Talk

In this talk we will prove existence of heat kernel manifolds which in turn allows us to prove spectral theorem. The construction will give Manikshisundaram-Pleijel asymptotic expansion which encodes certain curvature expressions of the manifold.

Course Description: Neeman has recently introduced certain new techniques in the study of triangulated categories. These have been used to prove many important results, and have settled multiple open problems in algebraic geometry. In this course, we will discuss both these abstract techniques, and the growing body of works related to them along with several applications. In particular, we will introduce good metrics, completions, approximable triangulated categories, and see their various properties. Further, we will discuss applications to the non-existence of bounded t-structures, Rouquier dimension, semiorthogonal decompositions, representability results and so on. Most of the examples and applications in the course will be to algebraic geometry, but we note here that there are wider applications of the theory to representation theory and homotopy theory. See https://kabeermr.github.io/CourseOutline.pdf for the course outline.

Prerequisites: Some familiarity with derived and triangulated categories, and rudimentary knowledge of algebraic geometry.

This talk concerns Chinburg’s conjectures, which propose a connection
between two a priori different objects: Mahler measures and certain special
values of Dirichlet L-functions associated with odd quadratic characters.

The Mahler measure of a polynomial is the arithmetic mean of log|P| over
the unit torus. Chinburg’s conjecture (1984) states that, for each odd
quadratic Dirichlet character, there exists an integral bivariate rational
function (or, in its strongest form, an integral polynomial) whose Mahler
measure is equal to a rational multiple of the derivative at −1 of the
corresponding L-function. This relationship is currently known only in a
limited number of cases (18 values of the conductor of the Dirichlet
character).

I will present recent results obtained in collaboration with David Hokken
and Berend Ringeling, in which we construct new examples for previously
unknown conductors, thereby doubling the number of verified cases. Finally,
we establish a special case of the conjecture when coefficients in a
cyclotomic extension are allowed.