The Degree Complexity of Smooth Surfaces of codimension 2

Abstract

D.Bayer and D.Mumford introduced the degree complexity of a projective scheme for the given term order as the maximal degree of the reduced Gr\"obner basis. It is well-known that the degree complexity with respect to the graded reverse lexicographic order is equal to the Castelnuovo-Mumford regularity (BS). However, little is known about the degree complexity with respect to the graded lexicographic order (A, CS). In this paper, we study the degree complexity of a smooth irreducible surface in 4 with respect to the graded lexicographic order and its geometric meaning. Interestingly, this complexity is closely related to the invariants of the double curve of a surface under the generic projection. As results, we prove that except a few cases, the degree complexity of a smooth surface S of degree d with h0( IS(2))≠ 0 in 4 is given by 2+ Y1(S)-12-a(Y1(S)), where Y1(S) is a double curve of degree d-12-a(S H) under a generic projection of S (Theorem mainthm2). Exceptional cases are either a rational normal scroll or a complete intersection surface of (2,2)-type or a Castelnuovo surface of degree 5 in 4 whose degree complexities are in fact equal to their degrees. This complexity can also be expressed only in terms of the maximal degree of defining equations of IS (Corollary cor:01 and cor:02). We also provide some illuminating examples of our results via calculations done with Macaulay 2 (Example Exam:01).