Colloquium
Speaker: Patrick Polo (Visiting Professor IIT Bombay)
Host: Dipendra Prasad
Title: Representation theory of Algebraic groups in characteristic p
Time, day and date: 4:00:00 PM, Monday, March 3
Abstract: Representation theory of Algebraic groups in characteristic 
zero was completed by Cartan and Weyl a century back. But the 
representation theory of Algebraic groups, such as SL(n), in 
characteristic p, is still not understood in spite of efforts of many 
mathematicians. This Colloquium talk will be an introduction to the 
subject as well as to a course which the speaker will give here of about 
6 to 8 lectures, starting on Tuesday 4th March.
 

Commutative Algebra seminar
Speaker: P. M. S Sai Krishna (IIT Bombay)
Host: Tony Puthenpurakal
Title: Number of generators of a Cohen-Macaulay ideal- II
Time, day and date: 4:00:00 PM, Tuesday, March 3
Venue: Ramanujan Hall
Abstract: We look at some results related to the bound on the number of 
generators of an ideal of a Noetherian local ring. Under the assumption 
that the ideal is Cohen-Macaulay, we get a bound on the number of 
generators of an ideal in a Noetherian local ring (R) in terms of the 
embedding dimension of the ring, the dimension, and the multiplicity of 
the quotient ring. We extend this result to any Cohen-Macaulay ideal of 
a Noetherian ring.

Speaker: Martin Ulirsch.

Affiliation: Goethe University Frankfurt am Main.

Venue: Ramanujan Hall,

Time: 5 March, 4pm.

Title: What is the combinatorial shadow of a matrix?

Abstract: Tropicalization is a process that associates to an
algebro-geometric object a piecewise linear polyhedral shadow that
captures its essential combinatorial structure. In this talk, I will give
an overview of the numerous ways of how to extract tropical information
from a matrix. Our focus will be on naturally occurring logarithmically
concave sequences associated to a matrix (or more generally a matroid
respectively a bimatroid), an area of study, which in recent years has
tremendous progress due to the introduction of methods originating from
Hodge theory. A particular emphasis will be made to make this story
accessible; a background in algebraic geometry is not necessary to follow
this talk.

This talk draws from joint work with Felix Röhrle as well as with Jeff
Giansiracusa, Felipe Rincon, and Victoria Schleis.

CACAAG seminar
Speaker: Martin Ulirsch (Goethe University Frankfurt am Main)
Host: Madhusudan Manjunath
Title: Vector bundles in tropical geometry: An elementary approach
Time, day and date: 4:00:00 PM, , March 6
Venue: Room No 216, Department of Mathematics
Abstract: Tropical geometry studies a piecewise linear combinatorial 
shadow of degenerations and compactifications of algebraic varieties. A 
typical phenomenon is that many of the usual algebro-geometric objects 
have a tropical analogue that is intimately tied to its classical 
counterpart. An example is the theory of divisors and line bundles on 
algebraic curves, whose tropical counterparts have been crucial in 
numerous surprising applications to classical Brill--Noether theory and 
the birational geometry of moduli spaces.

One classical object that has resisted the effort of tropical geometers 
so far is the geometry of vector bundles beyond rank one. In this talk, 
I will outline an elementary approach to tropical vector bundles that 
builds on earlier work of Allermann. Although limited in scope, this 
theory leads to a satisfying tropical story for semistable vector 
bundles on elliptic curves and, more generally, semihomogeneous vector 
bundles on abelian varieties. The engines in the background that make 
these cases accessible to our methods are Atiyah's classification of 
vector bundles on elliptic curves, Fourier-Mukai transforms on abelian 
varieties, and the interactions with non-Archimedean uniformization.

This talk is based on joint work with Andreas Gross and Dmitry Zakharov 
as well as with Andreas Gross, Inder Kaur, and Annette Werner.

Statistics and Probability seminar
Speaker: Dr. Debapratim Banerjee (Ashoka University)
Host: Koushik Saha
Title: Some results on random matrices with dependent entries
Time, day and date: 11:00:00 AM, Tuesday, March 11
Venue: Ramanujan Hall
Abstract: In the last few years, we have seen remarkable progress on the theory of random matrices with independent entries. For example, one might consider the successful resolution of the Dyson Mehta conjectures. After the independent case being solved, recently some amount of interest has been shown in matrices with dependent entries. In this talk, we shall discuss our result on the spectral norm of Wigner matrices with dependent entries. When the entries of the matrix are correlated centered Gaussians, we show under some assumptions, the largest eigenvalue converges to the support of the limiting spectral distribution. Our result is in some sense optimal as we show counter examples (i.e. the largest eigenvalue goes beyond the support) under minor violations of the assumptions. We also have weak results in the non-centered case. Towards the end of the talk, I shall mention briefly the work I did during my PhD and my most recent research on operator limits of Wigner matrices. Due course of the talk, I shall also discuss some ongoing projects with my collaborators.

Partial Differential Equations seminar
Speaker: Anup Biswas (IISER Pune)
Host: Mayukh Mukherjee
Title: Pointwise convergence of the solutions to the initial data for the abstract heat
equation
Time, day and date: 2:30:00 PM, Tuesday, March 11
Venue: Ramanujan Hall
Abstract: In a recent study, Hartzstein, Torrea, and Viviani characterized all the weights $v$ for which the solution to the classical heat equation with initial data $f$, where $f\in L^p_v(\mathbb{R}^n)$, converges to $f$ as $t\to 0$, almost everywhere and for every $f\in L^p_v(\mathbb{R}^n)$. This work is, of course, in the spirit of Carleson’s program, where similar investigations have been conducted for the Schrödinger operators. In this talk, we will extend the results of Hartzstein et al. to a broader class of operators on metric measure spaces with a volume doubling condition, including $\phi$-nonlocal operators, mixed local-nonlocal operators, the Laplacian with a Hardy potential, the Laplacia-Beltrami operators, Laplacian on fractals and many others.

This talk is based on a recent joint work with Bhimani and Dalai.

Speaker: Dr. Devendra R, Mathematics Department, IIT Bombay

Time: 3.30 pm

Title: Gaussian channels

Abstract: In this talk, we shall discuss the three well-known definitions
of finite mode quantum Gaussian channels found in the literature. We will
rigorously establish the equivalence of all these definitions, even though
this equivalence is generally acknowledged.  As an application, we answer
some of the questions asked by Parthasarathy in Indian J Pure Appl Math
46, 419–439 (2015).

Speaker: Debsoumya Chakraborti (University of Warwick)
Host: Niranjan Balachandran
Title: Results in Extremal Combinatorics
Time, day and date: 4:30:00 PM, Tuesday, March 11
Venue: Online talk only (https://tel.meet/hqy-hswu-jho?hs=5)
Abstract: A key objective of extremal combinatorics is to investigate various conditions on combinatorial structures (such as graphs, set systems, and simplicial complexes) that guarantee the existence of specific substructures. In this talk, I will concentrate on two central topics within this theme of extremal combinatorics:
1. Tur\'an problems and
2. Embedding spanning subgraphs.
I will begin with a gentle introduction to the first topic, highlighting a few fundamental questions in the field. In this context, I will introduce the Erd\H{o}s--Sauer problem that asks for the maximum possible number of edges that an $n$-vertex graph can have without containing an $r$-regular subgraph. The problem
had seen no progress since Pyber's work in 1985 until recently when Janzer and Sudakov resolved this problem up to a multiplicative constant depending on $r$. We resolve the Erd\H{o}s--Sauer problem up to an absolute constant factor (not depending on $r$) as follows. There exists an absolute constant $C$ such that for
each positive integer $r$, every $n$-vertex graph with at least $Cr^2n\log \log n$ edges contain an $r$-regular subgraph. Moreover, we show this to be tight up to the value of $C$ for all $r\geq 3$ and $n\geq n(r)$.

Next, I will transition to the second topic, starting with two classical results on embedding the Hamilton cycle (a cycle that visits every vertex exactly once):
(i) Dirac's theorem, which establishes a sharp minimum degree condition on a graph to ensure the existence of a Hamilton cycle, and
(ii) Theorems on various orientations of Hamilton cycles in tournaments.
In the last decade, extending subgraph embedding problems to the setting of transversals over a collection of graphs has sparked significant interest in the literature. I will introduce this concept and then discuss the transversal generalizations of (i) and (ii). Some of these include results from my own work in various papers.

Numerical Analysis Seminar
Speaker: Prof. Carsten Carstensen
Host: Neela Nataraj
Title: Computation of Plates
Time, day and date: 3:00:00 PM, Wednesday, March 12
Venue: Ramanujan Hall
Abstract: The general and short title might be better specified and then stands for the mathematical foundation of the adaptive computation of plates or simply the numerical treatment of the biharmonic equation with conforming and nonconforming schemes. In the spirit of John H. Argyris (1913-2004) the complicated conforming finite element scheme marks the beginning of the finite element area with a straightforward mathematics and an involved implementation.
The presentation discusses the simplest lowest-order nonconforming finite element schemes with an easy implementation and a more involved mathematics. In fact, 30 lines of Matlab suffice in a program for basic Morley finite element simulations.
The talk concerns a larger class of popular (piecewise) quadratic schemes for the fourth-order plate bending problems based on triangles are the nonconforming Morley finite element, two discontinuous Galerkin, the C0 interior penalty, and the WOPSIP schemes. The first part of the presentation discusses recent applications to the linear bi-Laplacian and to semi-linear fourth-order problems like the stream function vorticity formulation of incompressible 2D Navier-Stokes problem and the von Karman plate bending problem. The role of a smoother is emphasised and reliable and efficient a posteriori error estimators give rise to adaptive mesh-refining strategies that recover optimal rates in numerical experiments. The last part addresses recent developments on adaptive multilevel Argyris finite element methods. The presentation is based on joint work with B. Grass le (University of Zurich) and N. Nataraj (IITB in Mumbai) partly reflected in the references below.
The eye-catcher is a photo from the Monash campus and illustrates that the plate simulation may fail because of interactions with other loadings and
related to simulations in [8].

Combinatorics Seminar

Speaker: Prof. Anand Srivastav (Christian-Albrechts-Universität zu Kiel, Kiel, Germany)
Host: Sudhir Ghorpade
Title: The k-Hamilton Cycle Maker-Breaker Game
Time, day and date: 4:00:00 PM, Wednesday, March 12
Venue: Ramanujan Hall
Abstract: We study the Maker-Breaker k-Hamilton cycle game, k an integer constant, on the complete graph on n nodes, where the aim of Maker is to build k Hamilton cycles, while Breaker wishes to prevent it. This is a two-person perfect information game on a finite board, namely the edges of the complete graph.
The game is played under the following rules. Maker and Breaker alternately choose edges of the complete graph not taken by any of the players so far. Maker starts, and chooses one edge of the complete graph. Thereafter, Breaker may choose upto b free edges. The game ends without a draw latest after all edges have been choosen by the two players.
In such games, the challenging problem is to find the threshold bias b*, an integer,  so that for b < b* there is a winning strategy for Maker, but for b > b* Breaker has a winning strategy, and to present such strategies.
Krivelevich (J. AMS 2010) determined in a breakthrough paper, extending foundational work of Chvatal and Erdös (1978), the asymptotially exact threshold bias to be (1 - o(1))n/ln(n) for k = 1.  Brüstle, Clusiau, Narayan, Ndiaye, Reed & Seamone (2023) showed that for k = 1 the game can be won by Maker in at most n + Cn/sqrt(ln(n)) many rounds, C a constant, if b < n/ln(n) - cn/ln(n)^{3/2}. This is an asymptotically optimal round complexity.
The game for k > 1 is much more complicated because we must ensure edge-disjointness of the k Hamilton cycles, while these cycles are competing for favorable edges. We show that Maker wins the k-Hamilton cycle game, if b < n/ln(n) -c n/ln(n)^{3/2}, in at most kn + c'n/sqrt(ln(n)) rounds, c, c' being constants depending on k only.
This round complexity is asymptotically optimal as well.

(joint work with Jan Geest, Department of Mathematics, Kiel University)