Let D be a domain with quotient field K. The ring of integer-valued polynomials over D is Int(D) := { f E K[S];f( D) C D) . We describe the divisorial prime ideals of Int(D) when D is a domain of Krull-type and, in particular, when D is also a d-ring
AbstractLet D be an integral domain which differs from its quotient field K. The ring of integer-val...
AbstractIn this paper, we show that any nonzero divisor class of a Krull domain D[S] contains a heig...
Given an integral domain D with quotient field K, we consider the ring Int(D):={f∈K[X];f(D)⊆D} of in...
AbstractLet D be the ring of integers of a number field K. It is well known that the ring Int(D) = {...
Let D be a domain with quotient eld K. The ring of integervalued polynomials over D is Int(D) := ff...
Let D be a Krull domain with quotient eld K. We study the class group of the integer-valued polynom...
Let D be a Krull domain with quotient eld K. We study the class group of the integer-valued polynom...
Let D be a domain with quotient eld K. The ring of integervalued polynomials over D is Int(D) := ff...
AbstractLet D be a Krull domain with quotient field K. We study the class group of the integer-value...
AbstractLet D be an integral domain, Γ be a torsion-free grading monoid, and D[Γ] be the monoid doma...
AbstractLet D be an integral domain, X be an indeterminate over D, and D[[X]] be the power series ri...
AbstractLet D be the ring of integers of a number field K. It is well known that the ring Int(D) = {...
A ring D is called an SFT ring if for each ideal I of D, there exist a finitely generated ideal J of...
Let D be a domain with quotient field K. Let E K be a subset; the ring of D-integer-valued polynom...
Let D be a domain with quotient field K. Let E K be a subset; the ring of D-integer-valued polynom...
AbstractLet D be an integral domain which differs from its quotient field K. The ring of integer-val...
AbstractIn this paper, we show that any nonzero divisor class of a Krull domain D[S] contains a heig...
Given an integral domain D with quotient field K, we consider the ring Int(D):={f∈K[X];f(D)⊆D} of in...
AbstractLet D be the ring of integers of a number field K. It is well known that the ring Int(D) = {...
Let D be a domain with quotient eld K. The ring of integervalued polynomials over D is Int(D) := ff...
Let D be a Krull domain with quotient eld K. We study the class group of the integer-valued polynom...
Let D be a Krull domain with quotient eld K. We study the class group of the integer-valued polynom...
Let D be a domain with quotient eld K. The ring of integervalued polynomials over D is Int(D) := ff...
AbstractLet D be a Krull domain with quotient field K. We study the class group of the integer-value...
AbstractLet D be an integral domain, Γ be a torsion-free grading monoid, and D[Γ] be the monoid doma...
AbstractLet D be an integral domain, X be an indeterminate over D, and D[[X]] be the power series ri...
AbstractLet D be the ring of integers of a number field K. It is well known that the ring Int(D) = {...
A ring D is called an SFT ring if for each ideal I of D, there exist a finitely generated ideal J of...
Let D be a domain with quotient field K. Let E K be a subset; the ring of D-integer-valued polynom...
Let D be a domain with quotient field K. Let E K be a subset; the ring of D-integer-valued polynom...
AbstractLet D be an integral domain which differs from its quotient field K. The ring of integer-val...
AbstractIn this paper, we show that any nonzero divisor class of a Krull domain D[S] contains a heig...
Given an integral domain D with quotient field K, we consider the ring Int(D):={f∈K[X];f(D)⊆D} of in...