On rank 3 quadratic equations of projective varieties

Abstract

Let X ⊂ r be a linearly normal variety defined by a very ample line bundle L on a projective variety X. Recently it is shown in HLMP that there are many cases where (X,L) satisfies property QR (3) in the sense that the homogeneous ideal I(X,L) of X is generated by quadratic polynomials of rank 3. The locus 3 (X,L) of rank 3 quadratic equations of X in ( I(X,L)2 ) is a projective algebraic set, and property QR (3) of (X,L) is equivalent to that 3 (X) is nondegenerate in ( I(X)2 ). In this paper we study geometric structures of 3 (X,L) such as its minimal irreducible decomposition. Let equation* (X,L) = \ (A,B) ~|~ A,B ∈ Pic(X),~L = A2 B,~h0 (X,A) ≥ 2,~h0 (X,B) ≥ 1 \. equation* We first construct a projective subvariety W(A,B) ⊂ 3 (X,L) for each (A,B) in (X,L). Then we prove that the equality equation* 3 (X,L) ~=~ (A,B) ∈ (X,L) W(A,B) equation* holds when X is locally factorial. Thus this is an irreducible decomposition of 3 (X,L) when Pic (X) is finitely generated and hence (X,L) is a finite set. Also we find a condition that the above irreducible decomposition is minimal. For example, it is a minimal irreducible decomposition of 3 (X,L) if Pic(X) is generated by a very ample line bundle.