Let ${\displaystyle {X}}$  be a smooth projective variety, ${\displaystyle {L}}$  an ample line bundle on it, ${\displaystyle {x}}$  a point of ${\displaystyle {X}}$ , ${\displaystyle {{\mathcal {C}}_{x}}}$  = { all irreducible curves passing through ${\displaystyle {x}}$  }.

Here, ${\displaystyle {L\cdot C}}$  denotes the intersection number of ${\displaystyle {L}}$  and ${\displaystyle {C}}$ , ${\displaystyle {\operatorname {mult} _{x}(C)}}$  measures how many times ${\displaystyle {C}}$  passing through ${\displaystyle {x}}$ .

Definition: One says that ${\displaystyle {\epsilon (L,x)}}$  is the Seshadri constant of ${\displaystyle {L}}$  at the point ${\displaystyle {x}}$ , a real number. When ${\displaystyle {X}}$  is an abelian variety, it can be shown that ${\displaystyle {\epsilon (L,x)}}$  is independent of the point chosen, and it is written simply ${\displaystyle {\epsilon (L)}}$ .

• Lazarsfeld, Robert (2004), Positivity in Algebraic Geometry I - Classical Setting: Line Bundles and Linear Series, Springer-Verlag Berlin Heidelberg, pp. 269–270
• Bauer, Thomas; Grimm, Felix Fritz; Schmidt, Maximilian (2018), On the Integrality of Seshadri Constants of Abelian Surfaces, arXiv:1805.05413