On Integral Representations over Cyclotomic Fields

Let p be an odd prime number, K an imaginary abelian field with z p 2 K Â ; and K 1 =K the cyclotomic Z p -extension with its nth layer K n : In the previous paper, we showed that for any n and any unramified cyclic extension L=K n of degree p; LK nþ1 =K nþ1 does have a normal integral basis (NIB) e

Kahn conjectured in 1988 that, for each prime power q, there is an integer n(q) such that no 3-connected GF(q)-representable matroid has more than n(q) inequivalent GF(q)-representations. At the time, this conjecture was known to be true for q=2 and q=3, and Kahn had just proved it for q=4. In this

## Sprbljig A new approach to the boundary value problem for the classic Dirac equation is proposed. This approach is based on a recent version of the metaharmonic quaternionic analysis developed in [14-161. In particular, the following problem is studied: when and how a given function on a surfac

The aim of this note is to show that the (well-known) factorization of the 2 nϩ1 th cyclotomic polynomial x 2 n ϩ 1 over GF(q) with q ϵ 1 (mod 4) can be used to prove the (more complicated) factorization of this polynomial over GF(q) with q ϵ 3 (mod 4).

dedicated to professor shaoxue liu on the occasion of his 70th birthday By counting the numbers of isomorphism classes of representations (indecomposable or absolutely indecomposable) of quivers over finite fields with fixed dimension vectors, we obtain a multi-variable formal identity. If the quive