Ring generated by binomial polynomials: Difference between revisions

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{{variation of|polynomial ring}}
==Definition==
==Definition==



Revision as of 17:02, 5 February 2009

This is a variation of polynomial ring
View a complete list of variations of polynomial ring OR read a survey article on varying polynomial ring

Definition

Let R be a commutative unital ring of characteristic zero. Let K be the quotient ring of R by the multiplicative subset of nonzero integers. Then, the ring generated by binomial polynomials over R is the subring of K[x] comprising all R-linear combinations of the polynomials:

(xr)=x(x1)(x2)(xr+1)r!.

where r0 (for r=0, this is the constant polynomial 1).

Equivalently, it is the tensor product with R of the ring generated by binomial polynomials over the rational integers, i.e., the ring generated by binomial polynomials over Z.

Equivalently, it is the ring Int(Z,R): the ring of all polynomials fK[x] such that f(Z)R.

Facts