Positivity of line bundles on general blow-ups of abelian surfaces

TLDR: In this paper, the authors provided a criterion for the very ampleness of a line bundle on a polarized abelian surface, where the line bundle is defined as the blow-up of a point at general points with exceptional divisors.

Abstract: Let $(S,L_{S})$ be a polarized abelian surface, and let $M = c \cdot \pi^*L_S - \alpha \cdot \sum_{i=1}^r E_i$ be a line bundle on ${\rm Bl}_{r}(S)$, where $\pi:{\rm Bl}_{r}(S) \rightarrow S$ is the blow-up of $S$ at $r$ general points with exceptional divisors $E_{1},\dots,E_{r}$. In this paper, we provide a criterion for $k$-very ampleness of $M$. Also, we deal with the case when $S$ is an arbitrary surface of Picard number one with a numerically trivial canonical divisor.