Upper level sets of Lelong numbers on Hirzebruch surfaces

Abstract

Let Fa denote the Hirzebruch surfaces and Tα,α(Fa) denotes the set of positive, closed (1,1)-currents on Fa whose cohomology class is α F+α H where F and H generates the Picard group of Fa. E+β(T) denotes the upper level sets of Lelong numbers (T,x) of T∈ Tα,α(Fa). When a=0, ( Fa= P1× P1), for any current T∈ Tα,α'( P1× P1), we show that E+(α+α')/3(T) is contained in a curve of total degree 2, possibly except 1 point. For any current T∈ Tα,α'( Fa), we show that E+β(T) is contained in either in a curve of bidegree (0,1) or in a+1 curves of bidegree (1,0) where β≥ (α + (a+1)α)/(a+2).