Abstract: In this talk we shall summarize results on the structure and
representation theory of semisimple algebraic groups. This will to prepare
ground for the subsequent talks on the Borel-Weil-Bott theorem which
explains how (loosely speaking) representations of semisimple algebraic
groups can be obtained as sheaf cohomology groups associated to certain
line bundles.
Time:
3:30pm - 5:00pm
Location:
Ramanujan Hall
Description:
Title: Ideals of Linear type-3
Time:
11:30am - 1:00pm
Location:
Room 215
Description:
Title: Classical Motives
Abstract: We will give some basic definitions and take a few examples
of motives. The reference is A. J. Scholl's article (1991, Seattle).
Time:
11:30am - 12:30pm
Location:
Ramanujan Hall
Description:
Title: On tricolored-sum-free sets and Green's Boolean Removal Lemma
Abstract: A tricolored-sum-free set in F_2^n is a collection of triples
{(a_i,b_i,c_i)}_{I=1..m} such that
a) for each I, a_i+b_i+c_i=0
b) If a_i+b_j+c_k = 0, then I=j=k.
The notion of a tricoloured-sum-free set generalizes the notion of a
capset to F_2^n. The basic question here is: How large can a
tricolored-sum-free set be?
We will see the following two (recent) results.
i) Kleinberg's upper bound of 6\binom{n}{n/3} for a tricolored-sum-free
set. This in conjunction with a previous result of his establishing a
lower bound of \binom{n}{n/3}2^{-\sqrt{16n/3}} gives almost asymptotically
tight results.
ii) Ben Green (in 2005) proved the following BOOLEAN REMOVAL LEMMA:
Given \epsilon>0 there exists \delta depending only on epsilon such
that the
following holds: Write N=2^n. If X,Y,Z are subsets of F_2^n if by deleting
\epsilon N elements from X,Y, Z altogether, one can eliminate all
arithmetic triangles (triples (x,y,z) with \in X,y\in Y,z\in Z such that
x+y+z=0) then there are at most \delta N^2 arithmetic triangles in
(X,Y,Z). Green's proof establishes a bound for1/(\delta) which is a tower
of 2s of length poly(1/\epsilon). We will look at a recent result of Fox
and Lovasz (junior) who obtained an almost tight bound for this
delta-epsilon dependence with \delta =O(\epsilon^{O(1)}).
Time:
3:30pm - 5:00pm
Location:
Room 215
Description:
Title: Flows on homogeneous spaces
Abstract: We shall discuss the results of Marina Ratner on unipotent flows, and the techniques involved.
Time:
10:30am
Location:
Ramanujan Hall
Description:
Title: The Robinson-Schensted-Knuth Algorithm for Real Matrices
Abstract: The Robinson-Schensted-Knuth (RSK) correspondence is a bijection
from the set of matrices with non-negative integer entries onto the set of
pairs of semistandard Young tableaux (SSYT) of the same shape. SSYT can be
expressed as integral Gelfand-Tsetlin patterns. We will show how Viennot's
light-and-shadows algorithm for computing the RSK correspondence can be
extended from matrices with non-negative integer entries to matrices with
non-negative real entries, giving rise to real Gelfand-Tsetlin patterns.
This real version of the RSK correspondence is piecewise-linear. Indeed,
interesting combinatorial problems count lattice points in polyhedra, and
interesting bijections are induced by volume-preserving piecewise-linear
maps.
Time:
3:30pm - 5:00pm
Location:
Ramanujan Hall
Description:
Title: Koszul algebras V
Abstract: In the first half of the talk, we shall recall Koszul filtation
and Grobner flag. Let R be a standard graded algebra. If R has a Koszul
filtation, then R is Koszul. If R has a Grobner flag, then R is
G-quadratic. I will mention an important result of Conca, Rossi, and
Valla: Let R be a quadratic Gorenstein algebra with Hilbert series 1 + nz
+ nz^2 + n^3. Then for n=3 and n=4, R is Koszul.
In the second half of the talk, we shall focus on class of strongly Koszul
algebras. If time permits, I will prove that Koszul algebras are preserved
under various classical constructions, in particular, under taking tensor
products, Segre products, fibre products and Veronese subrings.
Time:
11:00am
Location:
Ramanujan Hall
Description:
Title : Homotopy groups of highly connected manifolds
Abstract : We shall discuss a new method of computing (integral) homotopy
groups of certain manifolds in terms of the homotopy groups of spheres. The
techniques used in this computation also yield formulae for homotopy groups
of connected sums of sphere products and CW complexes of a similar type. In
all the families of spaces considered here, we verify a conjecture of J. C.
Moore. This is joint work with Somnath Basu.
Time:
2:00pm
Location:
Ramanujan Hall
Description:
Title: On perfect classification for Gaussian processes
Abstract: We study the problem of discriminating Gaussian processes by analyzing the behavior of the underlying probability measures in an infinite-dimensional space. Motivated by singularity of a certain class of Gaussian measures, we first propose a data based transformation for the training data. For a J class classification problem, this transformation induces complete separation among the associated Gaussian processes. The misclassification probability of a component-wise classifier when applied on this transformed data asymptotically converges to zero. In finite samples, the empirical classifier is constructed and related theoretical properties are studied.
This is a joint work with Juan A. Cuesta-Albertos.
Time:
2:10pm
Location:
Ramanujan Hall
Description:
Time: 2:15-3:15
Title: On tricolored-sum-free sets and Green's Boolean Removal Lemma
(Part II, continued from last week)
Abstract: A tricolored-sum-free set in F_2^n is a collection of triples
{(a_i,b_i,c_i)}_{I=1..m} such that
a) for each I, a_i+b_i+c_i=0
b) If a_i+b_j+c_k = 0, then I=j=k.
The notion of a tricoloured-sum-free set generalizes the notion of a
capset to F_2^n. The basic question here is: How large can a
tricolored-sum-free set be?
We will see the following two (recent) results.
i) Kleinberg's upper bound of 6\binom{n}{n/3} for a tricolored-sum-free
set. This in conjunction with a previous result of his establishing a
lower bound of \binom{n}{n/3}2^{-\sqrt{16n/3}} gives almost asymptotically
tight results.
ii) Ben Green (in 2005) proved the following BOOLEAN REMOVAL LEMMA:
Given \epsilon>0 there exists \delta depending only on epsilon such
that the
following holds: Write N=2^n. If X,Y,Z are subsets of F_2^n if by deleting
\epsilon N elements from X,Y, Z altogether, one can eliminate all
arithmetic triangles (triples (x,y,z) with \in X,y\in Y,z\in Z such that
x+y+z=0) then there are at most \delta N^2 arithmetic triangles in
(X,Y,Z). Green's proof establishes a bound for1/(\delta) which is a tower
of 2s of length poly(1/\epsilon). We will look at a recent result of Fox
and Lovasz (junior) who obtained an almost tight bound for this
delta-epsilon dependence with \delta =O(\epsilon^{O(1)}).
Time:
3:30pm - 5:00pm
Location:
Room 215
Description:
Title: Flows on homogeneous spaces
Abstract: We shall continue the discussion on the results of Marina Ratner on unipotent flows, and the techniques involved.
Time:
2:10pm - 3:10pm
Location:
Ramanujan Hall
Description:
Time: 2.15-3.15
Title: Error Correction and List Decoding for Reed Solomon Codes
Abstract:
In this talk, we will have a look at three results, starting with the following.
[Berlekamp-Welch] Given a univariate polynomial function over F_q
with data corruption at t < q/2 points, we can recover the function
completely if the degree of the function is sufficiently low.
A generalization of the above is as follows, where instead of
'recovering' the function, we find all its 'close approximates'.
[Madhu Sudan] Given data points (x_i,y_i), i \in [n], and parameters
k and t, we can list all polynomials with degree at most k, which
satisfy at least t data points.
This result can further be generalized as follows.
[Madhu Sudan] Given data points (x_i,y_i) with weights w_i, i \in
[n], and parameters k and W, we can list all polynomials with degree
at most k such that the sum of weights of data points satisfied by the
polynomial is at least W.
The last two results provide list-decoding of Reed-Solomon codes.
Time:
4:00pm - 5:00pm
Location:
Room 113
Description:
Title: Asymptotics of the number of points of symplectic lattices in subsets of Euclidean spaces
Abstract: It is well known that a "good" large subset of the Euclidean space contains approximately as many lattice points as its volume. This need not hold for a general subset. On the other hand, a classical theorem of Siegel asserts that for any subset of positive measure, the "average" number of points (in an appropriate sense) of a general unimodular lattice contained in it, equals the measure of the set. In place of the average over the entire space of lattices one may also ask for analogous results for smaller subclasses. In a recent work with Jayadev Athreya, we explored this issue, with some modifications that place the problem in perspective, for the case of symplectic lattices, viz. lattices (in even-dimensional spaces) obtained from the standard lattice under symplectic transformations. In this talk I shall describe the overall asymptotics in this case, together with the historical background of the results and techniques involved.
Time:
3:30pm - 5:00pm
Location:
Ramanujan Hall
Description:
Title: A new proof of Zariski's Theorem about Complete ideals in two-dimensional regular local rings.
Abstract: Zariski's first paper in algebra written in 1938 proved among many other results that product
of complete ideals is complete in the polynomial ring $K[X,Y]$ where $K$ is an algebraically
closed field of characteristic zero. This was generalised to two-dimensional regular local rings
in Appendix 5 of Zariski-Samuel's classic "Commutative Algebra". We will present a new proof
of this theorem using a formula of Hoskin-Deligne about co-length of a zero-dimensional
complete ideal in a two-dimensional regular local ring in terms of quadratic transforms of
$R$ birationally dominating $R.$
Time:
10:10am - 11:00am
Location:
Ramanujan Hall
Description:
Time 10:15-11:00
Title: Bisecting and D-secting families for hypergraphs
Abstract: Let n be any positive integer, [n]:={1,2,...,n}, and suppose
$D\subset\{-n,-n+1,..,-1,0,1,...,n}$. Let F be a family of
subsets of [n]. A family F' of subsets of [n] is said to be
D-secting for F if for every A in the family F, there exists a subset A'
in F' such that $|A\cap A'|-|A\cap ([n]\setminus A')| = i$, for some $i\in
D$. A D-secting family F' of F, where D = {-1,0,1}, is a bisecting family
ensuring the existence of a subset $A'\in F'$ such that $|A\cap
A'|\in{\lfloor |A|/2\rfloor, \lceil |A|/2\rceil\}$ for each $A\in F$. We
consider the problem of determining minimal D-secting families F' for
certain families F and some related questions.
This is based on joint work with Rogers Mathew, Tapas Mishra, and
Sudebkumar Prashant Pal.
Time:
11:00am - 11:50am
Location:
Ramanujan Hall
Description:
Time 11.00 AM -11.45 AM
Title: Ramanujan's Master theorem for radial sections of line bundles over the real hyperbolic space
Abstract: Ramanujan's master theorem states that under suitable
conditions, the Mellin transfrom of an alternating power series provides
an interpolation formula for the coefficients of this power series.
Ramanujan applied this theorem to compute several definite integrals and
power series and this explains why it is referred as "Master Theorem". In
this talk we shall try to explain its analogue for radial sections of line bundles over the real hyperbolic space.
This a joint work (in progress) with Prof. Swagato K Ray.
Time:
12:00pm - 12:50pm
Location:
Ramanujan Hall
Description:
Time 12.00 noon -12.45 PM
Title: Riemann-Roch, Alexander Duality and Free Resolutions.
Abstract: The Riemann-Roch theorem is fundamental to algebraic geometry. In 2006, Baker and Norine discovered an analogue of the Riemann-Roch theorem for graphs. This theorem is not a mere analogue but has concrete relations with its algebro-geometric counterpart. Since its conception this topic has been explored in different directions, two significant directions are i. Connections to topics in discrete geometry and commutative algebra ii. As a tool to studying linear series on algebraic curves. We will provide a glimpse of these developments. Topics in commutative algebra such as Alexander duality and minimal free resolutions will make an appearance. This talk is based on my dissertation and joint work with i. Bernd Sturmfels, ii. Frank-Olaf Schreyer and John Wilmes and iii. an ongoing work with Alex Fink.
Time:
2:10pm - 3:10pm
Location:
Ramanujan Hall
Description:
Time 2.15-3.15
Title : Labeling the complete bipartite graphs with no simple zero cycles
Abstract : Suppose we want to label the edges of the complete bipartite graph K_{n,n} with elements of F_2^d in such a way that the sum of labels over any simple cycle is nonzero. What is the smallest possible value of d be for such a labeling to exist?
It was proved by Gopalan et. al. that log^2(n) \leq d \leq nlog(n). Kane, Lovett and Rao recently proved that d is in fact linear in n. In particular we have n/2-2 \leq d < 6n.
Upper bound is established by explicit construction while lower bound is obtained by bounding the size of independent sets in certain Cayley graphs of S_n.
Time:
4:00pm - 5:00pm
Location:
Ramanujan Hall
Description:
Speaker: Prof. Arup Bose.
Title: Large sample behaviour of high dimensional autocovariance matrices with application
Title: Compact forms of spaces of constant negative (sectional) curvature.
Abstract: One knows that any compact riemann surface of genus > 2 carries
a riemanniann metric of constant curvature. In higher dimension even the
existence of compact manifolds of constant negative curvature is by no
means that abundant. In this lecture we will show how arithmetic enables us
to construct such manifolds in every dimension greater than equal to 2.
Time:
3:30pm - 5:00pm
Location:
Ramanujan Hall
Description:
Title: The Hoskin-Deligne formula for the co-length of a complete ideal in
2-dimensional regular local ring.
Abstract: We shall present a simple proof due to Vijay Kodiyalam.
This proof makes use of the fact that transform of a complete ideal
in a two-dimensional regular local ring R in a quadratic transform of R
is again complete. It also uses a structure theorem, due to Abhyankar,
of two-dimensional regular local rings birationally dominating R.