[论文解读] The geometry of 2-regular algebraic sets

A celebrated Theorem of Del Pezzo and Bertini classifies the nondegenerate irreducible varieties X ⊂ P r k of minimal degree (deg X = 1+codim X), where k is an algebraically closed field. There is also a cohomological characterization: X has minimal degree in its linear span if and only if X is 2-regular in the sense of Castelnuovo and Mumford. In this paper we extend these theorems to the reducible case. We prove that any 2-regular algebraic set ( ≡ reduced scheme) X ⊂ P r k can be constructed inductively from varieties of minimal degree in a simple way, and we give a geometric criterion similar to minimal degree: a reduced scheme X ⊂ P r k is 2-regular if and only if X is small, which means that if Λ ⊂ P r is any linear subspace, then the geometric degree of Λ ∩ X is at most 1 more than the codimension of Λ ∩ X in Λ.