Abstracts for Number theory lunch seminar

We discuss new estimates for the Vinogradov mean value, which are based on the Wooley's new method of "efficient congruencing". The new bounds are best possible in a certain range of the parameters, and improve upon existing bounds in another ranges. Applications are given to Waring's problem and other Diophantine problems. This is joint work with Trevor Wooley.

Artin's famous primitive root conjecture states that if n is an integer
other than -1 or a square, then there are infinitely many primes p such
that n is a primitive root modulo p. I will discuss a number field version
of this conjecture and its connection to the following Euclidean algorithm
problem. Let O be the ring of integers of a number field K. It is
well-known that if O is a Euclidean domain, then O is a unique
factorization domain. With the exception of the imaginary quadratic number

We consider normalised Hecke eigenforms of level n and weight k.  In
recent years, Edixhoven, Couveignes et al. (for n = 1) and the speaker
(generalisation to n > 1) developed an algorithm that, given such an f
and a positive integer m in factored form, computes the m-th coefficient
of the q-expansion of f, and whose running time is polynomial in n, k
and log m under the generalised Riemann hypothesis.  I will explain this
algorithm and the fundamental idea behind it, namely the computation of

A lattice in R^n is called well-rounded, abbreviated WR, if it contains n linearly independent shortest vectors. Such lattices have many symmetries and play a central role in discrete optimization, extremal lattice theory, and related number theoretic problems. WR lattices corresponding to integral quadratic forms are of specific interest in the arithmetic context. In this talk, I will discuss some results on distribution properties of integral WR lattices, mostly concentrating on the planar case.