Intersections of components of the moduli space of abelian varieties

## Abstract In a previous paper we showed that for every polarization on an abelian variety there is a dual polarization on the dual abelian variety. In this note we extend this notion of duality to families of polarized abelian varieties. As a main consequence we obtain an involution on the set of

## Abstract The moduli space of (1, __p__)‐polarized abelian surfaces is a quasi‐projective variety. In the case when __p__ is a prime, we want to study its Kodaira dimension. We will show that it is of general type for __p__ > 71 and some smaller values of __p__. This improves an earlier result of

It is known that in the moduli space A A of elliptic curves, there exist precisely 9 1 ‫-ޑ‬rational points corresponding to the isomorphism class of elliptic curves with complex multiplication by the ring of algebraic integers of a principal imaginary quadratic number field. Here, we prove that in t

asked if every Abelian variety A defined over a number field k with dim A > 0 has infinite rank over the maximal Abelian extension k ab of k. We verify this for the Jacobians of cyclic covers of P 1 , with no hypothesis on the Weierstrass points or on the base field. We also derive an infinite rank

A class of identities in the Grassmann Cayley algebra was found by M. J. Hawrylycz (1994, ``Geometric Identities in Invariant Theory,'' Ph.D. thesis, Massachusetts Institute of Technology) which yields a large number of geometric theorems on the incidence of subspaces of projective spaces. In a prev