On set-theoretic complete intersections for smooth curves in three-dimensional affine schemes
Abstract
We prove that every local complete intersection curve in Spec(A), where A is a commutative Noetherian ring of dimension three, is a set-theoretic complete intersection. An analogous result is established for local complete intersection surfaces when A is a four-dimensional affine algebra over the algebraic closure of a finite field of p elements. Furthermore, we show that any local complete intersection curve (respectively, surface) in Spec(A), where A has dimension three (respectively, four), having trivial conormal bundle is, in fact, a complete intersection.
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