• Date: 25 Nov 2024 

Speaker: Ayush Khare

Title: Moduli problems, G.I.T. and stacks 

Abstract: Moduli problems in algebraic geometry arise in connection with classification problems. Given a type of geometric object, we aim to classify a collection of objects A up to a suitable notion of equivalence ~, and wanted to give A/ ~ some algebro-geometric structure. Meanwhile G.I.T. is a framework in algebraic geometry that provides a systematic way to construct quotients of algebraic varieties or schemes by group action. Algebraic stacks provide a framework for handling the cases where moduli spaces require a more general structure than scheme.

• Date: 16 Nov 2024

Speaker: Biswadeep Karmakar

Title: An introduction to slice knots and knot concordance

Abstract: In this talk, we will explore the fascinating topics of 'slice knots' and 'knot concordance' within the realm of low-dimensional topology. A 'slice knot' is a knot that bounds a smooth disk in the 4-dimensional ball, offering an important generalization of classical unknots in the 3-dimensional space. We will begin by introducing the basic concepts of slice knots and the related theory of knot concordance, which seeks to classify knots in a different manner than usual. Along the way, we'll discuss some key examples, the connection between slice knots and topological invariants like knot signatures, and how these can shed light on deeper geometric questions such as the existence of exotic structures on smooth manifolds, etc. My hope is that this lecture will provide an accessible and engaging introduction to these topics, while also highlighting the rich interplay between geometry, algebra, and topology that makes the study of knots in higher dimensions so intriguing.

• Date: 09 Nov 2024
  Speaker: Dr. Arun Kumar

Title: Endomorphisms of Equivariant algebraic K-theory.

Abstract: We will start this talk by giving a brief construction of the equivariant motivic homotopy category. This category is pretty useful in the study of cohomology theories over schemes with group actions. We will then discuss my research (joint work with Girja Tripathi) on the endomorphisms of the equivariant algebraic K-theory space in this category. Our main result is that in the case of actions of finite groups, the endomorphisms are completely determined by the endomorphisms of the 0th K-group presheaf. This is a generalization of a result of Riou which uses the fact that algebraic K-theory is representable by the infinite Grassmannian in the motivic homotopy category.

• Date: 26 Oct 2024

Speaker: Dr. Aditya Tiwari

Title: Sturm Liouville Decomposition

Abstract: A Sturm-Liouville equation is a second-order homogeneous linear differential equation. On a given interval, a Sturm-Liouville equation gives rise to a self-adjoint, unbounded operator, referred to as a Sturm-Liouville operator. We will demonstrate the existence of sequence of the eigenvalues and, consequently, a sequence of eigenfunctions of a Sturm-Liouville operator. This sequence of eigenfunctions of a Sturm-Liouvlle operator forms a complete basis for the space of square-integrable functions on the given interval, leading to Sturm-Liouville series, which generalize Fourier series. On a compact Riemannian manifold without boundary, the Laplace-Beltrami operator, like a Sturm-Liouville operator, is a self-adjoint, unbounded operator, and its eigenvalues form an increasing sequence.

• Speaker: Dr. Sohan Ghosh

Date: 04 Oct 2024 

Title: Fine Selmer groups

Abstract: Let K be any number field. The ideal class group of K, Cl(K) measures how far the ring of integers of K is from being a principal ideal domain. We fix an odd prime p. For each n ≥ 1, let ζp^n be a primitive p n-th root of unity in algebraic closure of Q. Now, consider the (cyclotomic) tower of field extensions Kn/K such that Kn ⊂ S n≥1  K(ζp^n ) and Gal(Kn/K) ∼= Z/pnZ. Let Cl(Kn)(p) denotes the p-primary part of Cl(Kn). Then it is well known that there exists constants λ, μ, ν ∈ N ∪ {0}, depending on p and independent of n, such that #Cl(Kn)(p) = p^ (λn+μpn+ν)  (1) for n >> 0. Iwasawa conjectured that μ = 0 in equation (1) i.e; #Cl(K_n)(p) = p^ (λn+ν) for n >> 0. This conjecture was proven for abelian number fields by Ferrero, Washington in 1979 and later by Sinnot in 1984, but it is still an open question for general number fields. In 2005, Coates and Sujatha connected this conjecture with the arithmetic of elliptic curves. More precisely, they found a deep relation between Iwasawa’s μ = 0 conjecture and the structure of p∞-fine Selmer group of an elliptic curve, which is a subgroup of the classical p∞-Selmer group of an elliptic curve. In this talk, we will discuss the properties of the p∞-fine Selmer group of an elliptic curve over certain compact p-adic Lie extensions of global fields.

• Date: 21 Sep 2024

Speaker: Debattam Das

Title:  Orderibility in $3$-manifolds groups

Abstract: A group is said to be left orderable if there is a left invariant order of the elements, presents in the group. In this talk, We will discuss the orderability on $ 3 $-manifold groups and also the relation between orderbility and generalised $ n $- torsion elements. In the ending note, we will see some recent results on that.

• Date: 14 Sep 2024

Speaker: Dr. Pabitra Barman

Title:  Moduli spaces of real convex projective structures on surfaces

Abstract: The study of moduli spaces of various geometric structures on surfaces has been a subject of significant interest for many years. In this talk, we will introduce real convex projective structures on surfaces and highlight some key results related to their moduli space. Specifically, we will focus on the Fock-Goncharov coordinate system to parametrize their moduli space for n = 3.

• Date: 24 Aug 2024

Speaker: Pravin Kumar V

Title:  Ordered Groups and Mapping Class Groups

Abstract: An important class of abstract groups is one that is totally ordered, with the ordering being invariant under left-multiplications. In the first part of the talk,  I will introduce the theory of orderable groups and provide a set of examples that arise from topology to illustrate the scope of this subject. In the second part of the talk, I will introduce the mapping class group and discuss the results we obtained from our recent work with Dr. Apeskha Sanghi and Dr. Mahender Singh.

• Date: 3 Aug 2024

Speaker: Dr. Rachna Aggarwal

Title: Isometry groups of complex Hyperbolic Spaces

Abstract: In this talk, we will discuss the isometry groups of complex hyperbolic spaces. Specifically,

We will explore the conjugacy classes in the group of isometries of these hyperbolic spaces. We

will begin with this discussion on hyperbolic spaces in two dimensional plane, then in higher

dimensional complex space and further in infinite dimensional complex Hilbert space. We will

use some basics from complex analysis, linear algebra and functional analysis.

This is a joint work with Dr. Mukund Madhav Mishra and Dr. Krishnendu Gongopadhyay. 

• Date : 11 July 2024

Speaker : Dr Buddhadev Hajra (TIFR Mumbai)

Title : Some Results About Topology of Complex Algebraic Varieties 

Abstract : In this talk, I will discuss some well-known topological properties of algebraic varieties. Topological methods are often very effective for proving results in Algebraic Geometry. While I won't provide all the proofs, I will present some interesting examples to illustrate these concepts. I will also introduce an important lemma due to Madhav Nori, commonly known as 'Nori's Lemma' or 'Nori's Exact Sequence', that has been extensively used by many mathematicians in their research. Nori himself employed this result to solve a conjecture posed by Oscar Zariski, which I will address very briefly. 

• Date : 29 April 2024

Speaker : Dr. Sudip Pandit

Title : The Weil Conjecture after 75 years 

Abstract : In 1949, Andre Weil formulated his famous conjecture intending to count the number of points of an algebraic variety over finite fields–it is a theorem now. This conjecture leads to revolutionary developments in algebraic and arithmetic geometry, including Grothendieck's theory of schemes and their cohomology. In this talk, we aim to explore a brief survey of the conjecture and the beautiful ideas used in the proof inspired by the ideas in topology.

• Date : 17 April 2024 

Speaker : Dr. Shane D'Mello

Title : The topology of real algebraic varieties 

Abstract : A study of the topology of real algebraic varieties involves understanding how the real algebraic structure affects the topology of real algebraic varieties in various contexts. We will begin with so-called Hilbert's sixteenth problem and the attempts made to tackle it, and then discuss its generalizations.

• Date : 30 March 2024 

Speaker : Ronald Huidrom

Title : A brief overview of categorification, Khovanov (co)homology and ramifications 

Abstract : A homology theory is a more powerful topological invariant than the Euler characteristic in that it is essentially a functor from the category of spaces to the category of graded modules besides hiding the Euler characteristic as an alternating sum of the ranks of the chain modules. A homology theory is a categorification of the Euler characteristic.In this talk, we briefly look at a categorification of the Jones polynomial, known as the Khovanov homology. Given an oriented link diagram, we shall construct a homology theory whose graded Euler characteristic is the Jones polynomial. This homology theory is invariant under Reidemeister moves and is strictly more powerful than the Jones polynomial. 

• Date : 23 March 2024 

Speaker : Arti Sahu Gangopadhyay

Title : Introduction to Finsler Geometry 

Abstract : Finsler space is a pair of smooth manifolds and a smoothly varying family of Minkowski norms. In this talk I will first define the Minkowski norm on a vector space and then give the definition of Finsler manifolds. Then we will discuss some examples

• Date : 16 March 2024 

Speaker : Vinita Mukund Mulay

Title : Elephant Random Walks

Abstract : The Elephant Random Walk (ERW) is a discrete random walk with unbounded memory. It is one of the few history-dependent processes with known exact moments. Due to its unbounded memory, the ERW shows anomalous diffusion, a behavior seen in various real-life processes. The walk has gained a lot of attention due to this. In the ERW, at every time step, the elephant chooses a step from the past uniformly at random and repeats the chosen step with some fixed probability. Otherwise, it takes a step in the opposite direction of the chosen step. In this talk, we'll formally define the ERW, discuss its various features, and try to understand the techniques used to study its behavior.

• Date : 02 March 2024 

Speaker : Dr. Lokenath Kundu

Title : Dehn Function and Growth Function of Groups 

Abstract : Our main focus will be on introducing the Dehn function and Growth function of any group using simple examples. We'll mention some interesting results, although we might not go into all the detailed proofs. Additionally, we'll highlight a few unresolved problems and conjectures along the way. 

• Date : 17 February 2024 

Speaker : Dr. Ayush Udeep

Title : Minimal Embedding of p-groups in Symmetric Groups 

Abstract : Minimal Embedding of p-groups in Symmetric Groups 

• Date : 10 February 2024 

Speaker : Shreepad Agarwal

Title : Lattices in Euclidean Spaces

Abstract : Lattices in Euclidean Spaces 

• Date : 03 February 2024 

Speaker : Dr. Visakh Narayanan

Title : The Shape of our Universe 

Abstract : For so many centuries, we thought our earth was flat. This was basically because that is how it "feels to our senses"! Now with the development of technology, we understand that we were wrong and our earth looks like a round sphere. This is an important lesson, "sometimes, what is obvious to our senses is not the truth"! Now a question that arises in the same line of thought is, "what is the shape of our universe"? It feels like we are in "flat infinite three-dimensional space". But as in the above example, there is no reason why it should be. In the past century, a subject has been developing which could potentially be used to make some progress towards this question. It is called "Topology". Right now, we have an entire "jungle of possible models" for the shape of the universe. The wild animals in this jungle are called "three-manifolds". Most likely we would find the real shape of our universe in this jungle! It is to be noted that in recent years, we are experiencing a merger between Physics and Mathematics through the study of this jungle. The main players in this merger are called "Quantum invariants". The talk is an introduction to this jungle and its close connections with Physics. It is not going to be about the abstract nonsense which goes into this study, but we will concentrate on its philosophical aspects. It is aimed at motivating the daring ones to start their own journey through the jungle. The only prerequisite would be curiosity! 

• Date : 24 January 2024

Speaker : Divya Setia

Title : Representation theory of Lie algebras and its connection with algebraic combinatorics  

Abstract : In this talk, I will introduce the notion of the representation theory of Lie algebras and provide the classification of finite-dimensional irreducible representations of finite-dimensional Lie algebras over C. The primary focus will be on irreducible representations of the Lie algebra sl_n (n × n trace 0 matrices), demonstrating that their character corresponds to the Schur polynomial. This result aids in establishing connections between the representation theory of Lie algebras and algebraic combinatorics.Towards the end of the talk, I will introduce the notion of representations of the current Lie algebra, particularly local Weyl modules and Chari Venkatesh modules. I will also present a few results from my recent paper titled, ”Demazure filtration of tensor product modules and character formula” (joint work with Dr. Tanusree Khandai). 

• Date : 20 January 2024

Speaker : Pravin Kumar

Title : Infinite-type spaces and their mapping class group  

Abstract : A surface is said to be of finite-type if its fundamental group is finitely generated; otherwise, it is said to be of infinite-type. The mapping class group, MCG(S), of a surface S, is the group of isotopy classes of homeomorphisms of S onto itself. A mapping class group is a topological group with the topology inherited from the quotient map of Homeo(S) equipped with the compact-open topology. The MCG(S) is countable and discrete for finite-type surfaces. Interestingly, the topology of MCG(S) exhibits more intriguing properties for an infinite-type surface; it becomes uncountable, totally disconnected, and has the structure of a Polish group. In this talk, we will explore surface classification and the topology of mapping class groups of surfaces. Lastly, some recent results in this area—an outcome of collaborative work with Dr. Mahender Singh and Dr. Apeskha Sanghi. The talk will be accessible to a broader audience and contain more pictures. 

• Date: 1st April 2023

     Speaker : Hari Prasad Poilath

     Title : Character Methods In Word Maps

     Abstract : Character Methods in Word Maps  

• Date: 25th March 2023 

Speaker : Dr. Chandan maity

Title: Cohomology (de Rham) of adjoint orbits in the non-compact simple Lie algebra of type g_2.

Abstract:  The talk aims at emphasizing basic notions of the cohomology of homogeneous space. Towards the end, we will describe all the de Rham cohomology groups of the adjoint orbits in the complex simple Lie algebra g_2(C).    

• Date: 23rd February 2023 

Speaker: Ravi Tomar

Title: An Introduction to Relatively Hyperbolic Groups

Abstract: In his seminal work, Gromov revolutionized the theory of infinite groups by treating groups as geometric objects. In the same article, he introduced the notion of hyperbolic and relatively hyperbolic groups. Over the last three decades these groups have received a tremendous amount of attention and many of their properties have been understood. In this talk, I will introduce the notion of relatively hyperbolic groups and discuss some properties of them.

• Date: 29th January 2023 

Speaker: Pronay Kumar Karmakar

     Title: Euler systems and Iwasawa Main Conjecture.

Abstract: Historically the idea of Euler systems for elliptic curves come from the work of Victor Kolyvagin. In this talk we are going to discuss about Euler systems (mainly Bipartite Euler systems) to show that how it can be used to prove some the Iwasawa main conjectures for elliptic curves.

• Date: 21st January 2023 

Speaker: Apeksha Sanghi

Title: Cyclic actions on surfaces.

Abstract: In this talk, we will see the geometric realization of cyclic actions on surfaces. We will begin with mapping class groups and its relation with group action on surfaces. We will cover the basics of orbifold theory required for this talk, followed by some examples. We will describe combinatorial view point of cyclic actions on surfaces which will help us to understand the geometric realization of such actions on surfaces.

• Date: 14th January 2023

Speaker: Rakesh Halder

Title:  An introduction to the (Gromov) hyperbolic spaces (groups) and A Combination Theorem for Spaces of Tree-Graded Spaces.

Abstract: The first half of this talk will briefly introduce the (Gromov) hyperbolic spaces, hyperbolic groups, and some stuff related to the second half. The combination problem is a well-known problem in Geometric Group Theory to find new hyperbolic spaces (Groups) out of given ones. In 1992, Bestvina-Feighn proved such a combination theorem for trees of metric spaces, and later in 2012, Mj-Sardar proved one such theorem for metric bundles. In this second half, I will discuss my work, A Combination Theorem for Spaces of Tree-Graded Spaces, which generalizes the above theorems. On the other hand, this theorem is also one step towards proving a combination theorem asked by M. Kapovich.

• April 9, 2022

     Speaker: Harish Kishnani

Title: Word maps on finite nilpotent groups

Abstract: Abstract

Video, Board work

• April 2, 2022

     Speaker: Dr. Gurleen Kaur

Title: Monomial groups and their group algebras

Abstract: Abstract

Video, Board work

• March 26, 2022

     Speaker: Sundara Narasimhan

Title: Primes in arithmetic progressions

Abstract: Abstract

Video, Board work

• March 12, 2022 

     Speaker: Nilendu Das

Title: Teichmuller space of closed surfaces

Abstract: Abstract

Video, Slides

• March 5, 2022 

     Speaker: Kirti Taneja

Title: Irreducible representations of metacyclic groups

Abstract: Abstract

Video, Slides

• February 26, 2022 

     Speaker: Soumya Dey

Title: Playing with presentations

Abstract: We shall discuss some classical tools from combinatorial group theory, and learn to play with some hands-on examples.

Video

• February 19, 2022 

     Speaker: Sukrit Dubey 

Title: Projection valued measure

Abstract: Abstract

Video, Slides

• February 13, 2022 

Speaker: Ramanujan Srihari 

Title: Norm forms of cyclic extensions

Abstract: Abstract

Video, Slides 

• February 5, 2022 : 11am 

Speaker: George Shaji 

Title: Word and Conjugacy problems in hyperbolic groups

Abstract: I'll be introducing hyperbolic spaces. Specifically, hyperbolic groups, and I'll show that the word problem and conjugacy problem turn out to be solvable within this class of groups.

Video, Board-work

• January 29, 2022 

Speaker: Arushi Agarwal 

Title: Geometric Quantization

Abstract: Abstract

Video, Slides

• January 15, 2022

Speaker: Abhigyan Writwik Medhi  

Title: Introduction to Pfister Forms and Function fields of quadratic forms.

Abstract: Abstract 

Video, Slides

• April 7, 2021

Speaker: Dr. Chetan Balwe
Title: Universal R-triviality of standard norm varieties
Abstract: I will briefly review rationality and near-rationality properties of varieties and sketch a proof of the fact that standard norm varieties over an algebraically closed field of characteristic zero are universally R-trivial. This talk is based on recent joint work with Amit Hogadi and Anand Sawant.

Video

• March 31, 2021
  Speaker: Sushil Bhunia

Title: A glimpse on big mapping class groups.

Abstract: I will give an introduction to mapping class groups of infinite type surfaces. More precisely, a surface S is said to be of finite-type if its fundamental group is finitely generated; otherwise it is of infinite-type. The mapping class group of S is the group of isotopy classes of homeomorphisms of S and is denoted by MCG(S). When the surface is of infinite type, we call the mapping class group a big mapping class group. There has been a recent surge of activity aimed at understanding infinite-type surfaces and their mapping class groups. I will give an algebraic property of big MCG(S) (namely the -property) and explain some ideas from recent joint work with Swathi Krishna.

Video

• March 24, 2021
  Speaker : Dr. Anirban Bose
  Title: Twisted conjugacy in linear algebraic groups. 

Abstract: Let G be a group and φ an automorphism of G. The φ- twisted conjugacy action of G on itself is given by (g,x) → gxφ(g)^-1, for all g,x ∈ G. In this talk we will consider this notion in the realm of linear algebraic groups and discuss some recent results. This talk will be based on a joint work with Sushil Bhunia.
Video, Board-Work 

• March 17, 2021
  Speaker : Alok Kumar
  Title: The Notorious Collatz conjecture
  Abstract: In this talk, we will discuss an exposition of the most elementary and dangerous Collatz conjecture, and partial results towards proving the conjecture. I will use one of the most prolific slides prepared by Prof. Terrence Tao on this conjecture.

Video

• March 10, 2021
  Speaker: Simran Tinani
  Title: Introduction to k-normal elements over the finite fields.
  Abstract: Recently, the concept of k-normal elements over a finite field was introduced as an extension of the well-known concept of normal elements. The questions of the existence and cardinalities of k-normal elements comprise an active research avenue, and in full generality remain open problems. In this talk, I will first describe normal elements, some key results on them, and their significance. I will then define k-normal elements and present some results on their existence and numbers, along with brief outlines of the methods employed in the proofs.
  Video, Slides 

• February 24, 2021
  Speaker: Yogesh
  Title: An introduction to urn models
  Abstract:  I will give a brief introduction to Urn models, discuss their applications to real life problems, and talk about some mathematical tools necessary for studying them.
  Video, Slides 

• February 17, 2021
  Speaker : Dr. Sugandha Maheshwari
  Title: An introduction to algebraic coding theory
  Abstract: In this seminar, I would like to introduce the subject of algebraic coding theory, assuming no prerequisites. I would also like to talk about the applications of coding theory. Further, I would also like to share research perspective(s) in this direction.
  Video, Slides 

• February 10, 2021
  Speaker : Rakesh Pawar
  Title: Rational functions on P^1 and Bilinear forms
  Abstract: I will discuss the classification of rational functions on the Projective line P^1 over a field k up to 'algebraic deformations' in terms of symmetric matrices/bilinear forms over k. The talk will be based on the article of C. Cazanave.
  Video, Slides 

• 27 Jan, 2021
  Topic: An introduction to Weil Conjectures.
  Speaker: Dr. Vaibhav Vaish
  Abstract: Weil conjectures (now theorems), proposed by Andre Weil in 1949, motivated significant advances in algebraic geometry since then. Formulated as certain claims on local zeta functions - generating functions involving number of roots of polynomials (over finite fields) - they are tied closely to algebraic geometry, number theory, and indeed, algebraic topology. This talk is intended as an elementary introduction to the topic.
  Video, Board-work 

• 20 Jan, 2021
  Topic : Algebraic and Transcendental Solutions of first order non-linear ODE
  Speaker: Urshashi Roy
  Abstract :  Consider the ODE y= f(x,y), where f(x,y) ∈ C(x)[y]. We want to answer whether the above ODE has transcendental solutions in a Liouvillian extension of C(x). By algebraic solution we mean a solution that lies in an algebraic extension of C(x). For example √ x is an algebraic solution of y'= y/2x .In fact c√ x are also solutions for any constant c. Finding all the algebraic solutions of an ODE might not be possible always. Our aim is to find relations between algebraic and transcendental solutions (if they exist). We will discuss few examples and the challenges to solve the above problem.

Video