Integer-valued rational functions over globalized pseudovaluation domains

Abstract

IntRIntLet D be a domain. Park determined the necessary and sufficient conditions for which the ring of integer-valued polynomials (D) is a globalized pseudovaluation domain (GPVD). In this work, we investigate the ring of integer-valued rational functions (D). Since it is necessary that D be a GPVD for (D) to be a GPVD, we consider (D), where D is a GPVD. We determine that if D is a pseudosingular GPVD, then (D) is a GPVD. We also completely characterize when (D) is a GPVD if D is a pseudovaluation domain that is not a valuation domain.