proper ideals ID of D. It defines generalized factorials [k]!S,T and generalized binomial coefficients, as ideals of D. The extension to all ideals applies to Bhargava's enhanced notions of r-removed p-orderings, and p-orderings of order h.
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