Degrees of Curves in Abelian Varieties

Abstract

The degree of a curve C in a polarized abelian variety (X,λ) is the integer d=C·λ. When C generates X, we find a lower bound on d which depends on n and the degree of the polarization λ. The smallest possible degree is d=n and is obtained only for a smooth curve in its Jacobian with its principal polarization (Ran, Collino). The cases d=n+1 and d=n+2 are studied. Moreover, when X is simple, it is shown, using results of Smyth on the trace of totally positive algebraic integers, that if d 1.7719\, n, then C is smooth and X is isomorphic to its Jacobian. We also get an upper bound on the geometric genus of C in terms of its degree.

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