Upcoming Talks

In this talk I will discuss a new proof of the p-adic monodromy theorem in p-adic Hodge theory using the theory of diamonds and Analytic Geometry à la Clausen and Scholze. This new perspective does not use explicitly  the classical theory of p-adic differential equations but the geometric aspects of Fargues-Fontaine curves and properties of the Fargues-Fontaine de Rham stack. If time permits I will mention the relation of this theory with Hyodo-Kato cohomology. 

LOCATION: Seminarraum 1.007, Endenicher Allee 60, Center for Mathematics, University of Bonn

Let $r_1(n)$ be the number of representations of n as the sum of a square and a square of a prime. We discuss the erratic behavior of $r_1$, which is similar to the one of the divisor function. We will show that the number of integers up to x that have at least one such representation is asymptotic to $(\pi/2) x / \log x$ minus a secondary term of size $x/(\log x)^{1+d+o(1)}$, where $d$ is the multiplication table constant. Detailed heuristics suggest very precise asymptotic for the secondary term as well.