Some lattices over Q(√−3)

## Abstract In a previous paper, [12], we described six families of __K__ 3‐surfaces (over ℂ) with Picard‐number 19, and we identified surfaces with Picard‐number 20. In these notes we classify some of the surfaces by computing their transcendental lattices. Moreover, we show that the surfaces with

The faithful lattices of rank 2 p y 1 of the groups SL p are described. For 2 small primes p these and related lattices are investigated by computer. In particular a new extremal even unimodular lattice of rank 48 is constructed.

The Hecke transform is used on Hilbert modular forms over \(Q(\sqrt{ } 2)\) and \(Q(\sqrt{ } 3)\) to produce unusual numerical identities. The case for \(Q(\sqrt{ } 3)\) is complicated by the fact that there are two spaces of modular forms. The computer algebra system MACSYMA was used to find eigenf

For q a power of a prime p, it is known that if m is a power of p or m itself is a prime different from p having q as one of its primitive roots, then the roots of any irreducible polynomial of degree m and of non-zero trace are linearly independent Ž . over GF q . As a consequence the roots of such