Abstract
Throughout this paper, all rings are commutative with identity and all ring homomorphisms preserve the identity. Also, all differential rings are ordinary, i.e., possess a single derivation operator which is suppressed from the notation. If A is a differential ring and x ∈ A, then x(n) denotes the nth derivative of x; we note that x(0) = x. A subset of a differential ring is called differential if it contains the derivative of each of its elements.
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