On Seshadri constants of adjoint divisors on surfaces and threefolds in arbitrary characteristic

Abstract

We develop a new approach towards obtaining lower bounds of the Seshadri constants of ample adjoint divisors on smooth projective varieties X in arbitrary characteristic. Let x∈ X be a closed point and A an ample divisor on X. If X is a surface, we recover some known lower bounds by proving, e.g., that (KX+4A;x)≥ 3/4. If X is a threefold, we prove that for all δ>0 and all but finitely many curves C through x, we have (KX+6A).Cmultx C≥122-δ. In particular, if (KX+6A;x)<1/(22), then (KX+6A;x) is a rational number, attained by a Seshadri curve C.