Newton-Okounkov bodies of exceptional curve valuations

Abstract

We prove that the Newton-Okounkov body of the flag E:= \ X=Xr ⊃ Er ⊃ \q\ \, defined by the surface X and the exceptional divisor Er given by any divisorial valuation of the complex projective plane P2, with respect to the pull-back of the line-bundle OP2 (1) is either a triangle or a quadrilateral, characterizing when it is a triangle or a quadrilateral. We also describe the vertices of that figure. Finally, we introduce a large family of flags for which we determine explicitly their Newton-Okounkov bodies which turn out to be triangular.