The reciprocal complement of a polynomial ring in several variables over a field
Abstract
The *reciprocal complement* R(D) of an integral domain D is the subring of its fraction field generated by the reciprocals of its nonzero elements. Many properties of R(D) are determined when D is a polynomial ring in n≥ 2 variables over a field. In particular, R(D) is an n-dimensional, local, non-Noetherian, non-integrally closed, non-factorial, atomic G-domain, with infinitely many prime ideals at each height other than 0 and n.
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