07-11-2017 |
Sudeshna Roy |
Gotzmann's regularity and persistence theorem – III
Gotzmann's regularity theorem establishes a bound on Castelnuovo-Mumford regularity using a binomial representation (the Macaulay representation) of the Hilbert polynomial of a standard graded
algebra. Gotzmann's persistence theorem shows that once the Hilbert
function of a homogeneous ideal achieves minimal growth then it grows
minimally for ever. We start with a proof of Eisenbud-Goto's theorem to
establish regularity in terms of graded Betti numbers. Then we discuss
Gotzmann's theorems in the language of commutative algebra.
|
03-11-2017 |
Saurav Bhaumik |
Higgs bundles
We will describe the general fiber of the Hitchin fibration for the classical groups.
|
31-10-2017 |
Provanjan Mallick |
Asymptotic prime divisors – III
Consider a Noetherian ring R and an ideal I of R. Ratliff asked a question that what happens to Ass(R/I^n) as n gets large ? He was able to answer that question for the integral closure of I. Meanwhile Brodmann answered the original question, and proved that the set Ass(R/I^n) stabilizes for large n. We will discuss the proof of stability of Ass(R/I^n). We will also give an example to show that the sequence is not monotone. The aim of this series of talks to present the first chapter of S. McAdam, Asymptotic prime divisors, Lecture Notes in Mathematics 1023, Springer-Verlag, Berlin, 1983.
|
31-10-2017 |
Sudeshna Roy |
Gotzmann's regularity and persistence theorem - II
Gotzmann's regularity theorem establishes a bound on Castelnuovo-Mumford regularity using a binomial representation (the Macaulay representation) of the Hilbert polynomial of a standard graded
algebra. Gotzmann's persistence theorem shows that once the Hilbert
function of a homogeneous ideal achieves minimal growth then it grows
minimally for ever. We start with a proof of Eisenbud-Goto's theorem to
establish regularity in terms of graded Betti numbers. Then we discuss
Gotzmann's theorems in the language of commutative algebra.
|
27-10-2017 |
Sudarshan Gurjar and Saurav Bhaumik |
Higgs Bundles
We will define the moduli of Higgs bundles and the Hitchin fibration, which is a morphism from the moduli of Higgs bundles to an
affine space. Then we will describe the general fibre in terms of the
spectral cover.
|
25-10-2017 |
Santosh Nadimpalli |
Typical representations for depth-zero representations.
We are interested in understanding cuspidal support of smooth
representations of p-adic reductive group via understanding the
restriction of a smooth representation to a maximal compact subgroup. This
is motivated by arithmetic applications via local Langlands
correspondence. We will explain the case of general linear groups and
classical groups.
|
24-10-2017 |
Provanjan Mallick |
Asymptotic prime divisors – II
Consider a Noetherian ring R and an ideal I of R. Ratliff asked a question that what happens to Ass(R/I^n) as n gets large ? He was able to answer that question for the integral closure of I. Meanwhile Brodmann answered the original question, and proved that the set Ass(R/I^n) stabilizes for large n. We will discuss the proof of stability of Ass(R/I^n). We will also give an example to show that the sequence is not monotone. The aim of this series of talks to present the first chapter of S. McAdam, Asymptotic prime divisors, Lecture Notes in Mathematics 1023, Springer-Verlag, Berlin, 1983.
|
24-10-2017 |
Sudeshna Roy |
Gotzmann's regularity and persistence theorem
Gotzmann's regularity theorem establishes a bound on Castelnuovo-Mumford regularity using a binomial representation (the Macaulay representation) of the Hilbert polynomial of a standard graded
algebra. Gotzmann's persistence theorem shows that once the Hilbert
function of a homogeneous ideal achieves minimal growth then it grows
minimally for ever. We start with a proof of Eisenbud-Goto's theorem to
establish regularity in terms of graded Betti numbers. Then we discuss Gotzmann's theorems in the language of commutative algebra.
|
20-10-2017 |
Sudarshan Gurjar and Saurav Bhaumik |
Higgs Bundles
In this second talk of the series, I will continue the discussion on Higgs bundles with focus on some of the moduli aspects of the theory.
|
17-10-2017 |
Provanjan Mallick |
Asymptotic prime divisors.
Consider a Noetherian ring R and an ideal I of R. Ratliff asked a question that what happens to Ass(R/I^n) as n gets large ? He was able to answer that question for the integral closure of I. Meanwhile Brodmann answered the original question, and proved that the set Ass(R/I^n) stabilizes for large n. We will discuss the proof of stability of Ass(R/I^n). We will also give an example to show that the sequence is not monotone. The aim of this
series of talk to present the first chapter of S. McAdam, Asymptotic
prime divisors, Lecture Notes in Mathematics 1023, Springer-Verlag,
Berlin, 1983.
|
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