Talk

This will be an experimental “Jazz session” where both of us will be explaining our recent results together.
We’ll also be encouraging audience participation and are aiming not only at 4-manifolds experts.

Pentagramma Mirificum (the miraculous pentagram) is a beautiful geometric construction studied by Napier and Gauss. Its algebraic description yields the simplest instance of cluster transformations, a remarkable family of recurrences which arise in diverse mathematical contexts, from representation theory and enumerative combinatorics to theoretical physics and classical geometry (Euclidean, spherical, or hyperbolic). The lecture will explore some of the most basic and concrete examples of cluster transformations, and briefly discuss their properties such as periodicity, integrability, Laurentness, and positivity. 

Sergey Fomin studied at St. Petersburg State University where he received his doctorate in 1982 with Leonid Ossipov and Anatoli Verschik. He was a lecturer at St. Petersburg Electrotechincal University (LETI) from 1982 to 1991. From 1992 to 2000 he was on the faculty at the Massachusetts Institute of Technology (Assistant Professor 1993, Associate Professor 1996) before moving to a position at the University of Michigan in 1999, where he has been Robert M. Thrall Collegiate Professor since 2007. He was also a scientist at the Institute of Computer Science and Automation of the Russian Academy of Sciences in St. Petersburg from 1991 to 2005. He was a visiting scientist at the Mittag-Leffler-Institut (1992, 2005), MSRI, the Isaac Newton Institute in Cambridge, the University of Strasbourg (IRMA), the Hausdorff Institute in Bonn, and the Erwin Schrödinger Institute for Mathematical Physics in Vienna. In 2012 he became a fellow of the American Mathematical Society. He was invited speaker at the International Congress of Mathematicians 2010 in Hyderabad. In 2018 he received the Leroy P. Steele Prize of the American Mathematical Society.

His research is on combinatorics with applications to geometry, algebra, and representation theory, where he introduced cluster algebras with Andrei Zelevinsky. He has also worked in ennumerative geometry (Schubert calculus) and mathematical physics (e.g. Yang-Baxter equation, Bethe ansatz).

Joint with Cheyne Glass, Micah Miller, and Thomas Tradler.

In the first part of the talk, I will describe the formulae for the Hodge and de Rham characteristic classes of holomorphic bundles solely in terms of their clutching functions. To do so, I define a map of simplicial presheaves, the Chern character, that assigns to every sequence of composable isomorphisms of vector bundles with holomorphic connections that do not necessarily preserve the connections, an appropriate sequence of holomorphic forms. We then apply this map of simplicial presheaves to the Cech nerve of a cover of a complex manifold and assemble the data by passing to the totalization. In this way, we obtain a map of simplicial sets that on the vertices produces an explicit formula for the Hodge Chern character of a bundle in terms of its clutching functions. On the edges, we obtain similar invariants associated to isomorphisms between bundles. Similarly, we obtain suitable Hodge and de Rham Chern characters in the equivariant setting.

The asymptotic behaviour of moments of L-functions is of special interest to number theorists and there
are conjectures that predict the shape of the moments for families of L-functions of a given symmetry type.
However, only some results for the first few moments are known. In this talk we will consider the asymptotic
behaviour of the first moment of the product of a Hecke L-function and a symmetric square L-function
in the weight aspect. This is joint work with  O. Balkanova, G. Bhowmik, D. Frolenkov. 

The theory of random Delaunay triangulations of the plane has been proposed by
David-Eynard and others as a discrete model for 2-dimensional quantum gravity: In this model
the role of a continuous metric is played by a Delaunay triangulation while flat metrics
correspond to isoradial triangulations (on which one can define a theory of discrete analyticity).
Like the continuous case, the partition function for this discrete theory is given by a suitably
normalized determinant of a Beltrami-Laplace operator which varies with the choice of
triangulation. An elegant formula of Richard Kenyon expresses this determinant as a finite sum
of local contributions when the triangulation is both isoradial and periodic. In joint work with
François David we consider smooth perturbations of a periodic isoradial triangulation and obtain
an asymptotic expansion for the second variation of the log-determinant of the discrete
Beltrami-Laplace operator. This result can be interpreted as a discretization of the formula for
the second variation (of the logarithm) of the continuous partition function know from conformal
field theory; using this interpretation we can identify the central charge in this discrete setting.