We formulate and prove an analogue of the Chebotarev density theorem over local fields. We show that these densities satisfy a functional equation and as a consequence, prove a conjecture of Bhargava, Cremona, Fisher and Gajović about splitting densities of p-adic polynomials.

We explain how to compute motivic invariants of generalized configuration space of which a motivating example is the space of irreducible multivariable polynomials in some fixed degree. To do this, we define a purely combinatorial generalization of the classical theory of symmetric polynomials by allowing variables of different weights. The key innovation is the notion of a type, generalizing partitions.

We prove a convergence result for the characteristic polynomials of the Frobenius action on the etale cohomology in l-adic towers of curves over a finite field. The key tool is a generalization of Fermat’s little theorem to matrices.

We provide counterexamples to a heuristic of Shankar-Tsimerman regarding unlikely intersections in a Shimura variety. In the positive direction, we prove a conjecture formulated by Shou-Wu Zhang’s AIM group regarding just-likely intersections in a product of modular curves.

We prove a conjecture on just-likely intersections in Shimura varieties formulated by Shou-Wu Zhang’s AIM group for Hilbert modular varieties with some mild restrictions.

This short note proves a simple criterion for a variety to have supersingular cohomology when it has a large group of automorphisms and an inner product. This criterion recovers many well known results in the literature.