English

Evil Primes and Superspecial Moduli

Number Theory 2007-05-23 v1 Algebraic Geometry

Abstract

For a quartic primitive CM field KK, we say that a rational prime pp is {\it evil} if at least one of the abelian varieties with CM by KK reduces modulo a prime ideal \gerpp\gerp| p to a product of supersingular elliptic curves with the product polarization. We call such primes {\it evil primes for KK}. In \cite{GL}, we showed that for fixed KK, such primes are bounded by a quantity related to the discriminant of the field KK. In this paper, we show that evil primes are ubiquitous in the sense that, for any rational prime pp, there are an infinite number of fields KK for which pp is evil for KK. The proof consists of two parts: (1) showing the surjectivity of the abelian varieties with CM by KK, for KK satisfying some conditions, onto the the superspecial points modulo \gerp\gerp of the Hilbert modular variety associated to the intermediate real quadratic field of KK, and (2) showing the surjectivity of the superspecial points modulo \gerp\gerp of the Hilbert modular variety associated to a large enough real quadratic field onto the superspecial points modulo \gerp\gerp with principal polarization on the Siegel moduli space.

Keywords

Cite

@article{arxiv.math/0512472,
  title  = {Evil Primes and Superspecial Moduli},
  author = {Eyal Z. Goren and Kristin E. Lauter},
  journal= {arXiv preprint arXiv:math/0512472},
  year   = {2007}
}

Comments

11 pages