Abstract
For any integral doma in A with quotient filed K and for any positive integer n define Int .We show that, with certain restrictions placed on A and with n = 1, Int(A,1) is a Prufer domain and we use this to prove the following theorem: If I, J are finitely generated idelas in Int(a,1) satisfying I(a) = J(a) for every a∊A, then I = J.
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