Surfaces on the Severi line in positive characteristics

Abstract

Let X be a minimal surface of general type over an algebraically closed field k of char.(k)=p 0. If the Albanese morphism aX:X AlbX is generically finite onto its image, we formulate a constant c(X,L) 0 for a very ample line bundle L on AlbX such that c(X,L)=0 if and only if AlbX=2 and aX: X AlbX is a double cover. A refined Severi inequality K2X (4+ min\\,c(X,L),\,13\,\)(OX) is proved. Then we prove that K2X=4(OX) if and only if the canonical model of X is a flat double cover of an Abelian surface.