Seshadri Constant for a Family of Surfaces

Computing Seshadri Constants on Smooth Toric Surfaces

Abstract. In this paper we compute the Seshadri constants at the general point on many smooth polarized toric surfaces. We consider the case when the degree of jet separation is small or the core of the associated polygon is a line segment. Our main result is that in this case the Seshadri constant at the general point can often be determined in terms of easily computable invariants of the surf...

Seshadri Constants in a Family of Surfaces

Remarks on Seshadri Constants

Given a smooth complex projective variety X and an ample line bundle L on X. Fix a point x ∈ X. We consider the question, are there conditions which guarantee the maxima of the Seshadri constant of L at x, i.e ε(L, x) = n √ L? We give a partial answer for surfaces and find examples where the answer to our question is negative. If (X,Θ) is a general principal polarized abelian surface, then ε(Θ,...

Seshadri Constants on Rational Surfaces with Anticanonical Pencils

We provide an explicit formula for Seshadri constants of any polarizations on rational surfaces X such that dim |−KX | ≥ 1. As an application, we discuss relationship between singularities of log del Pezzo surfaces and Seshadri constants of their anticanonical divisors. We also give some remarks on higher order embeddings of del Pezzo surfaces.

On Nagata’s conjecture

T. Szemberg proposed in 2001 a generalization to arbitrary varieties of M. Nagata’s 1959 open conjecture, which claims that the Seshadri constant of r ≥ 9 very general points of the projective plane is maximal. Here we prove that Nagata’s original cojecture implies Szemberg’s for all smooth surfaces X with an ample divisor L generating NS(X) and such that L is a square. More generally, we prove...