Mathematics – Algebraic Geometry
Scientific paper
1995-12-06
Mathematics
Algebraic Geometry
3 EPSF figures, 32 pages. AMSTeX 2.1 with Amsppt and epsf.tex
Scientific paper
Let L be a normally generated line bundle on X; we say L satisfies property N_p (notation after Mark Green) if the matrices in the free resolution of R (the homogeneous coordinate ring of X) over S (the homogeneous coordinate ring of the projective space corresponding to the complete linear series |L|) have linear entries until the p-th stage. In this article we prove the following result: Let X be an elliptic ruled surface and let L be a product of p+1 base point free and ample line bundles on X. Then L satisfies property N_p. In particular we prove that numerical classes of all divisors which satisfies property N_p form a convex set. (Recall that Num(X) is generated by the class of a minimal section C_0 and by the class of a fiber f and that C_0 is ample.) As a corollary of the above result we show that the adjoint bundle K_X+(2p+3)A satisfies property N_p, if A is an ample line bundle.
Gallego Francisco
Purnaprajna Bangere P.
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